tag:blogger.com,1999:blog-34429614829210532972024-03-06T05:04:27.760+01:00Electronique Pratique Simplediagram of a good proximity detector, diagram of the fm transmitters, draft diagram of a trolley's electricity, diagram of touch detector with 555, microphone diagram, electronic diagram of lumandar, diagram of metal detector, diagram of lamp12volte ignition,schema d'un bon détecteur de proximite,schema des emetteur fm,projet schema electricite un chariot,schema detecteur toucher avec 555,microphone schéma,schema electronique de lumandar,schema detecteur de metaux,schema allumage lampe12voltetechnohttp://www.blogger.com/profile/00995077996330823431noreply@blogger.comBlogger60125tag:blogger.com,1999:blog-3442961482921053297.post-16968053747972658662020-05-06T15:40:00.004+00:002020-05-06T15:47:35.907+00:00Cyrob : Radio Hors Série : Analyse d'un emetteur FM à 3 balles...<iframe allowfullscreen="" frameborder="0" height="270" src="https://www.youtube.com/embed/X-pCCR6WNr4" width="480"></iframe>technohttp://www.blogger.com/profile/00995077996330823431noreply@blogger.com0tag:blogger.com,1999:blog-3442961482921053297.post-35347111100076399952020-05-06T15:39:00.011+00:002020-05-06T15:48:22.584+00:00micro fm simple<iframe allowfullscreen="" frameborder="0" height="344" src="https://www.youtube.com/embed/Vm3DgflmqbY" width="459"></iframe>technohttp://www.blogger.com/profile/00995077996330823431noreply@blogger.com0tag:blogger.com,1999:blog-3442961482921053297.post-69095745403463572022020-05-06T15:39:00.010+00:002020-05-06T15:48:08.332+00:00Mini FM Transmitter Circuit<iframe allowfullscreen="" frameborder="0" height="270" src="https://www.youtube.com/embed/kSQoLXoSNGk" width="480"></iframe>technohttp://www.blogger.com/profile/00995077996330823431noreply@blogger.com0tag:blogger.com,1999:blog-3442961482921053297.post-15421796142120465402020-05-06T15:39:00.009+00:002020-05-06T15:47:55.700+00:00How to make very sensitive mini fm transmitter<iframe allowfullscreen="" frameborder="0" height="270" src="https://www.youtube.com/embed/yLLX86hO2eU" width="480"></iframe>technohttp://www.blogger.com/profile/00995077996330823431noreply@blogger.com0tag:blogger.com,1999:blog-3442961482921053297.post-28671198580683040802020-05-06T15:38:00.003+00:002020-05-06T15:48:33.323+00:00FM Transmitter with 5 compnents<iframe allowfullscreen="" frameborder="0" height="270" src="https://www.youtube.com/embed/kXtCJ91RHG8" width="480"></iframe>technohttp://www.blogger.com/profile/00995077996330823431noreply@blogger.com0tag:blogger.com,1999:blog-3442961482921053297.post-76636857079400490402014-09-29T15:26:00.001+01:002020-02-16T11:26:04.035+01:00Arduino affichage 7 segments et compteur<div dir="ltr" style="text-align: left;" trbidi="on">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgRx7lMxF3l7SxWTZNL7qOC1wYgR8Oer2VsKFlIgWrXeP4hprrhCit8lWRvHY4C6pYpz8eN0s6cr218ETlpiA1WU7he6FY3LmPz6R2nvmCin5VtoNmQHsfU924ikaonGcQomksaUPYYz8c/s1600/Arduino+Sch%25C3%25A9ma.jpg" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="182" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgRx7lMxF3l7SxWTZNL7qOC1wYgR8Oer2VsKFlIgWrXeP4hprrhCit8lWRvHY4C6pYpz8eN0s6cr218ETlpiA1WU7he6FY3LmPz6R2nvmCin5VtoNmQHsfU924ikaonGcQomksaUPYYz8c/s1600/Arduino+Sch%25C3%25A9ma.jpg" width="320" /></a><br />
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Il s'agit d'un circuit de 0 à 9 de simple compteur construit en
utilisant Arduino! Ici, une cathode commune affichage à LED 7 segments
est relié à Arduino pour afficher les chiffres. <br />
Le code (Arduino croquis) permet appuyer sur le bouton incrément du compteur de 0 à 9. <br />
L'ensemble du circuit peut être alimenté par une pile 9V PP3/6F22 standard, ou de tout adaptateur Arduino approprié.<br />
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L'affichage à sept segments est en fait un appareil très simple. C'est
une combinaison de 8 LED (le point décimal DP-est le 8ème), qui peuvent
être disposés de telle sorte que différentes combinaisons peuvent être
utilisés pour faire des chiffres numériques.<br />
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Détails d'un type de
cathode commune affichage à LED 7 segments est montré ici. A noter que
les repères 3 et 8 de l'affichage est aux bornes de la cathode.<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgFGb9h5dDTxQxNrg-5LIK_wFP8LjQJePmx3WU1lj2DPCqmJ8JtjW_BRqsw1pVXviHjpkKSqHcmxtGoRoOf7flVhJfbjclUPt9AgOqik5msQITii5R14hvINa74fFG2dO7qLf2ZYl6hWbc/s1600/Arduino+Sch%C3%A9ma.jpg" style="margin-left: 1em; margin-right: 1em;"><br /></a></div>
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Arduino Schéma :<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhURUtvJZ4Scv3ntG2OvQRoKwBfPLZ9Y-6oHHp5Oq1tn8JdpfjpUdzkoXgvJBPrRVrezxsXyb7hoSvAos2JVcc6jbABSYuKoBKQIaRxaOMDrqCF8WYbn7cgMvsVl1YU7OTey_SW1ZGbK0I/s1600/Arduino+7+segments.webp" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="107" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhURUtvJZ4Scv3ntG2OvQRoKwBfPLZ9Y-6oHHp5Oq1tn8JdpfjpUdzkoXgvJBPrRVrezxsXyb7hoSvAos2JVcc6jbABSYuKoBKQIaRxaOMDrqCF8WYbn7cgMvsVl1YU7OTey_SW1ZGbK0I/s1600/Arduino+7+segments.webp" width="320" /></a></div>
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Il suffit de suivre le schéma de circuit pour rendre l'ensemble du projet. <br />
Broches
Arduino 2, 3, 4, 5, 6, 7 et 8 devraient aller pour afficher les broches
7, 6, 4, 2, 1, 9 et 10 dans l'ordre correct. En cas de doute, consultez
ce tableau. Appuyez sur l'interrupteur (S1) le point d'entrée est à la
broche 9 de l'Arduino.<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjCGSci06DygIJMqFKZEYsktXR89YUqmws20YeYpyzFcvwwq8PD8hJ4zPe1jt-FTdn2iVwwDuan8NrdR3X1GByqwLFjBtvw1-hrgZ-k_nBU2pA7lZOdyb6cHz_AfkIsXxbY2pjxHYjhPM8/s1600/Arduino+Sch%C3%A9ma+2.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjCGSci06DygIJMqFKZEYsktXR89YUqmws20YeYpyzFcvwwq8PD8hJ4zPe1jt-FTdn2iVwwDuan8NrdR3X1GByqwLFjBtvw1-hrgZ-k_nBU2pA7lZOdyb6cHz_AfkIsXxbY2pjxHYjhPM8/s1600/Arduino+Sch%C3%A9ma+2.jpg" /></a></div>
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Connexion des broches d'affichage directement sur les broches Arduino I /
O n'est pas une bonne pratique. Pour des fins de test uniquement une
résistance de 330 ohms (R2) est ajouté entre le rail de la masse (0V) et
les broches de cathode communes (3 et 8). Il est préférable de
connecter directement les broches 3 et 8 de l'écran vers le rail au sol.
Ensuite, ajoutez une résistance de 330 ohms entre chacune des autres
connexions à l'Arduino.<br />
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Arduino 7 segments code d'affichage :<br />
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technohttp://www.blogger.com/profile/00995077996330823431noreply@blogger.comtag:blogger.com,1999:blog-3442961482921053297.post-88680577931706143522011-05-18T19:02:00.001+01:002011-05-18T19:07:51.682+01:00Un amplificateur hot frequence FM de 10 W pour le f 140 - 146 MHz<div dir="ltr" style="text-align: left;"><div dir="ltr" style="text-align: left;"><div dir="ltr" style="text-align: left;"><div dir="ltr" style="text-align: left;"><div dir="ltr" style="text-align: left;"><div dir="ltr" style="text-align: left;"><div dir="ltr" style="text-align: left;"><div dir="ltr" style="text-align: left;"><div dir="ltr" style="text-align: left;"><div dir="ltr" style="text-align: left;"><div style="text-align: center;"> </div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh6lzudhgB5WRfSKUDtBmo_W7CPvmMpt2e5LeNhb011sSzMkQe-e_1RHUvGaShLquzdwo2HF7MYC_yO5NSgXXxenmpRr6QQK7MFPe-JDtMR4_9kXSi0yepfEPSQdf2jh1mxft4jBRGihIM/s1600/amplificateur-hot-frequence.jpeg" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" height="106" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh6lzudhgB5WRfSKUDtBmo_W7CPvmMpt2e5LeNhb011sSzMkQe-e_1RHUvGaShLquzdwo2HF7MYC_yO5NSgXXxenmpRr6QQK7MFPe-JDtMR4_9kXSi0yepfEPSQdf2jh1mxft4jBRGihIM/s200/amplificateur-hot-frequence.jpeg" width="200" /></a></div>Fabriquer un amplificateur VHF de 10 watts FM n’a généralement rien d’extraordinaire. Dans le montage que nous vous proposons ici et qui ne nécessite aucun réglage, les 10 watts HF sont obtenus en appliquant sur l’entrée d’un module amplificateur hybride à large bande Mitsubishi, une puissance de 0,03 watt (30 milliwatts) seulement. Voilà où se trouve l’originalité de cette réalisation.<br />
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Il y a quelque années seulement, pour réaliser un amplificateur de ce genre, à relier à la sor tie d’un étage oscillateur, il fallait utiliser trois transistors HF montés d’après un schéma similaire à celui représenté sur la figure 1. Une fois tous les condensateurs ajustables réglés, on parvenait à obtenir environ 10 à 12 watts sur sa sor tie.<br />
Un tel amplificateur ne pouvait être monté que par un technicien ayant de bonnes connaissances en HF car, sans une expérience suffisante dans ce domaine, il était difficile de parvenir à régler de façon par faite les circuits d’accord. Conséquence : il arrivait par fois que l’amplificateur se mette à auto-osciller de façon inexpliquée après un bref temps de fonctionnement, ce qui entraînait la “mor t” des trois transistors. Aujourd’hui, les modules HF à large bande modernes permettent de réaliser des amplificateurs de bonne qualité ne nécessitant aucune mise au point. De plus, il suf fit d’appliquer quelques milliwatts seulement sur leur entrée pour obtenir une puissance impor tante à leur sor tie.<br />
Si vous disposez d’un tel module hybride, il vous faudra résoudre des problèmes que vous n’avez jamais rencontrés auparavant. En ef fet, les seules caractéristiques que l’on trouve concernant ces composants sont : la tension d’alimentation, la fréquence d’utilisation, la puissance que nous pouvons appliquer sur l’entrée et la puissance maximale fournie sur la sor tie.<br />
Si ces données peuvent être suffisantes à un technicien spécialisé et compétent, celui qui n’a jamais utilisé un de ces modules, ne réussira pas à construire un amplificateur s’il n’a pas à sa disposition un schéma électrique et l’indispensable circuit imprimé au moins. Il faut, en outre, que quelqu’un lui ai dit ce qu’il convient de ne pas faire pour ne pas mettre son module hors d’usage immédiatement.<br />
A ce point, nous intervenons pour vous proposer le circuit d’un amplificateur HF pour le 140-146 MHz, étudié pour utiliser un module de puissance de la marque Mitsubishi référencé M.57732/L. Si nous consultons les caractéristiques données par le constructeur, nous trouvons ces quelques éléments :<br />
<div style="text-align: center;"> <img alt="" 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" /></div></div><br />
Mais même si nous ajoutons la signification des différentes broches (voir figure 2) à ces caractéristiques, selon vous, combien sauraient concevoir un schéma électrique valable ?<br />
Il faut tout d’abord savoir qu’il n’est pas conseillé de dépasser les 15 volts d’alimentation. Partant de là, nous devons alimenter le module avec une tension de 12-13 volts. Si ensuite, nous prenons en compte le gain en puissance de 25 dB, ce qui signifie une augmentation de la puissance de 316 fois, si nous appliquons 0,04 watt sur l’entrée, en sortie nous devons obtenir :<br />
<br />
<div style="text-align: center;"><b>0,04 x 316 = 12,64 watts</b></div><br />
Toutefois, pour ne pas endommager le module, il vaut mieux limiter la puissance d’entrée à une valeur légèrement inférieure à celle préconisée dans les caractéristiques.<br />
En admettant n’utiliser en entrée que 0,03 watt (égal à 30 milliwatts), en sor tie nous obtenons :<br />
<br />
<div style="text-align: center;"><b>0,03 x 316 = 9,48 watts</b></div><br />
Evidemment, si nous appliquons au module des puissances inférieures à 30 milliwatts, la puissance de sor tie sera automatiquement réduite comme nous l’avons spécifié dans le tableau ci-dessous.<br />
<br />
<div style="text-align: center;"><img alt="" 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" /></div></div><br />
Il existe également une autre donnée qui varie en rappor avec la puissance produite. A la puissance maximale, le module absorbe environ 2,5 ampères, la consommation descend à 2 ampères pour une puissance de 9,5 watts et est réduite à 1,7 ampère pour une puissance de 7 watts. Laissant de côté toutes ces particularités, nous nous trouvons devant un autre problème à résoudre : celui de la commutation automatique, pour passer de la réception à l’émission.<br />
Un amplificateur se connecte toujours à la sor tie d’un émetteur/récepteur. Ainsi, en émission, le signal HF présent sur la sor tie de l’émetteur doit entrer dans l’amplificateur et doit ensuite être prélevé sur la sor tie de l’amplificateur pour rejoindre l’antenne rayonnante. Par contre en réception, le signal capté par l’antenne doit rejoindre directement l’entrée de récepteur en contournant l’amplificateur.<br />
Comme vous pouvez le voir sur le schéma électrique, la commutation est effectuée par deux relais.<br />
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<div style="text-align: center;"> <img alt="" height="418" 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" 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" width="640" /></div></div><br />
<div style="text-align: center;"></div><div style="color: #0b5394; text-align: center;"><span style="font-size: medium;"><b>Liste des composants de l’amplificateur LX.1418</b></span></div><br />
<img alt="" height="302" 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" width="640" /></div><br />
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<div style="color: #0b5394; text-align: center;"><span style="font-size: medium;"><b>Schéma électrique</b></span></div><br />
Le schéma complet de l’amplificateur utilisant le module M.57732/L est représenté sur la figure 3. Sur la prise d’entrée située sur la gauche, nous pouvons connecter la sor tie de l’émetteur dont on veut augmenter la puissance ou bien le signal issu d’un VFO prévu pour les fréquences de 140- 160 MHz.<br />
Lorsque l’émetteur/récepteur est en réception, les deux relais sont au repos et, ainsi, le signal capté par l’antenne atteint directement l’entrée du récepteur. Quand l’émetteur est en émission, le signal HF passant par la ligne L1 se retrouve, par induction, également sur la ligne L2.<br />
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<div style="text-align: center;"> <img alt="" 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" /></div></div><br />
<br />
La diode DS1, reliée à la gauche de cette ligne, redresse le signal de l’onde directe, de cette façon, sur la cathode, nous retrouvons une tension positive qui est appliquée sur la broche non-inverseuse 5 de l’amplificateur opérationnel IC1/A. Lorsque nous retrouvons cette tension sur l’amplificateur opérationnel, les relais sont activés. Le relais 1 connecte la sor tie de l’émetteur sur la broche 1 du module IC2 et le relais 2 connecte l’antenne sur la broche de sor tie 5.<br />
<div style="text-align: center;"><img alt="" height="332" 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" 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O3a9awtAkgYg7pXcY9Cc1ZKYhWTcvLFdueRjHOPSm17MYRT5l5/j/wAMfKVK05RUZBRTimIkk3L8xI2g8jFNrRNMxaaCinOhRY23Kd65wDyOSOfTpTaE7g1YKgnhjkkgkmlaKG2kN1IyruO2JWkIAyMkhMVakjMe3LI25Q3ynOPrVe6/5B+of9eF3/6Tyf5/zxzYt3w82ux3Zav9spp90db/AML38Jf88dT/AO/C/wDxVH/C9/CX/PHU/wDvwv8A8VXzZRXytj9JsfSf/C9/CX/PHU/+/C//ABVH/C9/CX/PHU/+/C//ABVfNlFFgsfSf/C9/CX/ADx1P/vwv/xVH/C9/CX/ADx1P/vwv/xVfNlFFgsfSf8Awvfwl/zx1P8A78L/APFUf8L38Jf88dT/AO/C/wDxVfNlFFgsfSf/AAvfwl/zx1P/AL8L/wDFUf8AC9/CX/PHU/8Avwv/AMVXzZRRYLH0n/wvfwl/zx1P/vwv/wAVR/wvfwl/zx1P/vwv/wAVXzZRRYLH0n/wvfwl/wA8dT/78L/8VWTr/i7TPGyadf6WLhI7OaSGRZ0Ckl0DDGCePkNeBV6N4D/5Fa7/AOwlF/6Jkrpwn8eHqcGaL/Y6nozpaKKdIyM+UTYMDjOeccmvqr6n5t0G0UU6RlaV2RNiE5VM5wPTNHUdtBtFKpAZSwyAeR60MVLsVXapPC5zii+oW0Eop0bKkqM6b0DAsucZHpTaL6hbQKKdGypIC8e9cH5ckdqbR1C2gUU6NlViXTeNpAGcYOOD+FNoC2gUU5GRVcMm4lcKc42nI5/nTaLhYpz/APIf8Mf9hu1/9Cr6Cr59n/5D/hj/ALDdr/6FX0FXzeZ/7w/RH3fD/wDuS9WFFFFeee2FFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV5/wDFH7mg/wDX4/8A6KevQK8/+KP3NB/6/H/9FPXRhP48PVHFmX+51fRnHRM8Nvd3EbbZYYGMbf3XYhEb8GcH8Kr6zaLBqenW9oJ2DxgSWqymOOSGFWb7wIIYAnBB71MWZdM1LZguLbzQD38t0lP6Rn8qb/bUdzfaBdrH9qiu45ENhC4ErGSNl4JPCgkgnt+HHPnsqizSg/s6/ic3DcIPKa1knJv8ihp17DPBFF9oEswT5jgjOMc89jkEHvnIpYLpnvXtyxZ0XdKvlbRFk/IA2478gEnhcY79tKaxsLDTrPWbS4u7ixltpJlWcp5iBRll4ABxtGOOe9YNzqOk6V4thtLewvDJfQ28n2g3ofzTLGrDehXbjLY+XbgZIx0r3a2O5HTte39L77ni4fKPbRrbX2V+j3v00t5Ha3OqXGheDrW8sZzawmWQ39zHCJXQj7i7dy9RjuOprc1JNPvtC0u78U3v9maobchljnWJ2DDDJhuCCDz6H0xx57qkunvpGow3tvcXItbNb37Mlx5Uco84R5YgbiRk8ZxwOMnI4rxVqf8Aa2j6Vd4mCl5lVZ5RK4A2cF8Dd9SM/lXnYqp++kvM9vLqF8LTl3S6+Wnz7+bZ6LO2iQT6g2lwaKkV2samG+njuEDIflkwz8thmGOByORg5ZFdeREI47rwqFG/AGnWy7d67WwBL3HB9RweK41/ANhYaVbanq+vtaWd0kAikWzMm2SSMyEMA+dqgAZGSc9BWDrXh+HStG0fUYNTjvU1FJGIjiZBGyEArlsFuT1wOnfrWLqQUmnBdt3/AJnWsPV5bKq/uX+R6Rq0cOsaXc2Fxe+H0SfyT51rFDbyRtHgBvllO/5Sw2nH3uCMYra07TPDcGmWUUlvqEaFDDvs5xIl2mcFWOfwIXHccDgeO+H/AAhrnilZzo1mbowFfMHmKm0HOOWIHY/56ei6I+r6La3Xh+7gks7m3tLW2cGRGw8k8jblKk4PlyuQQc5X8l7elBOUoaLzJnha87KFXXzS/Sx2XiB9Avb5ZLmPVrOTylilhjVUE0YIZVOTkDKjkYPH1rlZILKG0uYNO0rTDDJdi6SHUVknETEbW2/N82QFPzEYIPYgLU1RZ7PUTYWMubZY3uFtoI1Bt2KhV68eWzgEgYxljnmrQzgZ698V35bHDZhh1VUWrnhZricblmI9mpxa10/VroWBduLYwCy0AR+X5Wz+xzjbvD7f9d03AN9Rn6ZutWb+IbXyLtNNtVW8F2JbG3eJyWGJMqWYEkBDnI5Xv20LWA3N1DApAMjhAT2ycVp6nqGhaXLdwS6PcSWlrJJbvdRT5n8xFVifLJA24YfrW+Iw2EoWUkzLBZhmeLv7OS07r/L9SKyj8NWywyLFqUIRY/Ns45Q8UzRsGUlmJYDKg4FRNq90NYk1OGQxTvIX+U8DPb3FctrF/wCI2g0ubRdInlt7i2+0OY7Myj5nbam4DsoXODnJPTgC7LpXi+NnX7DcYAn+b+z3wPLhEgOc/wATZQe49eBnSxeEpXtF6+n+ZtiMszLEcvNUjp6rX7jp7ifw7qGrRa1e2N19vQrI0MbL5LyLjDc8joOnXAznFZl3dPe3k11LgPK5cgdBmufu9avtIvNH07U7ctNcWYnuMwrFIHkY7FA4wFAAOeuWz0G3TjndjEXh8tZt/l5cFvk2g5A6feGPofSunB1sLf3NG9NTgzTC49RXtfejFXuieiinFQIlfeCxJBTHKj1/H+navUueAlcbRRTmUKiMJFYt1UA5X6/5/wDrFwsNqOaZLeCSaQ4SNS7H0AGTUlNu7aOe0aBpAyzRlXC5BXORjnv/AJ+ik3bTccEm1zbE1toOqX9ol3FdXG8ruaC10/z44j/ceQupZhwGCA7Tkc4rNS7F1pWp5G2WK0vYZV54dYJMjnB9+Rn1APTt9E8dx6PoNpps2j3cs9rCsSyQNH5cm0Y3EswIJ6ng9e9cjeu88WtXcoVZru2vZpFToCYJOB64AAz3x+XhQeKcantb2s9/0PsJxy9VaH1e3NzLbt5/8HU8Zoooryz6cKKKKACpbW2lvLuG1t03zTOsca5AyxOAMnjqaiq7o95Hp+t2F7KGaO3uY5XCDJIVgTj34prfUTvbQ1/+EC8S/ZZJ/wCzshHZDGJozIdsnlsQm7cVD8bgMe9Zut6Bqfh27S11S2EErpvULIkgIyV6qSOqkde1df4g8T+FfE7pd36avHPFvhSKBIwpRrhpA5Yt1CMQVxycc96wfGes6drOqWzaQLiPTra2S3t4J4VjMSrnjh23EkkljjJJ4qdRr+vw/wCCc5RRRTAKKKKACvRvAf8AyK13/wBhKP8A9EyV5zXo3gP/AJFa7/7CUX/omSujCfx4epwZp/udT0Z0mnadea9Abizu5o0yfLitbMXEjKCV3OWdVQEqcLncQM8VBHJNFfXWn3YIubYruJjMe5W6Ha3KnggjkcZBIINdH4Q8TW/hHSH0yTTLm4i815UmtihY7j0YMy8jgAgngDpimTTJrmrXHiDVIHhgIS1t7aEgySbdzKgJwM8szHoB34zXfDEYijVlUxDtBXv2+R4NbC4HEYaNLCJOo7Wtv53+Xf5GPRWlqsVmyQXtgjwwTF0aBzlopEIDLnPI5BB9/wAuQl0m6ddscdrG25yZhI24kqQHxtxuJxn2GM+np08SqtONSmrpngVME6NaVGs+Vx/ryN2iobaMxQKpjjixnEcZJVBnhQTzgDgfSrEbBJFYoHAOSrZwfY4rdN2uckopSaT0G0VNbW8l7drBCoDyNwM8KOvX0A/lWkLfSHt5XsZZ7i4tUErCdNsVxHkKWjwQcAkdT3B9Kwq4qlSnGE370tkdVDAV69OdWmvdjuzHorIuNOnkuJHSC2O+VWMrSMGKg56AYyOg6+vGK0rGP7JEEZVkAL4DEngk45znIyPxFaxnJ7oynShGKal/X3ktFFORwm7MavlcDdn5T68Ef5/S2YobRRTlcKrgxqxYYBOcrz1HPtj/ADwMEUZ/+Q/4Y/7Ddr/6FX0FXz7P/wAh/wAMf9hu0/8AQq+gq+bzP/eH6I+74f8A9yXqwooorzz2wooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACvP8A4o/c0H/r8f8A9FPXoFef/FH7mg/9fj/+inrown8eHqjizL/c6vozjIpTDIHABxkFWGQwPBBHoRkGtnS9A8H6NoK3F9YTXh1Fykdvs8yTCEsQu3BOOST7D04w6l1uTUrjwS0FnbKZIJCyXz3aWy2yMQGBd2Ucnbx9M44r2M0pw5FVa1TPlcgrVPayoJ+7Jf5a/d+hu+OJrCXwzYSaXtWxNlP5QToF2/8A665DXrJ01Pw/cf2dKiqunKtz/Z7KmQiDAmLc+m0j+Vbmo3EWoaVZ2kdn9jsEs3giginSU4KkMVcHY2SeGzjI5wQQOQj1G08QeKLeR/DV7Z3dkIl+0LdljD5ShV81SoG3KgHG09cZPFeXW2p21/4d/ifQ4P4q/Npql2t7q19Oxu20D3F5q6Lavct/Y4URx2xuGYfaEOAgI3dDxkdPY1yOteH9UvtMtUsdKuT5NxOHjW2aMxk7OChJK/TPFb+uapb6RaTSTaPNqEV9bCzlb7R5UUarJ5gBxzuJHsMDjPOM9YHk8OYsdCQC3kM5tr2M3DQRMDufIwdoKpzjow9M1njP48/U6MrVsHS1voiWLU/Ga2sNrdeEoLyC2SHyI7i2crG8SFFfAfklTyDwcDgVz95o3iy90nT9Nl0KdYbDzTEyQkMfMbcc846jjAFWQmrMXePwxp8tpHkyXcemSGJABliT2C9+OKPL1c7pI/C+nyWiBjJeJpknkoF++S3YL344xXM9Xc7/ACJfDh+IHhL7R/Y9hdwC42+aGtg4OM4+9nHU/nXV2Z1Oa8S+1x5Dqd49lLOrxrHtwbtAABjjCIfx/LkGh1gI0w8LWLWa7i94NLl8ldpIYlscBSCDxwQa6O1gvtT8I3EUFstveokkduLWF40JhkEo2g85w1wMDnINZ1oe0pSguqaLhLlmpdjoLy2mu7+/hsI/MvTpjFVQZbPmx7Tj061zlnHfQ3qxyQ3EdsIiMTuHdW3HgncSTjHY8d+1aOmxeINeuIdd0awurZTC1uZ4Hj3SyBQygksAI1fqRk8EYyONfxJLHNrtw8bxvwod4/us4UBiPbOa9DhmM6eHjRkmmrv8T5vivl9q60bO9l+D1+Xz/wA8S6eeO1ke2ZlnAyhXqD6irA8Va0GW+Gn2rak8cUbXQtlEqDJ3kkkAtgAHAwOoFZV7qz2t69slsZSsIlyGP+11AB4+XtzkjitFG3ordMgGvoKlGnXlr0PmKOIr4SCaWktR0xedI4nubsW8YYLbR3LxxDJ3HhCD1yeTgZwMAADUsvDstxbR3hujZo5xC02q3CFscZX95n25rLpnizWNOa10eKS4SK6MP2SZXh837NFvUmdR/CdpOG68cd648ZTpUIc0YLVnpZXXxOLquE6stF3LF/pstnqqm/Esl7bRtFHJPL5jIjHOAx+ZhycbicBjjHausUaOzqih2+8wHJ+ta+vXsF7eQm1kMtvFAkUU2c+aoH3uOOf8+2XXbhacI0k0rX1PLx9apOvJTk3bTUKKKK6ThCinEJ5SkOd+TuUjp6c02kncbVgopzhAsZRyxK/MMY2nJ/PjFNoTuDVgqK6/5B+of9eF3/6Tyf5/zxO4Rduxy2VBbK4wfShLV74TWURxLc2tzEnBOWMEgHCgk/gCfb05sW74efod2WK2Np+qPEqK7f8A4VX4g9P/ACTu/wD4zVe1+Heq3pkFrPFMYztfy7a6O0+/7n2P5Gvlbn6UchRXb/8ACq/EH93/AMk7v/4zWj4I+HY1DXrefUFj1HSUEnnRwx3Kbj5RZRvKKBklCPmGQR1zyNpK4bnm9Fe6SeDfCUWgvqEWhWGpfuZWR7C5u5F8wbMKVDscLuO4gn7pOByBl+PPhQqa1bf8IxZ/ZrJrVS6GO6m/ebmychHxxt4z26erFc8for07wl4BvdN8YWf9o29pd/ubh0sri0nxKRE+3IkiC43bep/XFehz6BY2mii6tPDlnfjyXwbnQFhl3+agyyrETwrNgCPnbnBpXHY+bqK+i/FPw70G/vZLltENpbG2tlH9m2r+ZCxaYuRHGu1yT5SngkDJ44NVE+F2gJ4j0+2l0CV7SSSbzXVrhU27AUydxAweMlhk9m/ha1dhNpK58/0V6Dqnwyv5df1VNKCCzhvZYo4xb3TmNQx2qSIjn5SvOTnIOTnNU5fhjrkELzTMkcSKWd3tLoBQBkknyeBSuM4qvRvAf/IrXf8A2Eo//RMlZdt8NdZvIfOtpElj3FdyWt0QCDgj/U9QQQRXWaJ4cvfDPh54L84kuL9HQeVLHkLE4P8ArFXPUdM10YT+PD1ODNP9zqejLyI0jqiAlmIAA7mtxEVr5kRt1vYZtYcdC4P75x9X+X6IKoaZILSS41EqG+wwPcKp/iccIPxcrV63jTTdLRJJQFgjzJKx44GWYn65NcXGeNcacMLH7WrOXgnApueLkttF/X9bGIkt5cWd5pwiD6s+pzNDbxcnyzHEEkPPyqccscDg9McYNkbiC5jizbTCGXy7mSKdmkRm8zbG4LbWICg7kBHyn5q3FYajo8epJdXK2+qs7taB9ieWjGNdwHLZ2sSCccjjiqcr2UNwT9ot7aPzBKbdCsabwGUNjtgMw49s9Bj1Mtw+I+rUZSaio20/M480xeEjicRTUXKUutvLSxdopsM8bkPFJG+054IYVKd003Cjc7cKoxyfSvo7nxnL06l+CIx6ekI4k1JmRiOq2yY8z/vpiqfTdTbq7Npr0QmWOKyOn3S+ezhQH2g7eT/sgj/63F8Kh1e7KHMVptsIj6iP75/GRn/IfhlXlz9t1d4LS5MU2lRi8kkEavh2/douGyM4ctkg42j6j81rYypjM9i4K6i7L+vwP1nD4KngckcJ6XV2c7qgu4xBqTrBFYMGW3N5K8a3L7TgKqkMQSVw/C/KcnFX7Ey/ZykyFJI5HjZSwbG1iMbgSDjHXJ6daklgFxO9zO7z3jf8vMzb5AexDHpjsBwPSnRoUU7nLszM7MQBuYkknA4HJPA4r7zD0K8azqVHo0fnuNxeFqYWNGjFpxe73as/1H0U6OQxMSApypXDDI5GKbXeeRoFFOSQxrIAFO9duWGSOQePTpTaNQ0Kc/8AyH/DH/Ybtf8A0KvoKvn2f/kP+GP+w3a/+hV9BV83mf8AvD9Efd8P/wC5L1YUUUV557YUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXn/wAUfuaD/wBfj/8Aop69Arz/AOKP3NB/6/H/APRT10YT+PD1RxZl/udX0Z59dahDaXMEEgfdNnaVAIGCo9c9WHQGopo4tTsNcHnJbpJo0fMqtwRdKQSFBPt09PfFqW1hmmimkTMkX3GDEEcgnp/uj+XrTwrWllq0iSQxRzafHbwme+W2R5vO3FAxYfMEG7gjAPvXs5pf2Ovc+X4fcPrK5U72d+2//DEHwyjtLJoEuJ4poo798yqGCn5EwfmAOAc9QK6vSNM1jT/Eerajqqyx2tzA66g0gQRSlSfK8ohiW4Y9QMdOe3HaPBdQWEv2xNk0s7Sr/pAnVkKIAyyAkMMhhnJ6EdjirpmlXVi1orvGyQghiG4GVA+UbeORk4Iz1PJ4wpYX21OnJPS36s68Rjlh69eE97prz0X+S+86zUYl1jwdDpdnK0kSyP8A2lDaFGnQn/VsUZl4+6OSP0pg1p9E1SSbUk+16lNbLDdmG5j8v7qh0I2N8wK881z/APZf+nT3PnE+achSPucJ05/2B+nTFbOkeH7aDS5dQ1XUoLS1abasrxEsxwoAxnJ4AyfX9FicE3Jzk7J/5hgM1jGEaUI8zSXl0V99Px/MksPFWm6Zam1s9IlitmWRXi+1IwcPt3ZzGSeFA+lJZ+KdM0+0+yWukSx2xjljaI3SMHEm3fnMZJztHfpUeqRWelq7pfW11Etq12jQsOY17n+7yVUepYDpkrgWfibT7+NDb2t+7NNHBgQxgeY+dq58zvtP5VxPD0k7e0X4nrLHYhx5lQdvVHS2vizTrOw+wQaTMlmYpYmhN0jBlkIL5JjyScetLYa3Yzy2On2lpcWZiSeG1b7WrCN5lILH5ASSxzncMVzsOt2E8bukFyix2rXbtOqIojB25GGYnLYUDHJI6Dkb2nQaJeaRFql1rVtaWk+RD5ibnOOu5QflwePwPahYak3ZVF9zFLHYiKTlQa+a/pGpO2nwQWkmt3Oo3N5cW4nf7OQRDDwAzZ7ZI/Fq5PXdbsNLsr650+Rb+K3uI7ZZCrKHdgzHuCNqpycHJYccGuw1T7BCLW01eya8MMIWC4trpolmgJBCtt6rlRx/sj0zWNNeQ2Vpq1/ZW0NkkjRyPBbW0bAsG2jaHBVCQxBbaf4eM5DdNWWKhTc4u0V1POw8cvq1lTqRvN9Hf8f6flocgdbhv9O+3S6LA8Xlu7ebOCxCFVP/ACz9ZMDnuelXZtfbTrPUp7uwRVtL1bBI0kLFpASXIb5cAKp6qcll9DXUaJrvie+to8LYWNiybo/3YeVg2DyAdoz9B9PQ1+2m1fTDbarJp00CyicnyjbOHGRu8xWIHBI5Vh7cV4cuIYRnyOrr/XZH0C4fpON/ZK39d2ZC3sEqGWAvLAAGMoQgKpIClvQEkD8aXVbrxDN4a1aDR579WtL60MZtGKMFaBi4yuCRuI656L6DDmsLJUguLWMxQTR7ljVioAVyMMAcOA0eQTnICtx2hvDBBoHiAznKtfWY+W288/6hm5UsoA689Rz7Y93GznUw8Zyad3pbtY+fyinSpY2dKmmrJ3vbe62sQ2GqTS6NYXGqTSNdzBkdnQ53K7D5sDjgDJPfrzVyC4iuYhLC25M4zgj+dZWlWUF74d01mJ2LvdNvHSVscHPp0rVhtYLNWiti5i3FgXAB5Occdh0HsK9PBuXs4rpY8HM1Tdeo7vm5n6bslop8cUkrbY43cgZwoJqU2U3lLi3uPNydw8s4A4x/X/PTqcktGecoSaukV6Kn+xXX/PtN/wB+zUTqqhQC+/neGGMH25o5k9gcJLdDaKzU1UtNNH5BxFKsZYNwMsVycgdx0Geo/C7Z3Ed9aQzwLLllJdXQgqcnt16Y/wA81MasJWszSWHqRV2v6ZLVzSbK21DWrG2u4EnheddyOMg81F9iuv8An2m/79mtTQrSVfEenskNxsEqFi8ZGD3/AA/z9M684+zkvJmuEhNV4O3VfmdD4r0TStC02DUNNsLe1uorlCsqIAV4J/pXBadJcTPFZXgJguxBdNG6ACQM77W+h59v6ehfFNtnge5bjgk89PuNXD3AuRqHhS4tne60ZrSOGG8llDSu5zIVcZyCABgdAM8+ng0JQXs1JLW//APscbCrL20oSaso9e2r+9Ha+ItH0/w+bS/0iwitruMyMht4xvfEbfIM8ZboOD16V57oGqa5JAr2WoWGl6daz4JiRJZMqixZJkDBWKADII69BnFeifEyFp9ARFl8kDe7SddqqhZjgdeAeP5da81ikn17VGvD4ehnJ2wzXN8wEblAFLCJCuDlT3bGTg46eTmM1ChBqoob628z2cCpSxFS8HJXXXyR2D65rcLySDxNLmJdzpNBblFHqwVFbHB7iqlrcW3ifWLLVNZ+zXEa7ozJt2wvEi7y656KNzZyTgg8nHy5V34fF1EyyadpWWwC9t5tvIR6bi8nHsQR3+mlpNouq6gttcySlLgtaThmBdPkBG1hwRgrg4HTlR0rDJKkZymvb875XZNeXnqLO1OEadqXKuZXae2q6Le+xR03WDLqkUWiCSVbAPHHdSApBDlwxVVXDOSexZeMgjBrSvtc1O0tpp7vxLeDyV3tHbrEuB2wCpJz0GSa5uS2h0q7j0Q6rcR2Uh+W0gdPthYnOFYAKi9Gw2CQeOORqXGl2t3bsv8AwjlssjEFrq5v2edsdOSjbR7A49q5cbOuq79vWVNdl/wP69TtwcaSoL2FNz03f/BH6pr3iSw0+2u7G/Fvezusd9cSqJWjHmYiDqQwQYc52gAOSMjgHT0zW/GFur/aNftL6QH7slkqge3yFSP1riL2C3ht94F1exvOLZLGO8VkZsAkiQplxyoKkDaSCGzjGra28N1aup8Maho5JAkl06+RXkxjBCfKgx0z1Nb46onyyoV+Xb4rameDhUinGvSu7v4b/wBXN6yVNS1uCHW1Hlz3QlMcxV4pZCioSHAX5jtB2soHYZqbx5p9p4fUnR7WK0e4s5YX8pB84YY2/jWb4Ysp9U1iKPU72a6EcyEwwkRKoUhlaSNkD53dwQp4wT0rU+Lf2fdpi3V1JaW7SIJLiI4eIbx8y+4r1MvlWcVLEKLdna2z0e/meXmEafvRoOSvKN7301W3lb5FHw9bDU/E6aTqsCzQW19ebYJUHy7i7fjn5TWJ8RQLWxGq+HdMtLTT7eZoftEYAeTnaW5/hLDAx6Z5BGLWtanqOieM9YvrhY4Eni/0GeOQOGUx+Skmc8nOCc46d+tYGr6/Pf8AgTS2JRbS3RPMiU7Ud8ybI2GeQFhwfdgfSt6sl7koae7+N2Rhqb/ewq+8nPrro1F29Fc6LTrbUY/D1kdQWJG1S5gcRr95Y4w0p3fUiL8+lal/PHbadczyqGjjiZmU8ggDpWR4m1qS+/4RCWOU7pdhkaM7dxeSMNx/2ycY9zVvUbH+0tZ8P2zT+VE2pJ5gJwHUKzFT9du36mvks3U8Vj4RnLfQ+ky2NPC4SSpxskcV49k1O1vtM0GIsq21rBbNt4DyFQWyf99m49vy7HSZ5r2zNrHp/hnTMwqDBLcGKR1ZQdy4AO0g9QScjqD0y/jLe6hFr1jotrCsVvkTJJgbpJHPLFvTIxjp8vsMCa7bx2/2P/hHdGscwruV5drurKDuBCggHPDZzkHv0+pSlUkox1PClKFCm51Hy3erQXHwo1a4uBeWRhkjA+7bXonwSONolAH5v+IrX8PaJFo00cmq313DeWO+5aC4iKCaOMbiRuLAnjrGxUelcL/Yri/F1p881umDzBOtywP+zv2YH/Aj9RXcWtzd/wDCC6it/q15dP5IhWG4VxkSukQf95kk/O6naxXnt2Jqth05NOKJpzwuL91NTa9LlzSo5I9KtvOOZmQSSn1dvmY/mTVMpDDbavcxIiNdXcVuSoxv8pC7H3+aQAn/AGfbiHTbm7vfBcdw8zC6mtWYSZwQxBwf5U+9stU07wHpd4m5o4rNZmunI/187bievOC6j8Py+d4bo/7dOvUfw3+/+kelxHOTwCo0k7zsvl/wxzfiH+17fw7/AG1ZBUs0m8stkbiMgbsHqpbgY9M9Kqa3deJND0rTNTuIIBb3aj5SPmBxkBhkc454/wD1WtT1641HwHpa7VSygTM0anajkNJ5cR5yRshbPqSprU1XXtU1WGzvUkLafZpELiKFjGZ5TbmZ/mUggBeAB3PtivqJYyvKXMpWueLTyvBwpqDpp8vW2r/zIdNv49T0+K7iG0OOVJ5U9xVurFn4TurbW9TsNKgaa1XyrqP5hlVkBGDnrzG1XbjQtY023knms3SLbtZsBsD+n1r3cPioVKcW2uZ+Z8djcuqUK84xi+VdbPb1MqkzS05JHRXVSAHXa3HuD/Sut36HnK3Uoz/8h/wx/wBhu1/9Cr6Cr59n/wCQ/wCGP+w3a/8AoVfQVfN5n/vD9Efd8P8A+5L1YUUUV557YUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXn/xR+5oP/X4/wD6KevQK8/+KP3NB/6/H/8ART10YT+PD1RxZl/udX0ZzGjacdV1WCz3bQ5JZvQAZP8AKnfFDwTpEWj232OG8m1fDC3SPLmRV5YEAc4z2559Omh4J/5GaH/cf+VW/Het2095/Zkumx3Qtsyl33ZTC5ZgVYbVAJBJP9K9LMOepW9mn7qV/wDgnz+SulQwzrtXm5WVtW9nb8zL/wCEZ0my8G6fqPh5rhrGT5isx3OS3Vj0xyMEDiubutRS0nkhkhmLJH5h2gdPzzx1z0rp4PH+opo93D4f0+yuW05Il8mCJ2Rd7cAkPwAquS2cA7R1JxnX/iltahm/tXRtDjupoWiZ4/E8UEihRuAO1ujE8DOMgbsDBGMMfKgvZJJ2e511cmhjJ/WZNrmWqt1+/wDAqA5Gan1DXYLXQ7K2lWZbmG7LW80RztBUlhtIO4nbgDjr1GM1k3Oo3emadeahe6dELWERRxtHcecJpJOcLIuFG0K+TzyAO+af9rsL+3EsYW5h8vzWG0M0SEYJdecYDYPpz2ya75YnD4mLhe3qeRTwGMwFRVXC6fRa+fT7/kWLGz8Lhr67s7C4eyS1a0uo7t5Haf8AeJscDcMZcR8AgbWJyMVJo0j3flPpfhTR9LsPMWdHuVedy6ZCMAJFPG49cda0vC8FnFrcMbxQpDKXDqVAR2ZSPmHfJxmq+k+Dry3luzq6X1lp1tuuNqSLDGJ+MCLafmQkE84xnGOMnws0wVeMlDDNJtLdfkfS5PmlKtSlUxF3Zv8AT+vRBe6MJ7G4gmsNI8qa2FsxtUltXWMOJAAxeQfeUHle3pUWjeHvDthp9rNHdajZX8cko+0g+ZnqrKUyU4yQGAx34IIEmq+F7jUNMiudH/tG5iu1K3cKyiYiVSuwMGI2pgHJHPPQjio/GdpcRX1lbxRsjw6ekciWbLHHFL824FQy9iuMYwc8isctweKjVccVLm9F/X5djXNMxoOhGeF92/d6f18+/oWNYu4rlYYdPR47e0tlt7cSnLYUcFvxqv4Phu31kW6rPF59pNF/pcqyJuI+UMNx3cgcYPHcAEHqrOS30z4f6bfSaXZzXkreWxnjD4OWzk9T93HWsK+8a/YdhHhzTJiQWIhs9xAGMnGff9K+gm06UklaKur3Xc+ZpQlDExbknOVpWSfbo9tvUNN8GHTdPu7rX4JYIraMGzi+1FStwS24oImC7CT3GR22jgc9fWQdsWsLRxs3muhmaRJJc5DSLIzBhnBwAM7cEHOV6eb4i6fFZm6vtK026wAsUEcQV84ySd2dqgA5464H05m78WW15cPdQaBdRRS/MESdQqj2+TpXDQwmF1jUhd73X3nqYrGY5uNSjOy2tLTyu72+R6fea/ZaPZ6dFNp6XM8lrHIzYUYGMdcexryvxjeatLqYu9J1m8020nlGbaOcxrGzMBuymN3XqRkAAdAMbE/iNNftLO6ktxZPFbpEkDTrIzx4yr8YPOT8uOOD34zb23kFnbXN7EsNrqERiSQ+XKrA8leeUkUqQcAFSDz3GjpYedJWfvvz8/wM4YjG0sTLmT9muyT6fe9dz0Tw9Hby+BL8TO13dwxSGW4miUM77Mhhj6DnOc5J5NedXWrQWcskcqvlE3kgqAfbkj8zge9db4Z8S6Ouk63o/wBtX7cIXYxhGIA27eWxtHzEDBPUgda4jUrjT45Ljz4ZnaKPfIY32kLlf9oHqV/T8Oig1RVRQkkk+vocOLhPFOjKpBuTi27LXfc9e+HWw6JcSgYLTdfbaMfzqrqPxX0KxS4ljgvbqGB9jSxRYTP+8xA+mTzUvwzkS48MTERvGhnZNjEZGAB2J9PWvK59VsfCfjS5srHWi6Syqxkt59sG7DqVkOGGACMrtIzjkBePNxTjKrOS17HvYBThh6cLNJJ326PZ7nqY+KWhwuq6hFc2G6MSAz7MFSMhgQxDD/dJrybxh49vJL6xvxZwCS9gNwYXHypGXKxglSCW2puJJ/iAAGK2JfBd5LArXym6juYY1aa1ut4uFUDDsw+8cAYJGMAdeTSXHh+7TTtMh/4RCy1S9t4vs73N1cOi7Eb5G27xwVOCOoIPbFQ4zpKM4O1+zNYTpYiU6VVXS/mVl8u5i6NdX+sLpjpY2CPqdzLBH8zDaYgrsx4Jx8+e5zmr2jeMte0PTdGtdEstKtV12cpCGjYlCJPLzkELjdnjB/w6i2tdZ0uOyh/4Rbw7G1vK00ZhnlKxhwFcAANhiB1yR7VAbPVzDpckXgjR5v7MmZ4Fivmh8vLBxsDEc7skk5Gew5qZ1q0oWk9C6OGwtKp+7ilIb4c+McrajqNnfAXdtE3+i3UrLEzgcHdhcDOCwGOACCTjNaqfGizkmZV0lzGr+WZBOSM4J6BOmFP6dua47R/hhqsGrXt3FbS/YxLmzQSqHHcFsNxtBx7nnPFVPEnhvVtJ0pDqhubayRnLedNGUkk/eYZBvyPkKLtVRyp6YBpxSVNSsnr3/wCDsE5ydaUVKSSXRK1/JtO78tjpPGXj8eIdLk0m2sJIblZFJVskhsEgEEAjjJ6dqoR6rNfahplvBZSxJPejUdQMrSEJcEFNke7gIAQeCScgcYNZ/hl38WXc8ltP5101y9x9nkaMSjIPc/OygMwAzgZ6Zr0Lw/4MvW1BJ9RiMEELBtu4EuR0HHQf5+nZThRdNVZyStsk/wDh2eTXq4pVpYelByUtHKSt5aWSVrFj4r3403QrG5JGVvI8L5vlb/mBK7u2QDz2Ga8p8MzDXvEMFi63FjbahKHeKwbyUUlhgr16DAOMDOBjjJ9Z+KFzLY6Xpt/BBFO9rd+aI5ThW+Ujk54xnOe2M9q4PTotP8P+PnSWdbe2tZ7eIyXLBdpzvb942DIMsSGOCRjjAFcUaMazjGa0s/wuz1K1d0I1JU37zaX3qKN/XPBsKT6glvrOuKIocT3HlLNEBgHyyqspDYYHIAAB+9V/Q9Hgils5rO6VYIb17FYYY0QRsFbLALI+D8vRvm/vVNfeJbBtcvB/ZTzO++1ZhqDrHIv3d2z7gJA+91xxnFO0vXIL3WLWzhsZIC98bmR5Lxp9zbSuBu6DGMAHAA4FbYfBVaCcowSTTva2xyYvMcHiXGHO3JSVvi3uvl9551oQK+I7nTdKvbG7u7hpM3lzvRoSqljvJB3KdrEBSeQ2T3HT3GivPpH2tvFExuo4GfZb2UsRRQdjO8RR3bn0CcZI4GawNDtNP0jVLvWNVgunjTUZLAJblZPMSaOTllbGzAcfOG55GODjv4/EGgXeilptRvtQKiS0mDPAZtrkE71TAAwmBgDv35rzlllKVZz9nd3trrr8z1nmSjRipVLaX00077HH3PhzVRbQ6C1/o0VrFJHDE4SbzFcJE4bAQqoBkX958u4uQSC9ab6Nd29lczaf4mtZ5Vtjdst5C7oqL94rIiqMcZI25GR6g1tN4i0xr9tT36lb77gsotxFmRAkQKOCSQMxjpg479RSatqWh2mmxailjqU82qQy6fEsRjVxvfBySQBlmUZ5xgcda6MVgPape3p3Xe3le3+focuDzCim1RqWfa/dpX+d/wATk/Durt4k16wijntLGaOZGTMrNOcYLbAFClSAVOSO+Rxiui+KlzfWN7o15p8Imnt3L7Tnpgg9Oe/UdOvbI43wrZ6ZovxBluLzVg0dlfPAk90ViGcHOc45yzDPQ9fp6/4o8PjXrJJIHAuYQTHzw4Pb/A0YLCUMLywWkZX6330DG4qviYzlT96UGulr2s/meH660+qvDpOmWdwNOtIZrex85naaUsGkwdwGeVwB2wPrT7nS5L3S4/DVrA/nRzq0qqM/dW1jPfsTIx+v5dXLoWq6TeadqF3aNHBBexB3LAhd58sHg+rioLCQWXxPmSRvknklEUmRtYPGjnnPYxkc+nHQ43xFKnTk4xldW0+8xwOIr1oKc4crctVbpbz87GPrlpdK/h6bTrN51jCXCwqcfL58xIBPQDev047Crct28CNrGrqJoUmlNrZxEANAnyvNv+8JMn5GGMFT65GrptzZX+hSxX1tdNLo9wbKJrSXYZi8gUR5P8Lfujkc88Yo1Twf4i1SUyPbyoUUR28a7BHAgZSEVRj5flA9cd64MPgFUxLr1LWS0u7PY7sbj5UaKpQUrt9FdWv5eX/APPvHmsaleawIZbxboJsaO8UbVljb5kb0AwBkDgMD7Y7myO6D7BdaP4c0PMKjdfT+UZsryUKqOf8AgW4Edqt+H/hbPcXi/wBqfbbLTrdQIbY3vmktjqCAAozk4x3Oc9uni8LanYRx2tl4itrmzb93DDqFqHcBR0Do67sY6Fe3Xiuibd/e1FRUeW0E0r/ff11PINb8LWumSPex69prxopZo7S9F9Ig9QrqpA/4F26it2xv4rz4d3tjBq8l5NFPbgQNuG1TMmCAxODu67WK9MYqz418STaTaXOki/spPMLQS/Y7NlBbALIHLn5sEZIRsBhyDiofD+n+H/DGnSpq2qxxrqFuoNlGCbiIsVZSQDncpA6pxg81lUjJxcEbRcbqZW0d9R1DRbDSkgl0+BLFjd3cqgtGqjb8qbgcs2AM468dOLeua5NqHhCPQdPtwYbxnSOCNixtZ4gSYh6oxCsgJyOR0AxLf3dvOI7bTXvHhEomuLu6Ty3uCFYKu3jCjdnBAwRnknIp6b4evtLmsNXSG9Fqt9E11M0oEEgJEavs4O4F2yeR8xOR0Dw2WvDYb2jjaUm7/wBPU5amaQxGMdGM7xilb1vr5dvvMu70qW40IeGbS0f7VHOjuqjPKxwK3GezNKx+prXa3S08I64qDERnivkUHhUeUx7Rz02R4q/ayCz+KDhj+6nkfZLkbSGiU9c8fNGw56446HEEYkvdC8RWiqd8Sx6ch6Bm8+UoQfQrLGc+9XJRTVjam5uL5t7v89PwN6HxMPDGo2V9d2xMWo6TbhWaQKAULHnrj/WDrjrXYaJ4sstdle1eLyJSPljdgwkHfB/pXkmqab4qs7LRdP1jS4ZLbTyzwzyYY+ZuYgZDD5MFQVxyF/K/oMQttQ06FC2I5I1Uk88EV6GFwqq0pOUbW2f9aHh5hmUsPiIKnO6e8bLT57r5nQ+LvDK6S4vbTi0kbaUzzG3p9OK5avTvHv8AyLg/67p/WvM1kdFdVdlVxtYA9RkHB/ED8q9PAVZ1KCctWeBnWHp0MW401ZNXKM//ACH/AAx/2G7X/wBCr6Cr59n/AOQ/4Y/7Ddr/AOhV9BV5OZ/7w/RH0vD/APuS9WFFFFeee2FFFFABRRRQAUUUUAFFFFABRRWF4uvL2y0RXsJLhLh7qCIG3EZkIaRVIXzPkyQT97ijyA3aK898Q+INY0A30jX8v2aLTEVTcRRb47lhIUdio28lNuB8uSuKn1W71mwj1iaLW9Rl8q6toYolhtiUWV4923MYy2GIG4kc85PNNq1gj72x3dFee6LqWs61qWkrPd6n9n2PcZhFspKiVlT7QCOpUAFY+h7Ajjf8H3GoXuny3moT30hkkIQXCwBMBjzH5Q3Y7fPzx+cp3/H8NAejsdHRRRTAK8/+KP3NB/6/H/8ART16BXn/AMUfuaD/ANfj/wDop66MJ/Hh6o4sy/3Or6MyvBP/ACM0P+4/8q5z4iaj9n8X3ls0I2+WHEhnaLdnClAR65GQSB6kVv8Ag+eG28RQyTypEmxxudgo6eprA+KGpWreI9lpH5mzbNJIoMqyfKRt+UgKuMZOeo7Yr08bzKu+XrHytv5nz2VRhLCR5+k292nturamFdy2d7Z6b52wRRy/vtOt5dpkO9lMqbMh8jHO4HC8Ej7vVadcSw6TI+l+HL9rKIbomRRtkBAJOS3HBzzz647JB4G0bxXYWWtPrK6fJLEc20hDYGSCCdykjIPpxWlcWMmiaJqtlaXl7eO0GEnh1GGON8hBkRl87gQ5PA3D5ckEAeDjcro4qp77k9u9vN26H0uCzGrQppe6t92tOyv19XY51dW0ybWAhggsVQqsplwss53fPCFHyuCBg5OBuyM8UwadZxgLBCYY1XYEjdlBXjhsH5hwOuc1Qk0FZ9TN5LcE/PuCKuO23qSe3GQB27jNbFe9leVU8HBwcb69Xf8A4Y+TznOp4yUJ05201S0s/Xdmho9hFf3cnnymK3giaaZlGWCj09+lLqur6K2kLMkupxS5QW1tcksLkP8Ac2noucg5PbnFRaZqMmmXfnIiyKylJI3HDqeoNRXsOgz2zxW2hRwSPt/0mSVppowgAQRs3KAYGAOOAOnFdGLhiXO9LYwy6rgI0msTv89f6+XzOefxfPa+KrnRrODlJzbLKkzQhivDMw+Y4yCfpjimP4hu2hWVNNR3ke3jUfasktMrMn8Hohzz6fh0N9rWq291cajDqYiQEyLFDp1spQ98OyknPPUjr14zUMXiTWNQ+S31yfMaxuzT2dtLtPOMfIORg9+45rgUcfe3X1R7TlkzXNZWXlKxY/4TKC+s7zwyY/3ml3eI5Y0bEqgMrnGTj5zxz0I9DWLf2DajcRbyYTACHgmjbncFIyAwyCuD6EH8uq07wH4a1S3v9SvL61W81CczFJAuIOu4KpbI3EluvAwB0ydOHwTpVumxPElvgADLkMcABRyZM4AAA9AAO1Xh6louliNru+jvf1RjjKN6ixGC+JJWd42ta2z12OHTRbCRY7JbGMs6sxnUhJQqIxb5iPmyuRtJAJwcjAIhGnPFrI0aIzIUujaJuYKSB91sMueQM9SMZOTXpVj4U0K3v4bm91awvUhO5YpETG7GAeWPSuZ1i001fEOq3dna2u5I7m4jkiRf9YImbcCO+R1rRyTqSlS+FK/VbGcFKFCEMRrNytupaP7+pgPZaTaWduDAAkkR+xag4zMwT7gLdFZlOUAweAvzHBGbFqmm3PhF7KaO5trtFj2o2HijiQsC0IJyHO7L5PILcgDjrb+1gmi0KykuIkt5Ly3jaJ1BEy5Axg9h1/CtHXvCun2vhzU5o/EFq7RWcrLGqqC2EJwPn9q+fynELG4dzrOzTdtHqfR5nCeDxCVCN1JK/vJWtpdJ9/0PPPADWup+IL6KMSRSXdq5dpJQ7ErIkvUAAAlBzjgZ/DU1PSLy7u7W6tNKu7qNTiSeBduAGVsKSRuYbTwDkHjgjjL+EjOPE05CrtFjPuYnBA4z3/D/ADxo+ILKS88FahAbuCNYtXglQ3E4UZe1LMoz0yTnsOvpx1wrTjTlHo2hVsLSlXhPZpO1tOy/U6S21C+0rSbzS7P5YrqJ0COrKQxBHfDKc8HoevQ9OP8AEXinWLXwz4VvbG6FmtzazCSG3jVIiyTMv3Bx0x27VteGmmOm6StxI8jqqDc7EkgtkDOegBAHsBUoWBPAPhZHi8KoWtpvk1iSVmOZCSYyhwMnk5IwTjjHHVjoq1OpazktTzsnk1OtRu2oSsr/ADPO/GFy95daXcSLGryabCWESBFzz0UcD6DA+lc7XReMFCXemqoQAadDxG2VH3uhycj3rna8890KKKKAPXvhTrdzpXhm+jtZEWWSd3QOM7iqx5GP90sf+A10A1zUtQ+IHh5bwW7i6WeEBohujxEWBQn7uS65IwTtHOOK828KagumWGkXMjbYTrDxTH/pm8So/wD46xr0DS4mHj7QUnAeSG4lT53I24jYZHPUbcAf5HZTjGWGnpqrfieTXlUhj6Vm+WSat0uk2efeG/GOu3PiLT47q5F6qzq+64QM8QU5LK/DDgHjOD0IIr2K28datDeILxIniyN6bNpwe4NeeAwf2pYyQr4S3J5w3aK8okGIJOGVzyucc46gc0warqE9p537rz9jEF1OWZWUAbd3Gc4HPoeldGX06U4SdRXOHOa+IhVgqErf1/wD23xfp8Oo6ckc6eZGpJZNxAIIxzgg457EH3rzW31uezuGns7e0tpDn5o4BuGcZG45OOB37e3HS+Hby6utIvluLiWURhAgdyQoz2yeBUOk2VpP4Slne2gLxRSs0ksTLz8wGHxg9vlyeewPNcdeEqUnTbvb/hz1sFUp4mmq8Y2cv00Mexij1ZLlEtIYJIYmm8yHKrx2K5xz/s4x/KfwqQviWx/3/wClL4UG6fUV3AZsmGScAcrWfYlo9TtsNhlmXBU+4716mAnKpQnCT9PuPnM6pU6GLpVYRtd3fnZl/W4INIuU8u0gkecCUyTAuxxvC8E7Rw7dsjPU4qk+tyTpDHdWtrNFANsSeXs8sYxhSpGBwOOnA44rd18Rt4h0YTKXjKRB1Cltw3DIwMk/TFVvGFrFamyCQ20TOjORDEYzj5eGUgEc7sZ/TFeO6km1NvU+pjQpqHs1FWtt5GbqdiLGaLAKrNGJFVmyV5IxkdeVPP8ALt0P9mW2p+DrD7SnmpDHcMYyxAIz3IIPYdCDz1GKz/ESGW6sVDqp+yE5Y4HDyH+lXPDjsdB1BSxwI5MDPTha9nEVJywcZ31/zuj5TB0acM0nR5fdd191pfoYEOu3NtdS3NvDawzSlmd0hBY7jlssckgnrz29uOo8M+K7pbO4thZQGK2haVdjFQoAJ245wODgDAHTGOmf4ThE9rcIlppt3OdwSK5wHBwMEZ6ryeMdutVfDedurZ4Is5enb5GrxopOaT8j6yreNKUo6Wuamp+M/wC2NJu7GbTv3UsRDMknKejDjgg4I9xXmEWiHyPsbwlY1nMqsDhQpRgY8hslSSCAVG0FsHJrowzKGAYgMMEA9azNSs7i6jnSJImEsQQb5Cu1gSc/dPr+n5e9Uy+gtVH7m/8AgnxNDO8Y3yua16tLT02/Eu+GpLrS7W3t57UyQWtwk0jF8eYEOYwQCQSGAO7AJCKMccd7/wALFk/6B6f9/P8A61cOrME27iAcZAPBoq45bh1o1f5mdTPcbJ3jK3ol/wAE7pfiJJ99tMzGCAxEnT9PY/lWzpujtczaZqp1J2jgaaWKFIVVWSUE4bO47hnqCBx0ry3cwQruO0nJGeM13WjeObGy0m3tbq3uPMiXZmMKQQPqRXJjMAkk6MdT08qzmUpyWLnpbS66/I8svIb7Q9Smku7e8TWI7qVoP9GMkMYKqofesgIyAM/K3Cg44xRogeKW5hFuywK5EU7LguoOAScDOeucevSvYv8AhYWk/wDPve/98J/8VR/wsLSf+fe9/wC+E/8Aiqyowr0qvtORt+v/AADpxVXB4jD+wdaKS20elvmYfhbwk9+yXt+hS1BykZ4Mn/1q6rxXc6da+HLm0vBiO4iaFIoyFY8Y+X0xwc9qzpPiHpgjYxWt2z4+UMqgE+53GuD1PU7nVr17q6fLnoo6KPQe1bLD18VV5q6tFdP6/M5ZY7CZdh/Z4R8031/X/Jf0+Ui0Jo4PsclsViM7To44TaUZWX72WUtt4KjA3DdnmtvwvI+kJaWl1bu1tBdJNIwfBkVG3IuM4JDYO4hchQMeiXQmkjj8shjGwIV3IGM8jODiodPtpLWGVJAgzKzKFx0PqQBz1/xPWtlltHms0/vOV59i3ByUl06fj/Wh6h44uob3wvaXNu4eKS4Uqw/3XrhtK/5C9n/12T+Yrob/AP5JppX/AF9N/OSue0r/AJC9n/12T+YrTCwUKEoLo5GGY1XVxdOo92ov7z0Px7/yLg/67p/WvLfOUu6oskjR/f8AKjZ9n+9tBx+NepePf+RcH/XdP615rpj6re22q6NZ3DWNjO73F3fqSGtFiSFg64Izu6EdwOowa4aGIlh8JzxXU9fGYKGMzN05tpKN9PUzXkSXW/C0kbh0bW7QhlOQfmr6ErwCc+Hpf7NmsNW1e51kanC9sGtFVZpiQyuVcgDcT1LLnk4713X2j4i/88Z//AW0/wDkiuHFV/b1Oe1tD2MuwjwlH2V72bPRaK86+0fEX/njP/4C2n/yRU0HjHxDpV3Bp2taBNLNcEeROJIYQ/YqR5jLnOP4h94DAyM8x3nf0VS07UotRicqjxTxNsmgkwHib0OOPoRkHsau0AFFc/4t1bUtHsILmwiTy/NxdTvbPcCCPax3+WjKxG4KCQeAScGsx/FWouz3lu+nyadbS2kMwRGZpjNsJeN9wAUCVSAVOcHkUDszs6K88t/GWuXmk6tdW8lgz2Vq1yWbT5lSMgt+6OZBvJAzuUgD0ORV/VPEur6bcSWTSWjTIloTPHYSyjMrShsQo5Y4Ea4AOeT+AtY839dgt/X9ep2lFRW3mm1iMzq8uwb2WMxgnHJCkkr9CTipaBBVe9sbPUrVrW+tYLq3bBaKeMOhwcjIPHWp2OK5dviF4aEska6g8uxipeG1mkQkejKpU/UGgDbOi6UbM2Z0yzNqVVDB5C7CqnKjbjGAeQO1TvZWsm/fbQtvZXbdGDuZcbSfUjAwe2BXNn4jeGRJ5Zvp9+N237DPnHr9ykT4keGZAGS8uGU8hhp9xg/jsouGxsy6FostxHPLpFhJPE5kjka2QsjltxYHGQS3OfXmpbLStL0yWaWw060tZJzmVoIFQyHnliBz1PX1rhfE/ifUfEVi2l+B/NmvyvmTyvG0HlR5AGDJt5Jz0z9015foNlc29r9qnkYXUNx5EEiSBf3zgEtvB6KCgB6bpVJ4DApBufS4IPSlr58vPEF9qV/JZ2enr4ov4V3SS39ks4giGAAiDAUszbmPUAqDnYTWx8MviXp2jeHZdJ8Taglu1lJtt35l3If4fkz90/ocdqYHtdeffFH7mhf9fb/+iXrp9D8WaJ4k3f2Te+fgFuYnj3AHBK7gN2DwcZxkZ61X8R20F3rPhuK4iWRDeyZVhkf8e0p/oK0ozVOpGb6M58VRdahOktG00eWyCMPiJnK4HLDBzjnv6/59Oe167iiubiFnYu1oCEUFsfe5OOnbk4/w+gJtF0W3gkmk0+3CRqXY7BwAMmvF/GGu6Td30ElhpJtZbafzZnhkIMkcaM2GCkc4YEN26Z9PWqZhzw5oR27+aZ85hsn9hW5Kkk3JaJJ9GnfyXQzotSMGm6DGkkJSW1Y/OeWIl24U56/MfXp27P0rU5L8RmQwldzLI0RzggA8YJB4PXP4DoPSfDv/AAjHiLSk063sIrFlj/0cRn+HrkHueSSD7n1xnz+B9aindIoUljB+VxIoyPoTW9Cuo+5VlytLr187nJjMK6l6tCHOpN6q91vo1a6OcfYJG8ssUydpYYOPelj8vzU80sseRuKjJA74HFb3/CFa9/z5r/3+T/Gj/hCte/581/7/ACf411/WaFrc6+9Hl/UMXe/spfczn6dGIzIPNZ1TuVGSPwyK3v8AhCte/wCfNf8Av8n+NH/CFa9/z5r/AN/k/wAaf1mha3OvvQLL8Xe/spfcznJI1ljKOMqeCKZZ2NlayOyRCLcmC0a8nAO0Hnp29h9K6b/hCte/581/7/J/jR/whWvf8+a/9/k/xqXiMO9edX9UVHBY1Kypyt2szn6cgjIfzGYEL8m0Zyffnp/n6b3/AAhWvf8APmv/AH+T/Gj/AIQrXv8AnzX/AL/J/jTeJoP7a+9ErL8Wv+XUvuZz9WLI26zn7UziNhsYKucq3yt3/uk/j+mx/wAIVr3/AD5r/wB/k/xo/wCEK17/AJ81/wC/yf40p16E4uLmtfNFU8FjKc1NUpXXkziba31UacNKuFjtW0uZpjet820ht0YQH1J4J/gBIBFZp1yS8tLy2kiP/Ho7F8FSp2tnI9PlPII6r0zgdxf+DfGE1wqRW0zxpERDm8QQxkg5yuSck7TkDsOnOYdQ8Ga1YeFryWayjhEVm7y7ZU+XCHPQ89K8XCYajhYyjSqJXbb87/P+rn02MxFfGSjKrQb2S393u9vz7HG/CQp/wlb/ADkP9jm2rnjOByeeneuraG+l8J6g9laahK02pQhVtblbdnVLYI2CyncAwIKgdR2wRXJ/CqUW/iJ3mMccUlpNGGdwCxIHyjnknH+ey+LbbStS1aG5T7VEwjVbiMSGVVOV5UnAQEtnBOAW7ZrghGUou2x71aUI1YKW7Tto/K5uaO09notrNPBJDLbxMzROpDp5RYEEHkH5DxS6hdahZeFvDumQWfhgXUFoVubTUGt/NjYvkDbK+VJGGI45J+g7+ztNDvPhsl3YRzSrFbBVluZGaXGBwWyD909sYBGMYGPELrwpa/2qYor5jC7gNI5DPGTnqMjdjgZ45Zc4yK7K/PVhDT4fd+Z5WD9jhq1W8vjvPrtr+WpX8bRTwalYRXUH2edbCIPCBgIctwBnp6VzNdV49t0s9W0+2jd2SLToEUucnABp3w/8MWPirWbmzv5poo4rfzFaKQKd3mIndWzwxwAOTgZFcfI03F7r9D2ITjOKlHZ2/E5OiuxuvCFrY+JrvTbk6hHB/Zz3VnI0YHmusHmck4+XIYcAnjHuOOqf6/r7i7aXOitj/wAUnZc/8xc/+gJXvHiKWC2+IPh248m3S3tLeee8uJcIkAZcRsWJABLKQM+p9OPB7Y/8UnZc/wDMXP8A6AlepfE9NL8SCMB5reezBRnY4RypOFIzz1bB6jJ4PStKdKdS/IjlxGIo0XF1Xa70OWgn1ifUrKWTTdA+zxzBHuNHEBaPerRgOYmJCZYfeGMgVvVyvhPQo7O4GovPKtzF8qwxy4UZAIZmB+YEEHb0PGSRkV1jxvE5R1KsMcV7mVwlCm3LZ7HyXEVanVrxjDVx0Z1PhuN4dP1OOVGR1KBlbgjnvWTpurW8OkzWMtzfR+ZG427leHOCR8hUkZPcEfh2s6Pd/ZNEvnMixhpI0Ltk46ngDqflxjj9K54ajoPlqy/2jKrcBgoQ4xu3bcH5duD16V5mP/3iV/60Pocl/wByptef5s2vC3+s1Ln/AJcn/mKoaeC2pWqqCWMyAAfUVraB9kW4uUs5pHea2ePypVCsON2QQSG+77H8uMmyUjUrdSPmEyjHvkV3ZY/3czx+Il+/pP8ArdG14qlEWq6bKzSALAjExNtYc/wnsfes7XNSh1KO1kjuLqSSNWRhc7WcDjHzKoznnrnGKl8Q6np8mqpFezzNKiiJY7aPIXHHzOeBk+2OcZ4rLhn0a73BHvrcgDmRFcEEZB/hOD/n28XofVm14mObix5/5df/AGo9XfDn/IE1Hn/lnJ/Jao66Wu5bBotr5tC2UbIwJJDnnHYdOo6duH6XdCz8P3bvKkUcjmIuwzjIBOB3OAfT617VV/8ACel6fmfJYdP+2pPzf5DfDPiC30qKW1uvPME7YcKV2AEYJPG7j2IpnhvATV8HgWcuPpsasNdR0Hyldf7SkVuN+0IQOPmK4OByD17j8N/RXs4xfC2nkYyWcwMcqhWXEbHjBIb9D7cHHk0/jT9D6iv/AAZLyZh05Y5HV2VGZUGWIH3R05oWN3V2VchF3MfQZA/qKbX1177H5fa24U4RuYmlCExoQGbsCen8j+VAjdo2kC5VMbjnpSAFiFXJJ4AHei/YLdxKie4hjLB5o1KLuYM4BC+p9ver1xaJZymG81DTLWdfvQ3F/DG6/VS2RWVd6Za3MzN/wkOgBCMhW1CEkNtK5yJAcYJ6YPuK5p4ukl7sl96PQo5bXk/fhJL0f+RPFcwTkiKeOQhQ2EcHg9D9DU5jcRLKUIjZiqt2JGMj9R+dU7DT7ezcmTxJokmUVT/xM4hkjvzIf8fUmti30qW9geaxubK9SM7W+y3kcuDgnHysecA8e1EMXTkleSv6irZdXg3y05Nd7P8AyKNdZZ340XwZb6l9lgljS7b7SZAM+XtbuenIWuVMbrGshXCMSAfp1rds9bs49CtdLuYGlhN0Wul2ghotp6HIIO7b+tRjoudNKKvr0NMqqRpVpOTUfddm9r9DN0XxqLeaw1O/0mSWLU4hFJh2CQTo+18IwKgMDGRjGN2PXGl4xsbe11xJrdpQtxAJCjSEqpLHoM4HTtViI+AYJlmi0WaNxyNuR+m/FU/FGr22s6jDParIsaQiPDgDkEnsenIriwVCcKqck+u//DnrZri6VXDyUJR1totfXovIXVYE0/4ZwX63E5d52O2WZnjUjzcbVJwOfTFclb6m2nX2n38dtcvHexQzxK5cgSKdsqc9MOjH6Ffw6+fxNplv4Dl069svPkgV2jDnCZOSGJBzwT071zen61pemC0u/wDhGY5mvYY5rchnRYpR8k0ZXofmjLcnOGXqOkVZzpVOXVXcu2t/mbYelSxFD2is7Rjrro0vT79fu3PUfH8qLoEcZYb3nXaM9cA5rzaIXUX2iWzuLm3DRhbhoHK7kz0b05OMjBGeCM1e1jWLnWb5ri4bA6JGDwg9BWfXoYbC8lBU569TxMfmLrYt16LatoujKDRRw654XSNQq/25a8D/AH6+ha+fZ/8AkP8Ahj/sN2v/AKFXvtxcQ2lvJcXMqQwxqWeSRgqqB1JJ6CvHzJJV7Lsj6jIG3g033ZLVLVdKtNZ0+SyvI98T9COqn1B9f/rg5BIrAPxM8FhkB8Q2mWbaPvdffjge54rhPGvj611fUobDRrdNXJX/AEWHymkjc9XlKjBbaFKqPXef7tcB7R1EUl9peqQ6dqNwI9QjGyw1F87LlM8RS88jJAyeQT1yQX7DT9US+WSN42gu4SFnt2OShPQg91PZu/sQQPDtDGq6lZW1ldBIft2rvNbWiYxbqI2icDB4x5pO04P7lu5JrV+JN94o1C4mu9LQReH7ST7NJcmWII7hwrHaxycP8vTjbkHrSA9b1PS7PV4447r7QPLbcrQXEkDAkYPzIwOMHp0qqPCeircW0yWjJ9nWNY40nkWL93/qy0YbaxXsWBIwPQV4F4Z8Ua3Z+JpdWtLWQWcuN0cQCq4UDGVBxlgOvYtkdK9sT4heHCoP2u5HsbC44/8AHKL2A1h4a0hYZohaYSa2+ySASON8WSdp5/2mweoycGlvvD2majLJLcQyiVxGDJFcSRMPLLFMFGBGN7dOueayB8SPCn2jyJNXSCTbvxcQyRcfV1A//UacPiH4cPIvJyPUWM5/9kovpYLnSwQrbwRwoXKRqFBkkZ2IHqzEkn3JzUlYuh+K9G8ReaNLvknaL76FWR199rAHHbOMVtU73A5H4k6lPp/gy7S0Yrd3rJZwkdd0jbT9Pl3c+1cFqvws8X3erJ9k1izg0q3CQW8CXUyMsK8DgJgMeSevJNdf8T7mK1g8NS3DFYI9ct5ZSAThVV2PT6VF/wALj8GHhb64Y9gLWT/CkBxml6R4pt765Fibe20TW7k2scck7TMyru43t84GxJDn36dMU7j4J+Lbq5luJtc09pJGLsRJKOT7ba0dK1zW/DWm6BqviloX0WGNZrIWigyEPCVyckc4kGc+/pW9/wAL08Kf88NT/wC/Sf8AxdAalXwZod14I8LeL5Jp0m1C3zH5sbFlZlhDoFzg9ZcfWue8cadBoEllpGiRcWwjZkVTL5rTSMsg25+bJjjGPoOO3ZWWq2+u+A9Z1S1EiwXmpZUOAGCmSNexI6D1rlPHlo0/ie/tUiMzyQlEi3hd7GeHaoJ4GTIRQLqSaj4q8TwfC/XLrXrU2N7czR2dsxtDAzKw+cYOCflDc/4ceeyaJFpelNealZErJa2622WMZLTB2Ex55ClGXGORjpwa27uxuNH+H39ia1ZvbXEepy3DRZHH+isYzkE/xCt34qQKsvhmxX5Y2aODHGNqImPy8xqBnpXhvwZZaV4WsrWOP7PfrGkjXUYAkSXBPXuBuIweCMg9TUV3478OaXeiy8S3tvbatZNuwqM65KkB1IB25VjweRkjkYJ7KvjbxFevqPiTU7yQktNdSPyfVjQC1Pp1/iJoc9g93bCa7sfuNOE2oexHzYJHbOMZ4rhHj8C3V5NenT9biZ3MbsWdEU8DbzwPugfgKuaZ4Jiu/CUd+LqK3a2tY2ifyFZ4ykK7tr5BAL72I6HcT3pdSsdD+H3gafWbDTpkvdWtUiK7TNDG7LuwyuSAufXJ7etbwrKKS5fU4quFlUk5c78tFp+rWxfk8NWw0qDUfDMs7xxY3RE5ljI+nf8Az9E/tfxZ63f/AH5/+tWJpupX2g39/HZyG3Md1NEIyMqE8wlBg+iFce1av/Cba9/z9p/35X/CvchTqTgnZSXS+68tj5KrWoU6souUoSTs+XZtdd1uTf2x4s9bv/vz/wDWo/tjxZ63f/fn/wCtUP8Awm2vf8/af9+V/wAKP+E217/n7T/vyv8AhVewqf8APuH9fIj63R/5/wBT+v8At4m/tjxZ63f/AH5/+tR/bHiz1u/+/P8A9aof+E217/n7T/vyv+FH/Cba9/z9p/35X/Cj2FT/AJ9w/r5B9bo/8/6n9f8AbwXWu+LoURx9uI3gNstixx9Auah03XfGU0c7StqBxMyp5toYzt47bRkdcH0x3zTp/HeuwIGNyhy6p/ql7sB6e9JB4816ZpgZ1Qxvs5iQ54Bz09/89p9hU5v4cf6t5GqxdH2b/e1PXT/5It/2x4s9bv8A78//AFqP7Y8Wet3/AN+f/rVD/wAJtr3/AD9p/wB+V/wo/wCE217/AJ+0/wC/K/4VXsKn/PuH9fIy+t0f+f8AU/r/ALeJv7Y8Wet3/wB+f/rUf2x4s9bv/vz/APWqH/hNte/5+0/78r/hR/wm2vf8/af9+V/wo9hU/wCfcP6+QfW6P/P+p/X/AG8UdQ8ReN98sNkmomQIBkWnAYkcgsoU4Ge+OxpF1fxreLi5W8NtOxSSCS1B+Qocg/LwM8HOfwq//wAJtr3/AD9p/wB+V/wo/wCE217/AJ+0/wC/K/4Vn9Vq3u4R/r5G6zHDqHKqk/Xr/wClfccNZaT4j8vX9OuluzYva+TZ2Rm3bf8ASY9pEW7I+UN8xA7881VaafRJIrLWLCFRehmSO92hoZDsUOHOW2AqCAxwduD92vQv+E01zOftMef+uKf4VzGv6vrSeHtTurNVfUBq8YklS1SR3ikgL7XyDuAOBz0AA4AwPNxOFnQV5pavoz38DmNPGy5abfurqtfXd/M77T9JuNO+FV/bMgjZoWeME7dq7VAJ9B8ufYV5ObYTWzPdNp21xGsDpIqhURgQoKooOW6kgnsMZJrtvDHjS7HguGzuLWAtNAy/uxsVM5HCjgDGDgYAJIGBwM6UWZsRDDY26zgOPtDB953SBwSVZTkYIHOOeRjIPRTw9Sq+apTunqrPv/SOGrjaGHapUq1nHR3i3tfy7tnAfEJWj1uxR33sunQAt6nB5rkq7b4pzpceLIpo4VhR7KEiNei8HiuJrzavxy9WfQYb+DD0X5BRRRWZudFbH/ik7Ln/AJi5/wDQEr0HxFa3lxrN39kW3JYyxEzKG27pFJIVkYElVZex+b8K8+tj/wAUnZc/8xc/+gJXtcU81oniO7sgv2+F8oxXcyR7z5jAZGcDB7fUdu7Ccvs6nOrqy/M8bM3UVaj7N2d5efQ4u30ySz1NpjGsC+UsZhUk/dVFXqM8BO56senSovPvjLOVaRmVyPKaHCgfNt2tgZyApPXHtXZXF3cah4TW4v5TO63Zjs7mSMRyTRAfMSNx4DcdTyO3QYF818NJP9kvLHdhmMjQY87Z8uPLyQc/fztO7OzHG7Hoxqxp4X2lNOy6I8CrQnWx/sa0ldpatJf0/n216FrSbPUrrR2gu9Ovrm2nzvAheNyASFYHHytg+mOenoT6LaQzSme41K3E6BZElslZiAc8MXXAOFBwBwoAwMisuwbwv5hWe9bUZZEEjT3n7zHbGcYDe3Xj2q3ba1Yx7P7Amuorko0hSGTy0iA/ilRyE25wOQTzxXzUs7hiKyUsPJ+aPrKeS1cLSfssQkt7NJpf19xFo10bZJzGJGmZEIldySgeJS2B2zk+wB4xWek2qtfKtql3JJ9qUFI7diETLcqwXnIAJPY9x0rtPDOq2SX2raX5SNBc6eL6NkUjCCPbhS3UYAIPowB5BA5a8juLnVLiLVtRu7fSwhlt47Rgtu6Kec4zyMr94BuRk16jx6wuG5owb9Nb+p5k8teMxrVSovJPp6f5m5d6G1+Jp7qy1W0mlGXlhhLIWG7D7DjBG5ujY56Dti6hDbQX8LpPcykqjSIIhbqAssEQVQGbgIxXn68nmrC3PhNFikjW1+ZdzSwYPl4A++6H5T7k046yDay3okmmhs40urZLyTzJGVbiIkpyX8tgmPm4ztxgBseXQzKniZuLoSg+/Q9eWX4jDxT+sKS9Ffb9Nyvql3cy31ose+GBV2IkcRdQMj5Sew5Y5yOe/GDJpcWpXzSWNxY313YSQ5kEcDIA+cZRwDhsZyDkYxxxkdP4ru2vora800RRXlxYRS2+4LgZYk43YXdjGCccA9DjHE6fJoxeJ9b1C8vr98xzRahl/JYdQwOdoyMDJP8Ah6eYZpHDU1H2Tkn0V7f0u54uWZTKvVlP2yUk99L+rv67a/obk+g28LyvcTapBHPt8wTWKszENvOHLrwWCk4AztA4HFZ+jXPkWs4RXaZ44czO5basltE7gDtku/4HAxipE1bQrZj/AGY9zBdCTYkdk7Qu+MZI5ClQOcn5cCum8O6lb/Y9Y0doojdnTft0ksYGz/VqiBdvy8RrFnb8u7djjpyZdjqdeopexcbd/wBPQ9HMsHiKdCUXXTv2Wvne3c5unuiw232q6nhtbbOPOnkCKT6DPLH2AJprT29lZ3WoXalra0i810BwXOQqrntliBnsMntWSYoXgi17xGIbm+uI/MhglO2C0hHQbfTkDGCSSB1ya9rNc2jgkoxV5M+TyrKPra9rVdo+W7Laaz4fkbYniKxLHgBo50B/4E0YH61fmuLzw9pU3iAx2EkcUbtbj7arMzZKLIFGQyhsNweQOo7U9X/tTSNEs9S1HSEbTrnerxS6W0f2cK4QeaCx8sMSNp+bI7DpWa66bBo/26zLHw/dOYr62J3/AGVmG3zo85wwz+IIHQ8eK87xEv3dWPLzaX/TyPo6OSYOlUU1F3XdnfeEvG+tah8M9a8Sai0L3FsZVt1WMKo2oCCQDz8zfpXm3/C7fGP/AD2sv/Acf412M8qeCdAh8Kx6daTwXVosl9vlkYSyuoVypDDAO0Yxj8K5T7L4d6/8ItZYP/T1c/8Ax2sXOKdjoqZnhqc3CTd15EP/AAu3xj/z2sv/AAHH+NaOrzaz431bSnkvZ1v7WwhltY7SIZa5lV5gR8wCjYgy2c/KOKp/ZfDv/QrWP/gVc/8Ax2tQavp6xsjeHNNkR4EgKytM42ICExuc4IBIDDn3o9pEj+2ML3f3HTR6NdapcsswSx1R41mksbj5SzEfMYyCQV3BsemOcVg3kN1BcJFjY0cuJlbqAAcj88V0Glm21s6JZNAttcx2Ur6fMk8paJhIQVJZzuXEf8WcY4x2p+LZ/tniWWaykXyRKA57MAuDj8cV9Dl2KnWXI9bf8D8/0Pmszw+HS9vR0u+vmm3p5afeig8bIqM2MONy4IPGcfh0ptRXJdLWZos+YEYrgZOccVn2l1d7JkuRMHWLcreSTyGYdgATgLwPwr03UtLlfqeNGk5xc49PvLl/KINPuJiwXYhIJGQDjjisz7WifY72ysVC39rGU2x4Ecq/JKhOf7yF8dcMvbp6AL22074NwXt3aLJNOrgmZNrK+XwzDjkBQOw/CuQ0/wAQW9m1lfw+H7W7a9t42R2UjyZk+WWM4bBG5C4B5w47fd8mvinKrG11ZtdNfx+4+lwuXKnh5qdndJt6q3Xtqur1+R2Wl6NZadp39s6+CsGMw2+cNJ7nkcf/AKzUreO/BkW0SaRGgIyGktkAI9dx4x+NYd/rS6v4gtLjWhvsA0jPADhSFjd1T6FlAPr0PWr9zDoPxH8GWvizUbRre5sMmcQltxSNixiByMhhjB5xuPOc1hjK04VLVN/V2Xkv8zqyvDU6lFyo6R2vZNvzd/wXY6Q6n4JfRotdu4LC1tredWSSSFQySjlSu0HJ7jH9OOD+LHjWz8Q+H9N07w9efaoL67ZJWQMuSgUhCGA4JkU/hXM/FzRINDl0hPs8cd/dRyXF48ZO1nJHyjnovQHHPU81gaeYYbHS3fHmJF9oi+Y/K/2ggsef7seP88edOXNK/wDwT3qNP2cEnv5K34EWoeGb6K0ur9rCSC3WbClxt8qMRh0DD1ZWX8VPevT/AAfrfiPTNO1KfUNJSKw0zSmawmbT3hLMMBFDMATnJzgn1rR+KcUcPhDWWQbS1xasfwXb/Ja5Dw1Zapo9rrVvqlpParfSWclskrBt8Yu4w2GHB4cc8ZqDTctwSXXhaz82cPFd6Zozy4blorlz1Pvm8/8AHa666sLSH4e+G9Jvkb7GbVrq9RW2llS3eRue3zspzXKfEicre+KxnAMsEf1BS1b+a12njuRbbT4lbPlpod6WC/3c26HH4OaBHEH4HazqAW7l1izjeVQ3l+W2I8j7o9AOmParcXwPubfR723lvNOkuJmRku3V8wKuSwVenPHJ6AdOcjc/4Xz4X/6B+s/9+Yv/AI5Ud58b/D1xZT28FjqqzTRMsbMkQUEg4yRJx/Ogepy2gaB4vvdEt/CyxWmnaXqMZvYbpgDLMq7WDHa5IwWj6gY496TUfhcnhDQr291aW11AS+XHGULI0Q3bnKjoW2K2MnitWz8aal4Mv9Om8aWBSJdPa3sE08I58smMktl8fwL71m/EL4oaX4t8Mx2WlQXsEq3IZ2uPLQbdjqcYcnqw7Y680AWbDWPFmj65oV74jsorSzeZEsmTYAsD7UaLCEkKFZWAboY/rj3cHIrxD4gR32neFobK8uzdC3vt9vIzMzoixSouSxyWyCxOepxxtr25Pu49KAOH+KSINH0e5mRXtrXWLaWcMMqY8spB9jux+Naf/CA+Ev8AoXdN/wC/C1f8UaJH4i8OX+kysEFzEVVzyEccq2O+GAP4V4Vc+G/HBupA9x4likU4kWMNKm7uUcSAFSeR6dO1AHpllHCNB8Gi6RHgtZjYzCQAqNkUkfOf9uNR9a6j7HoH/Pvpn/fEdePW3hzzdMu4tW8M67dak0Q8m9WBwN/cOnmYYEgMScklm6YFc1F8NJJFG+LxLHJ/Eo0PIB9AxmGR70BY7LxF490rw5Jrvho2cpc3qzxPBs8tQRG47+xqt4/tJL/xUYLe6VDewQrDOjZX97dKEYEH0iB49K828S+Frrw/d28Qg1ExzIWVruz8hiQfmAAdsgArznv0rrdIaXVtA0Mxz+Tc21ybfzN/SRZPMhBznC5nbtwIj6UAXvH/AIfk0jwlPah3uJLC4tBNKXZtxaJ97ZJzgt27Z9uJfijcHUdK8P6lBkGOC1mXJ7zK+P8A0SPzFZF5r2pyyXmk+Jbmc294SJrh4ACYxgK5Cnkxuikgc48wZ44x7DT/ABLew3cWl6auqwiEWk0tv++VtpyjjByGAwBwMAdKAPQPA/xktbTR5LLxTPcPdwMxjnVN5lXsp5+9nPPTGPSmeHpLS1XU/wC0Ph5d6oZ7x7iGZNPiuGiRwGETsf4lOcjOeegqh4K+Fl7qOsxX+rWd3p8cRDyRzRBBu9E559egA98c+q+JtZbwhY6XDp9tCYZpzBsbOFURs2Rz1yvU+pqoQc5KK3ZnVqRpQdSWy1ZwSazqNvoj2H9lyR2XmJ5tneMY7grGiqse0jBVgiMzZwQzr9DQ/Gk2o6Re6V410ia9USedE0cTHzCXLhTnAAU4A5HGB0ya3m8f37/esbJsDurH+tN/4Ty9/wCgfYf98H/GvTWWzsrx/Ff5HgPPaXM7TVunuv8AzHaF4Xn8Qz3etauzW6Xb+aViIHOABgnsAoGT1xnjtcPh3wkCR/bUnHpPH/8AE1j6r4w1HVbT7MwigiP3hCCC3scnpXP130sNWa1lyrokePiMfhFL3Kam3q5S0u/Todx/wjvhH/oNSf8Af9P/AImj/hHfCP8A0GpP+/6f/E1w9Fa/Van/AD9f4GH9oUf+geP4ncf8I74R/wCg1J/3/T/4mj/hHfCP/Qak/wC/6f8AxNcPRR9Vqf8AP1/gL+0KP/PiP4nay+GPBs0Zjl1ZpEOCVeWMjjnpt9qVfDfhBc7dYcZ5OJkGf/Hfb9K4mil9Vqb+0f4D/tGla3sI/j/mdx/wjvhH/oNSf9/0/wDiaP8AhHfCP/Qak/7/AKf/ABNcPRT+q1P+fr/AX9oUf+fEfxO4/wCEd8I/9BqT/v8Ap/8AE0f8I74R/wCg1J/3/T/4muHozR9Vqf8AP1/gP+0KP/QPH8TuP+Ed8I/9BqT/AL/p/wDE0f8ACO+Ef+g1J/3/AE/+Jrh6M0fVan/P1/gL+0KP/PiP4mzqHgXw/dX14663AYJ4TGoklUspwuGPyc4IYgVk+JhYWmka0kN7aizTWbZInvJJ8HFoOR5HOfQ9OD3AplY+rX3iK0uIrbSNSit7OdzIYliUZkJAJkLZ3jDADrwoGBgV5uOwk6cLpuWv9fme7k+Y0qtVwcVCy03+f4I7vwVN4btvh/ZX1wkFxeGE5iY8sVYqAAegOOv/AOqn/wDCTab/ANC9afn/APWrl418u2giKwho0w/kR+XGWJJYqvYZJ6YHsOgkikMTlgqt8pGGGRyMZruw+DSpp1Lt+r08jycdmblXao2UbvWyd9d9UcX8VJ0ufFsU0cKwo9lCVjU8KMHgVxFeieOdP0yfUrC5u9XNq0lkgVPszP8AdZlPIPqDx9K5f+y9B/6GP/ySf/Gvn6y5akl5s+2wsuahCXdL8jDorc/szQf+hj/8kn/xo/svQf8AoY//ACSf/GszoJrY/wDFJ2XP/MXP/oCV2XxF1a80tHjspjCby6uI5nTh9i7flB7A7jn16VzT21jH4WthYaj9sEOrIZT5LR7N6fL1PP8Aq2rtPGfhi51/Vba0a6ttPjSa7uZLi8fy0WMNCu7PflgB/nHRSlalOz7HBiIKWJotq9ub8hPAubz4Z3NzcySTTQX7xxM7lti7YjtGTwMuxx6mnajJcW2iT3NlDHNcLnd5kfmCJMZ3bOdw65JBAxyOQRr6JoUXhz4eXVpFq1jqcct60qXFnJvTkRDaT6jaf0/DmPEEWqRyQnTJS/lnLeTLsJ/Hg/ljv+Hfh3KWClFN3v036HiY5U4ZtTlJRtZXvouv9I2dJl2iOO68VXEzyxiWKG1u3tUVe5Co44z9O/HoXV3ZXcURh1Se/e5DRRRPm7MnByvOZFHByVZceorO8GOYdQWzksdNlCB3kt7iIFzxkseCcf3Rx90c9cVdY0nxE+oSNYaPLHcjfDK9umwABvl5GB9QeDkegK/P/wBj4iNT2ksRLo7L1ttsfRf2xQqR5I0VZ3V3tok9X5nS+G9Maz1W923TNBHp9wY7cYKxO6KZBuH3uUAyMD5cgDNcfqF3Z4u9Q1IefbQXLW1nbFj5bMn3pWAI3c9B+HA5HfeGNO1K1gvJbuCZClhKGkdcc7ePx/z9PNNWtLKdtQ0e4vIrO4S8N5aPJnyikqhihPbHHJ716WaR9nSUKbajpe2/9dzyMtqOtUdSv8etvS/T8NTd0nQb7VtEi1e40BNPhln8m2nsbSSKWMGPeJmUcNCRxuzj+YybbT9Rn1OO+trg2UsamOR0Iby5VLq4A9z83/AucnJq94d1vW7bTrTQ7/W1a0ju1khhtbwzXEwC7FhyrlVgxyVbA4/LQsoPskuqQO++T+0ZZGbGPvpG39TXHlkaU8Z7G94tX+7+tf8AhzqzXEVMPhpVKW6t+LsdLrEBt9L0qO3j+0zwaTCsMb5O8hsE4XliBk4HJx36Vzmh3crRQ3F94laBbhiv2OzY2YEncHYVJIx6DNavjr7cdN0r+zyfP/s+PGCM/wAXTJx1x+GawvClvdXfiDy5rdhPc7wGksvtAlOwgby4yvqTlRk4HACjrzLCVa8IxpzcVb5devcxyvG0qEpyqQjJtrr72y3Xbsa99e6c1rN5muXE6ROI3imm+2YYkYXZJvzz6c/THGj4a077LPqc254R/ZFyPsQXakLM4ywB5UsERihPykkcdByF5p+uTXKMdIuvOg8oqUsmh8s7TuwyqDkYUjqAQAeMius8C6frdvo+sT6xbyxMbCVVMi7TyAcfo34Y6dBlgMveFlJVajn27b23N8fmEsRTj7KCgnv3ta+3buzmPFOT4Ku8Zwt5btLjr5f7wH/x4pWL8UPPTU7MgsLWS3G3H3Sys39GFdVdW/23RdWsjn9/ZyEY/vJiVR+JjA/GsLTNYs9Q8LQWevWr3FimIluYwcxsFGM89QDgEcnpjrU59GVLGQrWuu3rpp9xy5BUUsFFL7La/X9Tl9W8c6/rWgWejXt/NJbW2/exmkL3O5ww80liH2kDbxxW74Ut5U8AeIZ7ksLaSJvJDcAsqnkfjtH4e1L/AMIx4RtJjNc6revCmD5LRMpPsx25x+X1FdhC0WpeGLtIrFbfT/IZbeN1wTgEhsZxjOCME9M59PFxuMjOCUU7XWrVuvTzPalIbJCt1c+GI5trltFtiFkPyu4iyqn2LAD8avrENV1SOzsdQurrSoP+Py5u5swyLnBMafdjUc7SoySOPlDEZN7aPe2Hh5o57ePbo1pzNOsfOzHGSM4INPmbWJ7Q2smq6f5THLhbqFS5wBlmBy3QdSegr072b0PC+swo1KsZQvdv/hih4ftorrVljkkiT5GKNMAUU4+8wJwQoyxHfbit10OrT3Jtri9uNGtomEst9MX3ttJDqDwh4BCqB8oOeDgYUej3MUiSR39gjqQVZb6MFSOhB3cVduV1a6tFtZtT07yB/At1Cuec84IzzzzUxdlaxy4PERo0ZQnTu3/Wottf/wBmT+GbzJCxRlmx/d8+TP6Zqxr1lLZa1JbwsEjinJPvGQSP5rWdrEDW1no8TPG5W3YFopA6/wCuc9QcdxW14sSVvEOY3CBfKLj+8vlDj88flXrZNJ+0lHy/VHmYtfutejX4xd/yRQZCixsWU7xkAHJHJHPp0ptFFfTI8V+RuSeLILHwRPp8tkJZIlcxO2CqkkkNj1BNcxYeJYIfsV3DodheG/t0Ik2gNDMmElQ7W6ErvAPQOO3R9/KYLCeUEhlQkEdjjisttRllNndWkMUj3lqgbaVJimT5ZFbDZwdocf8AXQfh4+KpU4VopSavd/1qfTZfiK1TCTk4KXKkk3ZWS+WqW71O98U+G4WtYtX0gC405nEjxByu0Z5XPJAPIzg4NY+ueML2PTdO0LR7VDpX2NLS4ju4JfNTA2k70XZ0AwV3c547DQ8P+Ip9DuCMGW1f/WQk/qPQ/wCfp13/AAnOhY5tbjP/AFxX/GssXhajkk4uVuvl5+Z0ZdmFCMG4zUL6uLXXunfZ9uhwtk+uanNFrWu+HLnxBZwxyW5E0FrK/LKVaOJVUjoQfmbr2wa5bxjbQN4j0K+GizaJZ3E5tjbT2ot9qgpuYKCRg+Z145Br1XU/iNbw3Wi22mW7F73UoLOTz0wFjckErg/e6VN8T/Bs/i/wyI7Er/aNpJ51uGON/GCme2ev1A6da8yrBwlZqx9Dh60atNTjJS81scv4/Wa/8E63KowubQ5Y9liDnHP+1is6Lw3faT4bjjvL17u6/s43zO0zuqIlxbuAu7phU7Yrjrzwb47umk3eHrvbeXPmEbgdr7cN0I2qd3cY4AzxXRaD4k1DSPE6WXjYzLYXlo+nk3CBPspIUlDg/dI28+jKeOayNy38SbbdqXiZQMsYVu1A9E+yof0DH/gJoufiLpni1ktLeCe3uItJu4l89lCvIVRlAIPcxY/GmaJaKYNJS8d3srtJ9Ke6DZEsZd1RlOe/nxn/ALZn048p1PTLnQNcutPuQRLazPCXXIBYdGBPboR7YoCx9Yx6j4eliSRbnTdrqGGXj6H8afLb6bqmm3UVoLSbfG0eYtrYJHqK+YdN0jw5fWvnXOs3VtNyTCkMZCj0y8qk/l/gN+L4fRhQY08XgHnjRcZ/8i0CsevaYlvf3nhe4uoIpkudFdcSoGxIPJbGD3xv/I1lfF3QrJ/BYkt7OCFobgOXiiCkDY4A49SQPriuL/4RK6vtFfS4tH8VzXcBDW1xOPIh8vI3ZR5docAsAFPOB05xVtPBcthcieJPFrunIV9GypI5Gf3vOCAfwoGLqut6Rr+lWWj6TPd3mo3N+ktxJJEYwC6GI4yx6u6nA4zk8Zr6LX7teP8Ag3wVaTa5a6jBoWpabDDL9ouP7RUKxlA+SKIdSgY7ixHO1e449hHAoAMZpNopaKYCbR6UbR6UtFAGRreiJq0MOLia2uIH3QzwuyMPVTtYEqw4IyOxyCAR57r3gXV0Fze2gtwkzBrqJZ555HwcBwXJO5VZhx1BIAzivWaKQHkWsaBa+Iks9WV7drZCGvfODlraRkAZjscZicAEkZH8XRmI7jwN4QtfBnh1NPglE8sjmWa4C48xj0xyeAMAfn3qDWtGutMvG1vRF/ecm4tQCVkGckgDrnkkDnPzLzkOmj6xb2tmLq1YnRif3kRILWDHnt1i5zxwoII+Q/KAdbXA/FD/AI99D/6/W/8ARMld6CGAIIIPII71wXxQ/wCPfQ/+v1v/AETJXRhf48PVHHmP+6Vf8L/I4mSRpX3sFBwBhVAHAx2+lNHBB9KimuEgIDZZ2+6ijJPIH4DJHJ4qxc213YXjWd/bG2uVUPsLBgVPcEHB6f54r6n2tNS9nfXsfnf1etKm6/K+XuJJI0srSMFBY5wqhQPoB0poJVgwxkHIzRRWllaxjdt3HO5kkZyACxyQowPy7URuY5EkUKSpyAwyPxB4I9qbRRZWsF3e4dyadHI0UgdQpI/vKCPyNNoostgTadwp8chiYsoUkqV+YZ6jH5+/b+TKKLJ6Am1qgpySNHvwFO5dp3KDj6elNooaTBNrVBTlkZEdQFw4AOVBI57HtTaKGkwTa2CnCQrE0YC4YgklRnj0Pb/Ppw2ihpME2grnr7T9Ru7yRgpCKSY380g9VI4yRgbc9FOercDHQ0VjXoRrx5ZPTyOrCYyeEm5wSbatqRwiQQRiYgyhRvI6E45qTOKKfFK0LlkxnBXkZ4Iwf8/5Guy0OW6buznfHln9p8K2t6B81ldGNuP4JVyPwBj/APHq81r3+w0SLxD4Y1/TZpjCjwLJ5gXdtKNuBxkentXAf8K5sP8AoYJf/AD/AO2V87jMPOeIl7ON/wDhj7rK8fRpYKmq00nrv5M8/or2Wf4AXUMe5dfWU5xtW1AP6yAVB/wofUP+gjL/AOA0f/x6uBRbPalUjF2d/uZwfhI/aLi+0wn/AI+rcvHz0kiIlH4lUdf+BV7X8VNMtr1NLu59Nm1A26ODGrkJGjYJdwrB2A2gYBUDOWYcVzmk/BnUdH1my1EahIxtp0k2fZ4xvwclf9d3HH416Bql9ea1pWrafZ2rwahEFj8l2HmSQ5+bbngErn25HNXGlJpvt5mFTFQi0ur8mcDoNxHb+FbzT10cWMDTLNFLGX8uWQ7Q6gSOx4CDkEjnnaeKZ39K6VrWfTvBE1tqEcsKtd7tPhuNvnInBbdtJA53d+M1x1yLguBDHIX3LtfzAEVcNuDDqSTt7Hp2r2sBL2WHuot69D5POIfWMdZyUVy9fn+e68jo9AnXTvEUM4SS6SLdn7OhYsCpGQDj1ru/+Esi/wCgTq3/AIDD/wCKrxfUJ/Ftrp5fR9kilwJ4oYFmcj+ElWU/KMHkdCR6ip/Dut6/Hbv/AG5aSrJ9utCofSR80G8+cBtj64K++AcVw42vCVX34O67ux62VYOpTw96VVWbb0V123foeoap40sXsbq0NrexTSRMgEkargkEc/NXm17p1zb3lrrjaZLd20cRt54hGTujJyGUdGIJOQe2PQkTyQ+IEvVW/mgExuCd1xKXX+H5h97EZPQDAGDhV6DqdMi8WR+JnbWXlbTwD9ol80G0eHYeFXjBzt5AHfPtFaNKeG9lyNKXn+Q4Rq/WnUnVT5NLJdHrr2/r0PNbDxBpqX9tc2SXMl2ZGE0SRkvL8vVADwmRgKenXAxXZ+H7CzltbmbVodSlvp7hriVbJUZIlIUKm49cBevHfr1qnLPI7MvmyFMnAZs8V0N6msyaVpR0IXklqICGSxlEbC455k5Hyg4z/UcUU8qhl79sm3LZeRyrMf7RboqPKut9b6/LTz9Ch4h1Kyv7i2a13wQQWxjVZyASIwWY9TwF5JOMceorK8N+MdBsNZhvG1BJUQMGVAVbkY4DYz17VQ1TSNdv/E+vWeqarp0U9zpbJFcmTZAuyWF5VJVRzsDZ4+vA4y/COiaNonimzu7jxlor7VcYjaTALIyg7ioUYJzkkdKqePqKLppe7bZ/5nbSyajKSryk3NO91a2nlqeuN8VvDKLu89yO21o2/LD1Bd/Ezw5qWiXf2eeYRSg2omlTy0EjqcLliM+px0HJwOa4XTLHQxFpMSeLdHLR6Xe2SfO42yyGQ7+QNow4HzYzg4zXH+KNJh03wtoUVnqFpqNvHcXAmns2LKJW2EBsgEEqox/u/lxc6TTS/M9X2LlFxlJu/p/keiafDcxXcdyLWWSOCQGQBCRgHkGsjwvGvh3U9R8N3uFn8wy2rs3y3MJ+6V5weOfXn2419LtvHaaXoyRtcMghURG0lCrCwI4mHGcDgg57855FrxbDo+salcWOpQGWCJgYbm1bbJA+Bu2HoVJz8p478V0ZhQlmtNwSs1/X9fM8LCxo5UnGpO8ZNa9nr+H/AAO5ztzcXjR280q3s86iQs39l5aMhAdqEr2f7pPB5yWwM6HiPVmtdBW0XMuqX8YhhgQEMzuME7eo6nr9Kpr4euo1EUPxBnW3PB820kMij25PP4j/AAsafY6ZoDPcWEl1e6rIpWTUrw/OoIwfLXJ25Hcknr0rxqHD2IqVIqasl5W/Rfqd1fNMJShz86fktWxfEumrp2ieHYRIJHt7Q2kjqcjfGRuwfTLHFc1XYzlJPCZla3juDYXYdo5SwXZIu3+Eg/eUdDT7bQhc6da332HQYorpise+W7zuCM5HDEcKjH04x1rsxdD2VeVNdDwXCeNn7WG8le2vo/xOLorpNVhh0kQM+k6RPHMAVeGS6wPlVsHdID911P4/lf8A7FjFpBcPZ6AizoHQGW8JwYnlxwx/gjc/8BxXPyu9iI4OpKbgt16/5HPzHzPDtg/eK5ljPPQEIw/XdXpninUL3SPDEuoWEhjeGZWcKM71MO3H5lT+Fcfq+nPZ6ZPZNbWMRURXqPZvKwZc7SD5jE5w6ntx+nVaxrVrH5mmTveQlXjk323lncPLX5WDgqR7Edh6V2YSlKc2kr+XzO+hOOG5vaS5dlfzs1+hy2kfEfWIZNPL+XdpeQJ9oWRgzwTRjY+ArfKrBVfpjLn0rb8eMJNXtZMY3WqnHp8zU671vQLiSGS3s5rF42yWt7W3JcehLo2B9MGsjxZqi+INSgubaS4tkijCFcId3JPOQeOe2P8AD2MHh506ibg+uuhjmmNpV6Mkqi1tpr0vd7G1eX66P8KVuI7aOSSYumWTdhsvhsdyNoxXFWXii4ie0kg0zTruW+t4/M3xozwTJ8ki8NwrbQ4yMZkrup7WWf4XwSJezwLEWLRxrGVl/fdG3KSMf7JWuU0m3MniPS3WeSLbdRbgiqd43jg5BOPpj/AVB1HOabXLJ/P8RyxaoRpUnFPmhGzfT8NdTd8WeGv7GnFzbZNnK2ACeY2649x6VziOqq4MasWGAST8vPUc+2Of/wBXpnj3/kXB/wBd0/ka8wzXbgKsqtFOe55Wc4eGGxbjTVk1f7ypP/yH/DH/AGG7X/0KvoKvn2f/AJD/AIY/7Ddr/wChV9BV5GZ/7w/RH03D/wDuS9WFcV488Cf8JdbMsEsUMsihZDIDjKklHGP4hlh7hz6AjtaK889s4uw8AxL4bOk6hKu1Y0it/suVEAQH5hnq7FnLHHO7HQU6TwZIGmkfU76/89NlxBPdtbpLwFDEwheQowSQ2QAOMZHZUUAeTaT8GrOz8Wvq07xrp6MHhsY3aTB9C7YyM+xyODXq4XjmnUUAJtFJtHvTqKAECgUtFFABRRRQAUUUUAFFFFABXKat4f1C01A6r4aMCXUnE1vOSInyck8e5JxxycgjLBurooA8v/4RrxkCfLtrKFM8RwavfRog9FRZgqj2AAFYXibTdd02OyOr2FtcrLMUhB1e+k2PsYk8zccBhmvba4H4of8AHvof/X63/omStaEearGL6tHNjKjp4ec1uk/yOEN3YrbWqx+C7ObVIyTGZrx2jmcDI+8xLNwSA57EA5IFWdY0++s9XtLnU7lpLzUIpb2SNwFaEsIV8ogf3AgGeM/hVeSNZEMcqBlYcqwyCKjgtLa0BFvbxQg9RGgXP5V7kMuUKyqRlou58jVzyVbCyoVIe89Lrb7ib6dRTpJHlleSRtzuSzH1JpvIOCMGivT03PAu9hUdo3V0OGU5B9DSElmLE5JOSaKBycDrRpuF3sOjkeKRZI2KuhypHY033NFFGm4Xew6OR4m3RsVbBGR6EYNNooHJwOTRpuF3sOSR4iSjFSVKnHoabRR/Tr7UabhdvQcsjorqrEB12sPUZB/mBTaKOT0B4o0QXbHLI6xvGGIR8bh64ptFHbODgd6NEF2xwkcRNEGPlsQxX3H/AOs02iijRBdsKKKOcZwcUCOq8In/AEDXP+vNv5GuVrr/AANAblNVtw2DLb7M+mciuVubeazuXt50aOWM4ZT1FclGS9vUXXT8j0cTCX1OjK2nvfmej+LtF1DU5LeWzQXEaIymAybMMejjkA//AFqr27+Nbe3jh+y28mxdu53Uscep3c03RPHNp9hSHUt8c0a7fMC5Dgd/XNaf/Ca6H/z8v/37NeS44iC9k6d0vJs+mU8DWm8RGu4OW65kvzX9dDn9R0jxVrF0j3trGVC7FUTALHn+LAbrWT8QdMvINQ0m4SRGnS0ELXIlZJcrnOCAeu7HX867b/hNdD/5+X/79ms/V9a8La1Ckd3NL8hyjohDL69qcXVlOHtKbUY32XdWM6sMLClUdGunOVtZSXR+Vv68jybS7G8tTH9oliMaRGNIk/g+csMHgdznCjmtSus+y+C/+f29/wA/8Bo+y+C/+fy9/wA/8Br1IYiMI8qhL7meDWwlStPnlUhf/Eji75ZHtHWIOXyvCNtYjIzg5GOM9xWfFBetcbmW6jAWPBMwKkBskEbjzjHIHODyc16J9l8F/wDP7e/5/wCA0fZfBf8Az+Xv+f8AgNTKtGUubll93r/mVTw06ceVTh/4EcnUhuJjCITNIYhyELHH5V1H2XwX/wA/t7/n/gNH2XwX/wA/l7/n/gNaPFJ/Yl9xisBJbVYf+BI5OpIriaAN5U0ke7g7GIzXUfZfBf8Az+3v+f8AgNH2XwX/AM/l7/n/AIDQ8UnvCX3AsBJO6qw/8CRyZOVKnkHnnscEZ9jgkZ9CRVG8WSysmbS4VgmLoP8ARo1Q43AE9MdM8kV3X2XwX/z+3v8An/gNH2XwX/z+Xv8An/gNZzq05Xbpu/fl1N6VCtTslWjZO9ufT7jz2S81NhbLIzyJLJH5oETbcEDOQQT1yecYx7YOlFBBBjybeCLBVvkiVcsv3WOByRk4PUdsV2H2XwX/AM/t7/n/AIDR9l8F/wDP5e/5/wCA1KnT1vTb/wC3S5U6z+CrGPpM5dLiaNGRJpFRvvKrEA1HXWfZfBf/AD+3v+f+A0fZfBf/AD+Xv+f+A1t9aivsS+45XgJPerD/AMCRydFdZ9l8F/8AP7e/5/4DR9l8F/8AP5e/5/4DR9bX8kvuF/Zz/wCfkP8AwJGPocYu5LvTW5F7bPEoJ4DgblP5rXH+L9T1ew8E2OmulzZiC+LxyZZCwZG4HQ8Zb/vr2r0gW3gxSCL2+BHf/K15/wDFldFXTNN/su6upn85t4mPAG36CvIx9NVJ+2Sasu36nuZRF0qsIOcXvtJbPpb11HaXPqGseDrMNp97cTllJus7lKoDGAqhePlVQSSclKb4gur46bpGm3VtdWywh8lmKiXGdpxgY2iRl6ng9q3/AIfr4cPgjTTf3t7Hc4k3pGx2j942McemKzvHi6Ot3pX9lXNzMcTeZ5x6fcxjge9edXwrhRdVN7dtPvPaySKlnkFJxd5NWun36WJ9Dv73UdI0prixvZw0JSa75kDK0Sx8ALngIp6k5UmtbxOCviCcEYISIEen7tar+B18NHwZphvb69S58s71jY7Qdx6cVvG28GMctfXxPqT/APY16mApewl7Wzd1/KfP5jB1nOnzxXvX1kul1axyVS21tNeXMdvbxmSVzhVHeukMHgwHH2jUDjvx/hWlpes+FdDDyWiXLykYLsuWI9ByAK9KeKko+5Bt+h5lLL4Oa9rVio9bO7+Rc1mzXR/h6bGSRfMAVev3nLhiB+v4CuH0T/kP6d/19Rf+hCpdc1261y8Msx2RLxFEDwg/qff/ACNXwpoe+RdavmEFjat5is3G9h0x7A/rx9M6cXh8PJ1XrK7+b6HTWqLG4yEcOvdgkvkur7I6Xx8QPDg56zp/I15mrlFddqneuMkZI5B49OlbvifxG+uXISPKWcR/dqerH+8f88Vz+R61eBoSpUVGe+5hm+LhiMU50tkrFSf/AJD/AIY/7Ddr/wChV9BV8+z/APIf8Mf9hu1/9Cr6CryMz/3h+iPp+H/9yXqwooorzz2wooooAKKKKACiiigAooooAReRS0i/dpaACiiigAooooAKKKKACuB+KH/Hvof/AF+t/wCiZK76sfxH4bsvE+nLZ3rTR7HEkc0DBZI26ZBII5BI5B61pSnyVIzfRmGJpOtRnSTtdNfeeRvI8rbpHZ2wBljk4AwP0FN/HBrs/wDhT+k/9BzXf+/8X/xuj/hT+k/9BzXf+/8AF/8AG69j+14L7B8u+Gaj19ovuOOkkeWRpJHZ3Y5LMck00EqQykgg5BHauz/4U/pP/Qc13/v/ABf/ABuj/hT+k/8AQc13/v8Axf8Axuj+1obcgf6tVb39ovuONZ2d2d2ZmY5LMckmhHeKRZI3ZHU5VlOCD612X/Cn9J/6Dmu/9/4v/jdH/Cn9J/6Dmu/9/wCL/wCN0f2tDbkD/Vqre/tF9xxnfNOjkkhcPE7I46Mpwa7H/hT+k/8AQc13/v8Axf8Axuj/AIU/pP8A0HNd/wC/8X/xuj+14fyAuGaqd1UX3HGUqO8ZJR2QkFSVOOCMEflXZf8ACn9J/wCg5rv/AH/i/wDjdH/Cn9J/6Dmu/wDf+L/43R/a8NuQFwzUWqqL7jjKckjxhgjsocbWAOMj0Ndj/wAKf0n/AKDmu/8Af+L/AON0f8Kf0n/oOa7/AN/4v/jdDzaD+wC4ZqraovuOMpyyOiuquyq4wwBwGHXmux/4U/pP/Qc13/v/ABf/ABuj/hT+k/8AQc13/v8Axf8Axuh5vB/YBcM1FtUX3HGU4SOsbRh2CMQWXPBI6fzNdj/wp/Sf+g5rv/f+L/43R/wp/Sf+g5rv/f8Ai/8AjdDzeD+wC4ZqLaovuOMp3mP5fl728vO7bk4z64rsf+FP6T/0HNd/7/xf/G6P+FP6T/0HNd/7/wAX/wAbo/teH8gLhmov+Xi+44ylLuY1jLsUUkhc8AnGT+g/Kuy/4U/pP/Qc13/v/F/8bo/4U/pP/Qc13/v/ABf/ABuj+14fyB/qzU/5+L7h/wAOv+Pu+/3F/nXReJPDcOuW+9MR3iD93J2Psfb+Vc/B8KNPtiTB4i8Qxk8EpcRDP/kOpv8AhWcH/Q0+Jf8AwLj/APjdedWxUpV/bQ0Pdw2XRp4T6rV95a/mczJ4W1uNyp06Ukd1wR+YNM/4RnW/+gbP+VdT/wAKzg/6GnxL/wCBcf8A8bo/4VnB/wBDT4l/8C4//jddX9rVf5Uec+GsP/O/w/yOW/4RnW/+gbP+VH/CM63/ANA2f8q6n/hWcH/Q0+Jf/AuP/wCN0f8ACs4P+hp8S/8AgXH/APG6P7Wq/wAqD/VrD/zv8P8AI5b/AIRnW/8AoGz/AJUf8Izrf/QNn/Kup/4VnB/0NPiX/wAC4/8A43R/wrOD/oafEv8A4Fx//G6P7Wq/yoP9WsP/ADv8P8jlv+EZ1v8A6Bs/5Uf8Izrf/QNn/Kup/wCFZwf9DT4l/wDAuP8A+N0f8Kzg/wChp8S/+Bcf/wAbo/tar/Kg/wBWsP8Azv8AD/I5b/hGdb/6Bs/5Uf8ACM63/wBA2f8AKup/4VnB/wBDT4l/8C4//jdH/Cs4P+hp8S/+Bcf/AMbo/tar/Kg/1aw/87/D/I5b/hGdb/6Bs/5Uf8Izrf8A0DZ/yrqf+FZwf9DT4l/8C4//AI3R/wAKzg/6GnxL/wCBcf8A8bo/tar/ACoP9WsP/O/w/wAjlv8AhGdb/wCgbP8AlR/wjOt/9A2f8q6n/hWcH/Q0+Jf/AALj/wDjdH/Cs4P+hp8S/wDgXH/8bo/tar/Kg/1aw/8AO/w/yOW/4RnW/wDoGz/lR/wjOt/9A2f8q6n/AIVnB/0NPiX/AMC4/wD43R/wrOD/AKGnxL/4Fx//ABuj+1qv8qD/AFaw/wDO/wAP8jlv+EZ1v/oGz/lR/wAIzrf/AEDZ/wAq6n/hWcH/AENPiX/wLj/+N0f8Kzg/6GnxL/4Fx/8Axuj+1qv8qD/VrD/zv8P8jlv+EZ1v/oGz/lR/wjOt/wDQNn/Kup/4VnB/0NPiX/wLj/8AjdH/AArOD/oafEv/AIFx/wDxuj+1qv8AKg/1aw/87/D/ACOW/wCEZ1v/AKBs/wCVcP8AErSb/TtPsHu7Z4VeVgpbHJx9a9h/4VnB/wBDT4l/8C4//jdcT8b7EaZ4R8P2QnnuBDO6iadgzt8vViMZP4VlWzKpVg4NLU6MJkVHDVo1Yyba9P8AIzvBWg6pd+ELC4t7KWSJ9+1lxzh2Hr7VV8W6Xfadd6aby2eEOsu3djnGzNd94A0Vde+D+iWb3t7ZANK/m2cgR+JZOMkHjn09KyPinYjTLbwzZCee4EK3CiWdwzt/q+WIxk/hXPicdOeFdFpWtb7j1clyilTzinilJ35m7dNb/wCZjeEdB1W68KafPBZSyROh2suOfmPvW1/wjOt/9A2f8q3vBeirr3wl0K0e9vbIBS/m2cgR+HfjJB459Kt/8Kzg/wChp8S/+Bcf/wAbrrhmlSEVFJaHjVeHqFWpKo5PVt9OvyOUPh3WQcf2ZdfhGaT/AIR/WP8AoGXX/fs11n/Cs4P+hp8S/wDgXH/8bo/4VnB/0NPiX/wLj/8AjdX/AGvU/lRj/qzQ/nf4FDQPBVzcTrcarGYLZfm8snDP7H+6P1/mM/xH4jfVpBbWw8nT4eI41GN2OhI/kO1b/wDwrOA/8zT4l/8AAuP/AON1R/4U1o3/AEG9e/8AAiL/AON1EMwvU9pVV7beRtVyRxoeww0uVP4m932+XkcfTkleNZFUjEi7Tkdsg/h0Fdd/wprRv+g3r3/gRF/8bo/4U1o3/Qb17/wIi/8AjddTzaD+yzzlw1VW1Rfczg5/+Q/4Y/7Ddr/6FX0FXn9l8ItFstSs74aprEz2k6XEaTTRsu5GDDP7sHt2I4r0CvLxddV6nOlY+hy3BywlBUpO+rCiiiuY7wooooAKKKKACiiigAooooARfu0tFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV47+0F/yAtG/wCvl/8A0GvYq8d/aC/5AWjf9fL/APoNA0dZ8Iv+SXaL9Jv/AEc9c98Zv+PjQP8At4/9p10Pwi/5Jdov0m/9HPXPfGb/AI+NA/7eP/adZV/4bO/Kf99pep1Hwt/5Jpof/XFv/Q2rr65D4W/8k00P/ri3/obV19annhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRVOe+8nU7Sy8vP2hZG37sbduO3fOaG7AXKKx9J1qbULzU7ae0jgeykC/u5xLkEEgNgDa2ACV5wGHNZs/jMQ23h6Y29tENXRXJuLkosWdnAIRtx+fAztBx1FH9feCVzqqKz/7Qd9dfT4olZIbYTTOW5BZiEUD32uTzxgevGXb+LUi03U7zWbX7B/Z0yxTLHJ54yyoyjIA+b94oI6A9yOaB2OkorDHi3SzexWZN1HPIqMBLaSoqFgSquxXCk7Twear2njbS7mzWYi4aQRQu6wW0si7pFVlRW2DcSGBxjOOSBQI6Sisey8T6ZqOpLYWjzyTGFZji3cKitnG4kfKeDwccjHXirOkag+oWsrTRCKeCZ4JUVsgMpxkH0IwfxoAv0UUUAFFFFABRVO+vvsT2a+Xv+0XAh+9jbkE59+lVYNcS48TXOjJAcW9uJWn3cFieUx7Aqc+9JO+n9bXB6b/10NaiucuvElzb+FZNdjs7eSIFnQSXXlp5IJ2uW2nkgAgAHlgPU1dn8Q2Ntf2VjMJxd3cRmWJIWfYgwCWIHABIGaLg1Y1qK5uDxvpF3FBLayOUkdQfOhkibY0burqCvzAiNsHgHB54wZU8ZaMywMXukSZBIGks5VCKSQpfK/LuKnbnGe3UU3pe/QDforBfxPBN4ZOvWMTyWiYkczI0RMOQWdcjnCncOxxjI7bw5GadmtwuFFFFIAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACvHf2gv+QFo3/Xy//oNexV47+0F/yAtG/wCvl/8A0GgaOs+EX/JLtF+k3/o56574zf8AHxoH/bx/7TrofhF/yS7RfpN/6OesL4zQuV0K4wdiyTRk+7KpH6Iayrfw2d+VO2NpeqOk+Fv/ACTTQ/8Ari3/AKG1dfXGfCmZZfhtpKgjdCJInXOdrLIwwf0P412danA007MKKKKBBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFZ2paSdQuLW4jv7qzmti217cRncGxkEOjDHA6YPvWjRQBg2/hLT0vri8vWk1KeV0ZGvVjfydhcpswowRvbBOT71Ang8Jpdvpp1zVXtIAIxGxhAaIY/dnEYyPlHP3uvzc1p6jr+maVMIr668lyu8Aox49cgexqovjLQHUMuoAqRkERPgj8qLh5Fv8As6VPEEuoRSgRXFqsEyfxBkYlGX/vtwc/7NUrLwrHZeHbjRl1O9minLEzTpA8nzHLZzHtfdzkuGJyeawfFnxMtND043Om2z34UgSy7WCRZ6A8de+OOMc8gHIl+Nltb6RYajLoF95FwxSSQMNikddhI+b8dvORzg4B31udHpfgRNO1EkahdmwijhWK33JiQpvwXGwYwW4CkDgcYAqx/wAIFpX9hy6SZbhoXMDbpBHIQYkRFO1kKnhBkFSOT7Y29G1ey17SLbVNPl8y1uF3I2MH0IPoQQQfcVeo8hLQ5y08GWNnqemXsdzPnTojFBEIoUXBBByUjDYO4naCFzg44rS0bT5bC1l+0SLJc3E8k8pT7oLHgD2AwM98ZrRoo/r9QsFFFFABRRRQBQ1XTBqkESC7uLSSGUSxzW+wsrAEdHVl7nqKgs/DtjZau2qR+a128JhkdmGJMkEsQABuJHbA9ql1HXdN0qVY7258pmXcAUY8fgKpp4z8PyIrpqKsrDIYROQR69KSSWv9dgeu4xPDkz+HRo0moTW8cTssUtptDGHkKjB1ZT8pweD0B4PQ1Pwna6kNMDXM8aabtMEaLHyVxjLFC46AHawyMg1ieK/iXZ6HpbXWm20l/tKiWQIwSHJ43cdTg8ce5GRnnbz42PDodlqSaBMqTMVd5GPllh2U4/U9CCAGwTRYDrNG8BxWuj2MGo311cXcEUSM4ZMLsjdAi4QZQea5Gfm6ZPardx4G0u41Ox1AvILizhjhRjFC5IjyUOXQlSCSflK575xXK3fxq0+wurAXeiahDZ3cQkFw2BgHuq/xL75BxzivS7a5hvLWG6tpFlgmQSRyKchlIyCPwqm7tvuD8znI/B0dl4dvtHs7p2S/m33EkyIuFbaJAqxqqglQegHJJOa6gDAwKKKVwCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACvHv2glP9g6O2OBdOCf+A17DXB/F3w7N4g8CTi1RnubKQXSIoyXCghh/wB8kn8BQBL8ISD8LtGx2Ew/8jPW34s8OReKNAl0938uUES28uM+XIvQ/Tkg+xNeW/BHxtZwWT+GNRuEhlEpeyaRsB93WMe+eR67j6V7dQ1fRlRk4yUo7o+etJ8Q658O9auLOWFYmkIaexuWwknYSRsPUDG4ZBxyMjjqx8apMc+HY8+2oD/43Xp+o6Vp+r2/kajZW93EDkJPGHAPqM9DWCfhv4NJJ/4R6z59FP8AjWKpyjpGWh6E8ZQrPnrUrye7TtfztZ6nHf8AC63/AOhdT/wYD/43R/wut/8AoXU/8GA/+N12H/CtvBv/AEL9n+R/xo/4Vt4N/wChfs/yP+NPlqfzfgR7bB/8+n/4F/wDj/8Ahdb/APQup/4MB/8AG6P+F1v/ANC6n/gwH/xuuw/4Vt4N/wChfs/yP+NH/CtvBv8A0L9n+R/xo5an834B7bB/8+n/AOBf8A45vjayIWPh1cAZONQH/wARXY2HjX7WbZJNGuYpJtobF7Zsqk/9tgxA/wB3Ptnij/hW3g3/AKF+z/I/41tW2haTaRwxwabaIsICx4iXKgdOcZ7dauKkt3c5686MmvZR5fnf9EcjoXxOg1vx1c+HE0i9iRGKxXDLj7qlmMin7gOPl65yM4zx31VYtNsYNQuL+K0hS8uQomnVAHkCjAye+BXBa9qAsbK/trnX7uC7bVDDZTSXYhVWMKNlyNo2JuZtvAPAwScVaV3b+t0v1MH/AF93/APR6K4/xBcXcHiK1sIrydBqywpEEcjYYpN0pX0LRsenPy12FLpcOtgooooAKKKKACiiigAooooAKKKKACiiigAoori/iVZzX2h2sUNvLMBO5YR2z3G0+TIFJRBnO4rhuittbnGCDSu7HaUVx/iBdfkurRNOvNQtIlhh3/Z4Y5Ms0yI24sjchCx4x0yeBWYI/FlzcxxnVdXgjWXyCyWsXzoElPmEtEeSUjGRgfNwORRfS/r+Alq7f1tc3fiAuqS+B9Ug0e3M13NEY8b1Xah++csR/Dn35qj4DutQ0r4ZWs+vQGA2NszgmRW3wKu5G4JA+XAweeK6B5J5fCrS3Klbh7ItKCu0hinPHbmuc16ZofhJDsGWltbSDA7iRo0I/JjTas7Ci7pM4a/13+1fhzPCuyOe9kme8mkO4EiRVLDBHBkdFGei/wC7imaxq2n3/hjw/oVtpqtbGCK4kWWTmJdjlFABG+Rtr4B4zjPXjnEtW0/4cysgaR7kQqw9AYp5mP0wY/8AvkdO09t4TZL651NrtlbRUtZo48Da6xsUlBOeP9UxH1pDPTPhnYHw9PquhLKJbRvK1C0kUEBkkBU9ScY2DgnvnvXodcB4PkZbzw4XPzTaI0T/AO/GYf8AF/yrv6ACiiigAoorkviFayXmgQxJbNOv2kGQfZXuVA2PgtEnLjOMehIb+Gk3ZDirs62iuJ1SPxCyaZHY3epWapa24lEMSSku0qI+5nRslULHt0yeBVVYvFV3fJC2qatbQxiKIvHbRfvMvMrOS0ZG7akZ4wBuzjkU3or+dvxsSndX/ro/1Oi8arqkng7U4dFtzPfzQmKNQ6pgNwxyxAGFJPXqKxPhpNqGnfDO1k1yEwJawtJE5kV99vt3q3BOODjBwflrp9Llup/DVpNfKy3j2iNOGTaQ5Qbsjsc54rmLqQx/Bi1UZPm6XbQEDuJFRCP/AB6m1Z2GcbceJ1v/AALqAaFVu76ecXLTMSvVVY8EHAZ44xz0APbFZfivXNNl8HeH9Lit1jsVghupYmkHmbQrFVUg9SFbJxwWX14wYLZ7L4fSyfPI9yEZgSON6XEjHPpiKE/h+V/WdHZNH0nSIly95eG2eXAyPLNvCvfpu8zjPBY0gOj8XXmneIdcstFltIVsrNcPOzEmN2EYKqgYZCh0JPYZxgrXc/DeCfTNAudCuW3PpV28CN/ejYCRT9PnI9sY7V48fDskNpqHihbtjMszp5JGAY54A0ZBB/vSqPw9q9r0CQHxRq6qflmtbS4X3z5qn9EWgDqKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDxzx58FhqV1Nqnhl44J5CXkspDtRm6kof4ST2PHPUdK4tLD4t6GBbRLrwRBsVY5DOigemCwA+lfS9FA7nzV9u+L/wDc8Q/+A7f4Ufbvi/8A3PEP/gO3+FfStFAHzV9u+L/9zxD/AOA7f4Ufbvi//c8Q/wDgO3+FfStFAHzV9u+L/wDc8Q/+A7f4Ufbvi/8A3PEP/gO3+FfStFAHzWL74v5GU8Q4/wCvdv8ACvWtHXxey2Dzyaj9nIjLidrYPt4zuGzdnHXnNd1RQI5TS5fHra+q6rBoK6Pvfc1sZfO24OzGTjOdueOma6uiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDnPHmq3mi+DNRv7K1S5eKPDoxI+Q8MePQHP4VzGlareax8JdO1G8tUtxDc2hQIxOYoriMFjnpwrV2WtaLc6xFLbjVp7a0mhMMsCQxsHByDyyk8g461l/8ACG3I0L+xR4gu/sAt/s6xfZ4eEC4HIXP45z70AczPLZQ+Mk0yVY13ahG6wMAFeFrKSP5R3AZQpHbIrPaaKZPF9tkhreyvo5y3GN8kki/hteubMOu6h4gaxuLmaXWor1fsrlx8xQncmeoCfOQ4BBBbODwNrw1YavfNq2m30F2dR1BktbyeW3I8yIHBkLfwYjLLtP3js2nrQB1HhlmN74eDAhkkv4iD/suwx/47Xolef+Hfm1rSP+umqSf+R/8A7KvQKACiiigAooooAKKKKAMPxhql5onhPUNSsbZLma2j3+U5IBXI3Hj0XJ/CuL0HVLzV/gvDdXdqkCWxgSLYxO+KF4wXPoco35V3esaTdaojRR6rNa28kZjkhSGNw4Oc53KT0OKyIvBk8OhDRE1+6GnCD7P5Bt4cGMjBGduenfOfegDmrw2dt41g0+VY1El1DIkLAbWia1niwB3AZQCP9oU7Rbi1k8WCyco08EmoiSN8blJuIpY2wexViQf9k+nHEzw6/d69JY3dzLPrNveRiyfeAN4dQ6DvgDLhuQFznBJw+z0/xRe35aN70a7aNMZZCoDMpTHmY6qcKi7SPm2rtPWgDW05o9R8FTxREnbNpdqwIwfNQwxsMfgK7XwfMZ9UtJs/6zQrZz/30T/WuT8J2t5d6R9mltriB1ujf6g0kRULIi53b+AS7rGduAy4bPGMdV4KXGoW6/8APPQbIY9MmT/4n9KAO5ooooAKKr3V5HabPMVjuzjaPSq/9sW/9yX8h/jTUWx2ZoUVn/2xb/3JfyH+NH9sW/8Acl/If40+Vhys0KKz/wC2Lf8AuS/kP8aP7Yt/7kv5D/GjlYcrNCis/wDti3/uS/kP8aP7Yt/7kv5D/GjlYcrNCis/+2Lf+5L+Q/xo/ti3/uS/kP8AGjlYcrNCis/+2Lf+5L+Q/wAaP7Yt/wC5L+Q/xo5WHKzQorP/ALYt/wC5L+Q/xo/ti3/uS/kP8aOVhys0KKz/AO2Lf+5L+Q/xo/ti3/uS/kP8aOVhys0KKz/7Yt/7kv5D/Gj+2Lf+5L+Q/wAaOVhys0KKz/7Yt/7kv5D/ABo/ti3/ALkv5D/GjlYcrNCis/8Ati3/ALkv5D/Gj+2Lf+5L+Q/xo5WHKzQorP8A7Yt/7kv5D/Gj+2Lf+5L+Q/xo5WHKzQorP/ti3/uS/kP8aP7Yt/7kv5D/ABo5WHKzQorP/ti3/uS/kP8AGj+2Lf8AuS/kP8aOVhys0KKz/wC2Lf8AuS/kP8aP7Yt/7kv5D/GjlYcrNCis/wDti3/uS/kP8aP7Yt/7kv5D/GjlYcrNCis/+2Lf+5L+Q/xo/ti3/uS/kP8AGjlYcrNCis/+2Lf+5L+Q/wAaP7Yt/wC5L+Q/xo5WHKzQorP/ALYt/wC5L+Q/xo/ti3/uS/kP8aOVhys0KKz/AO2Lf+5L+Q/xq9G4kjVxnDAEZpNNbg00OooopCCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA8+0z5/E1ic/8xnUG9uFkX/P416DXC6BYag3i65jnhhih066upt4mLNL9odnTC4wuFIzz17endUAef8Ahb59a0bnP+i6lJn1zcRc/wDj1egVxXg/SLu31q+a7uoZBpTyWECRRkZWVYZyzEseeVXAA6d+3a0AFFFFABRRRQAUUUUAFFFFAHn9r8/iiz7g+Ibps+uLWVf8/SvQK4TStP1A+OJreeKGOGxuJNR8wSlmlW485EAXHGNrZyfTjnju6AKerts0W/bri3kP/jprl/Bq41aUZz5ei6eoP4z5/kK6vUbZr3TLu0R9jzwvGr/3SykZ/Wub8DWNylpPqN5PE88v+hbIYyiIlvJLGOpJJPJ7dhjigDraKKKAMrWv+WH/AAL+led2niW/ksLu9meEJFfG1WNbGQYH2nygd7Ptfgc7ehPtg+ia1/yw/wCBf0rzy01PRLiE6dLp11aWD3czRzXDqIpZopWkcghywwyM3zBRgHtxW8PhNY7K5NF40geWNZNMvoY5vKNvK/lkTJJIsasAGJAywOCAcdu1K3jazWTUAbO68nT4nkuJsxhVxI6AcsDkmNscYA6kVgWmn+GLbz7zU9f05rG4HkW6x3ckSpskEg2FpW2FTswE2gdccjG/p2m+FIpr3R7KSF55odtzD9reSRl3M+SSxbOZSc5z8w9qpawt11/4H4BfV9r/ANfiTWXi/Tr3w7fa0uRDZB/PVJElwVUNgMhZWyCOh7461N4e13+2NLeaWN0vIOLm38iSJo2I3BdrgE8Ec9D146CnBdeHF0mTTbm48u3up5rQx390zSTsreW2GdixGcAc9x0qcP4c8Lh7SfUYrSS8O9jeXzGSXgLndIxbgADrxSb6rt+I7NPUdr+qanZ6Nb3mm2blpJE84PbmZ4IyOWMSspYg4BAORyecVX03xS9/Fai3s5L9WiRp720CpAhbOPldg/bkYJHen3V34Y1Ky0+3k1WAxOwNm8V+yOxHyZV1YMTk7evJOOtZUp8DWUUlzFeRONNCebDBfucFX+UyJvwzBieWyc0Pd+om9F6CRfENY9Ajur/T5La9eCF41mkijilMisQwYvhUyjfeIOAOCSBVyLxuksNs9tpV7erLHETLbmEIHfIVfmk/vKRkEj3qZ7TwpI32AXUMcttbRgCO9aOSKKMEqQwYMuA55znDc8Gmw3/g9LJLqPVbFrdZIoxM17uBeP5lBYtyRkk5+pqm7v5/gE7/AGf6f9fgOj8bWL32m2ht5kkvgNoaSLdGSWXBQPu4ZSCQCORyam1XxFNZ6pDY21hNKDPBHNckL5UfmNjH3gxOPQEDIzT38N6FaSrqTJJCLfEpb7XKsQ2ksGZd204yTkg1DqieFxq0V9qN7DFdpIgAa9aNS6DcpZAwViA4OSDgMPapXNpfv+AmpNP0/H+rDG8S3dpdyW1zYPPdBISltbBQ2ZDLgbncA4EfPTHPXOBDH45jlSPbomp+dN5RghPkhpRJuwR+8wMFGzuIrSuX8Px3Tarc3NskqkKZmnwAYiwx1xlTIwPuee1Zmo6R4dvtKtdRW9ig0+3MZa6S6ZB5cZfaocMCpDOec5zxUtyvptp92n/BLto+/T1FPjSNPtdxJb7bWK3t3VHdI3V5HkRlZmcLwUA4PrjPFSWXjaDUJLf7Ppd+YJvLUTnygqu8fmKpG/dnBxkDGe9U7f8A4QzULS0ZbhIPOkEFq/25o5JTC7opR1fJyXbkHLb+eTWlHb+F9GsEYTW8FtGY5lZ7kkAqPLQ5Lc9Me596cr30/ruJba7/AKlK38dRx6Zok+o2bRT6mqfIksfylmVQQpfcRlgeAcDrzxQ3jKS1sjeX9q0MSX11bsqqHLpCsjZGH4P7vHPfsAch9vpXg+7vbW0trpJZ4okligh1GQ5iDeYhKh/mQE5XOQM8cU67Hg0R3SXl5ZeXHdO06S3h2xzSIyuCC2FJUv8AL9TjPNNX+15/oN26f1oLN40ELPCdF1B7uLeZbdGhzGqojlslwpG116En2q3rniT+zNPSW1sbi8nmt5LiOOIL8qIoJZtzLwNy8A5OeBVWCLwjZTXMK31uZ4opHuGmvmkcIyoGLMzE42hOp4GOmaNSfwhq2l2bXeo2pszut7eWK/MYcEbWTejAsMAZBOOBmpfM01f0BNJq/wAyH/hYGnJeSWTwyyXMUTMUgaNnkdY/MZVj3b+mcEgAkYz0zo2nim2vPDf9tRwSPGWCJFFJHIzsWCqAVYrkkgckY74rNv7nwjpM+pTPf7bm2gZ7i1g1BwyjaFJEYcAPjA3AA8jnmrCReE7Ozl0hr2BVvB9sdZr1mlk43eZvZt+QEyGzxtyOlX0v/VyY3ukx914t+wwB7vRr+Fkhe4uELREwRKwBY4fDdcgLk4B78GvceOoraSfdo2pNBEJnM6mHaUhfZI4Bk3YBI4xk9hS/2P4YmsLKeIyXVtLKY0mS/kYTF2yd7F/3i5XoS3TpQlz4J1Amyj1HTpmnWaDykvcswmbfIoAbPJGfboMURt9r+v60DuPPje2Vp92mX6oryRwv+7xcOkoiKr8+R8zLy20dfSh/G9tFe2dnNYXMM9xM0DCV4kWN1YAruL4YncCApJI7Z4rLs7XwdDpeqX02q219GJJWmljvWKxeZJ5iqgD4R8hcFcElR3q2bfwbNZxQzagvlwhbp4n1R23b2VlaXEhEmWK4Lbs8AUle6v8A1/X9ebl5E7+OrQX11ZQ2NzcXMMqxCOGWFi7F9mPv4U5wcMQcEfSm/wDCZuHeb+ybs2kdjJcyKoRpVdJCjJgNzyD0496rj/hEbC+aWBnnmFsdQjxes6eWH3ZQPJtUbuewrTmtvDcEZne6S2VY50MiXrx4UyZl5DDo569VJwMUlzcqbeuv5NfnuT7zk7bafo/yJoPE1tP4aXWkgd42IVIoZY5S7F9igMrFeWI6kYzzjmsV/iHa2ESnVrV7WVpplMTyRI0aI+3Jy/ztz0TcT2HTNvzfBtjoqac+pWcdnfMZlMt+d0zFslxIzbi24dc5BHao4rXwYsWn+VqMYWd3Ns66pJuuCzjeC2/MgL4yGJGeO9PVyv0Hf3fM1NS1O+h1aOxsYoZHlsZp4xJkfvFaNVBOfu/Oc9+KpXXjaztdWutMNrNNc26btsMkTFzlBjG/KkmQY3Y7/i+58S+GEdtWXUbW4ltAtszwThjGJXUYIBwOVByem01HdaX4csdaWW4ilWS4jmuvMe6k8mMK0bu20vtXLbTwOcHNDeit5/8AA/AaTv8A18yNvHUcSSG50TU4CqvtVvJJd0kVGQYkPOXXk4B9aS48XzLLhbRrbZBM00U6h5I5EkiUD5X2kESZ4Pp7ipNU03w/rWgzXUd3braguz3QnOxAZFaXJDDGSn4dsUyNfBf2W2xqFpLHOJIopHv2kMu51L/OWJY7lTknjgd8UouV/e7fiKe3usht/GF1He3IvbbMQkuEt4YIh5j+XNHCo3GTGSz9wBz1AGTdv/GEWlQWb6jptzay3DlfJkmh3rggEgB/n65+XPAOcVAw8KXCt9q8u2aWe5t1E1wY2ZzMDIVw2RmRVIIwQcYx0qjew+DYElDTTXAs455LhotSkZvkKs6SfvNznOOGyBjtxkvZL01KkndqO99C5c+OI9Niun1GzMWy+e1hBmijDhV3bizuFHHbIJyOOuLJ8b6YdPe+SO4eBZNgYKBu/wBH+0ZGT028fX86hmHhi+1G3sxcMbvUGN6ggvnjcfJjcNrggMvZeuCccEiLU9O8Hx65DaXWG1C6OwWq3rg4aIx7zHvA+4Cu7GaaulaW+i+fX8RRet3tr93Q6ixuXvLKK4ktpbZpBu8qUqWUds7SR+RrrrX/AI9If+ua/wAq4jSLrSruOeTSryK6TzAJDFP5oVgoGBydvAHAwO/fNdva/wDHpD/1zX+VTVt0Ile2pLRRRWJAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUARXX2j7NJ9k8rz8fJ5uduffHNeceLoviW+saWdCa2UBX8025/dDlfviTg+2OeuK9MooA5Twkurrqesf24bQ35EHmG0DCM/IcY3c9OvvXV1k6dr9vqNxqEaQyxR2MjRyTSvHtYqSDgBywAweWAz2zUcPjDw1ciQwa/pknloZH2XSHao6seeByOaVwtbQ4nxBH49bUvEn/AAiTWawm/TeCAJy32WDO0v8AJtxj3zmul8KL4tXRdMXVjZ7hEvn+aXM/vntura0zX9H1l5E0zVLO9aMBnFvMrlQemcHjpWjTAKKKKACiiigAooooAKKKKAPPvFKeLz4n1M+EmsVm/sy08w3A+f8A1tzjy8/Lnrnd7VN4NTx4nh9RqxtPtfmyFvtpYyfe/wBk4x6Y7V1Guax/Ydj9rbT7u8jU/OLby8oPUh3XPpxk+1Go+I9E0idINT1ays5XXeqXE6oxXnnBPsaAPP54vir/AMJ1evYPZjTSY8faDm2/1a52g/vOuc7e+a7PwWJl8NILnZ5/2u78zYCF3faJM4zzj0qWbxj4Zt3VJvEGmRsyK4D3SAlWAKnr0IIIrbBBGQcg0WAKKKKAMrWv+WH/AAL+lecx+Fbqe3kiTXYTDFPdy2rW9th4ZpTICXbzCG2eYwwAvPXpXo2tf8sP+Bf0ryK58P63brdR2lnqLK0160XkX4QCWR1aGY5kHyqNwI65z8pzmtoPS3qaxXu38/8AM1bDwb/ZcNzPe6rE29ZzI5jYKokjjQkmSRmOBFkktzntV3TPC9xp3iE6lHqCLbNFsktoYnQTNtUB3zIVLDb1Cg84JNYWqaT4j1DT9Q0qSzupFaO9K3BukCTFzmJQN+7jpyABjHQ1I+keIn8SSSq2oQ2DR4jMcoLJH5G3y8mfaHD5OfLPODvx0f8Aetr/AMD+v6sNroWNW8FRyI9xLqywW+64a5MhkjQxSSeYQSkqDjkZbcO+K39Q0NdQuJJTMFDxwoFKbsbJPMz179P1rndO0rXH8A6zpd3aTC6kSSO28+YF5gYwAzZlkVCWzwGx3wM1SbQ/E8lzrInn1FUlSYRvayLmTMgMe3dPgbVGCNkfGRknmm4pJJf1oF23d9f8zZl8GTG5uWh1KNIbx2+0o9sWJQzNKAh3jafnIyQ3Y4FJ/wAI5bXlq1ra6tA0qWs0WVQNjfNuDEBugZCuO+DyMU2Oz1iTwTa291Y3S3KTjzra2vCkzxCQ9HMp2krg48zjkA1k2+ha9b29sGsr82iqhntI71RM482diu7zAC3zxEncM4IyelTZLRLy+Vv+CJrnbcuqv+Oxo6t4VuZtQu7+61cSCeOSOC3WMh9zxbQqb5fL7E42gnue9UIPCWsa413f39x9gvJLhtv7t4g0bRRo2VinyOUHVyDjkcjDbfQ/EbXti11BqDzRyI8dw9+rRQRiJhsdN/zuHP3trZ67u1UToXi3+xm3Lqb3KSIyWwnAWRwjBi7G7LbSSvKsuCM7KS1vdaL/AIH9P9QXuu66/wBWPRbWzkW1ns7gI1qAIoVHXy9ig7s987vwxXOSeCLo2KRJq6G4e3ntrmeW13ebHLsBIG8bWCxqAckcdKd4ztdevtHtIdLtZzcFHMjW9xtaOTZhRkyx5GSfmJbGAdpzxJo8WvR6xDDe2tyLaKS5ke6e4RkcOwMahQxbgEjkADHFW37z01/Me0U1/wAMVrzwe6pMk+q2X9mlpvKhurQnDzOp+ZxIucN93G05I5yBV200l7jwzHpS69Fe3tvKlytyy+aF2yl0BUuWKgqV5bPynnIrIn0nxEPEOom3hvpLOeaOVZ57kLtxNGSiASkFNofqikAYyc01dD1yGIpLa3klniHzba1vFjkkUPcFgpDrg5eIn5lyBjJ6Uo6WaBrVr1/r5k6+BjJcpu1mJ51ZjepGksYcNM0wARJhj77D5947465uXfgg3C3DRai0czXQntn2yL5KgudhKSKxGZZOQy9QOcc1VtPEFpcW15Dp9+0MckZaz+3JJIU8mVCCzOAxDMhOT2yM4qrp/hjWriK0k1N9SSYyKk6pqbqPKFqAfuPjPnDqOT9KaV0/L/MI+9q9/wCkb2ieGrrSNRSdr+CeBLZbdYzbvvTncxV2kbhmOTkE8AZ4qte+FPt1t5FrqojuYL6a4Zl8wbfN3MUby5EYcOP4hn05qvrOn+IrjwrokUYuJLyNEF8kcnzs/l4JJWaLOG9H98HFXvDWlX+nXeqPeCVp7lYH+0tICsjCFVb5dx2ncpJ4xgjBPYlFXaa2/Hr+YR2t/Xb8jEvvBU0MOo2+majCu7T/ACfsEKMDJlQiSSBpSpI2HB2gnkEnFWNS8EtdyLNd6zDHe3UkscpVJYY5g6ICiqkytnbCOCzA8kj0xB4d8TgNLFaalGxjtku/OvRM9yyibeUxOhC7nRsb0/3ex6y80/WG0LQgI2u7+zYSTb5AhZhBIvJyeSzKMgnrnnrTemoRim7f1sJN4UvJbLUNNXVIU026S4CRi0zKrS5JJffyAScAAHoCeKo6r4Qj1XVbkPrcKSXUYE0CmXPmiLaGVBMFxjacMrHj73PEvhzT/EEHh3WYbgXEF3Lu+x+fKGKExKMj95LgbwTyx9e9ZMWg68qXb2VlqVoshYhLjUFklP7lV4fzGIywOPm468donttcLtLm7/8AAO11Owil0+2E10lvFZyJO8jgbcJ1zkjA9+1ZI8HgWUUS3oYxw2MYYQ/e+zOXz97+LOPb3rndV0LXrzTLmFNP1Z7WZblbWzGoqrwMyxhDI3m4ZciU43NgNjHps+G9M8QWvia6m1F5/sp83ktlJAXBjx++bBVeOI078nqdF5ddfmK9tvT5FOw8DahPoViL3UEgvreC3WERRPH5IQP8rmOUMx/eMMqy9Bx1B0YfBk9pol3YWuqmKS4milMgST+FVDLkSh8MVJzvB5xk98e/0jxFK+oyW1pqUSy6j5hia78xZIArgeWBcIRliHI3IBkDB24Mlt4e8TJGLlru9/tHzNiyvdnYI/sm3Jj3lP8AXc9CcjPI5qbJ3dvMrVy/A1f+ELlGk/YP7Rjw2nzWUj/ZzzvbcGAL8Y54JOfUVW1XRNMutUvbCXxBbQ3t00UtpamQLLCwZXJAV1chmQH5dp4OD3Ffw3oevDUrR9U+3R2cRkcxPcsuJMR7SQLiUuCQ3BOMgnaM839Y07UbnUtUtodMklivvs/l3fmRiOEoeWILb8jqMKeccjrSelrL+nr+Znay0X9LT9EV9M0rR98mlR+ILC5v+PNhSXfIHWYysdrSM/U4OSSMZz2ofwXDqF615a6ujxPPJ9oVDJtYec0mz93KoyCzA7gw9hyDd0+C+uvFN7d6rot0FYNbWsrPC0McA68CQtlzyfl6bR2zV3w/YzaNZNZrp4jie+uGRYigSKIuzI2AehGBgcjPTrSjFXTt0/U0esWul/0KP/CLJJYCyt9Si8+1ghty3lbtrxyLKpZQ2eeOMjg5zWjrWhzarIk0N+bWZLWa3V1jJwZNnzcMCMbOxzz1GKzruDWUuPEVvY2Nwkl+C9pfLJEI0YQKoyC+8HcuPu+lc5/YvimO1tZkh1KWaK5Z0tHnCRBcJ98/amcchiCGfGWyvOKairWtp/nuEm07r+tDduvDs2m+AtY09ruKaa4EjmUqVVSwA58x2J6dWbmkm8FXlybuSTVbfzdRR4r4rZkK6MEX92PM+Q7UAyS3JzjtTvGel6jqToltaX1zG0DIi214IUjlLD5pFLrvXbkY+bvxzWTDpXi2G6vJ2+1yBLhJDGsoH2hVuFb5C07AfuwwxtjBzg5xTi/eXTp6W0M2t1b+tzU1DwRdXipFFq4jg8+aZ42hcgmSXf0WRQSOnzBh3wKtt4PD2zQNfHDRX0ZIi/5+ZN+ev8PT39qyYNP8TzalY3UsF9BbrcvJd2zXiEyI07GMDDEDYCGbBG4fLzjFSa5DqV541eGxS/dore1dHhvPLhgJlfeXTeN25VI+63Tt1pNLltY0TtNyW/8AX+Zbj8KkeJILyXVI3cCOea2XzV3uiBA6qJdoXgfeRjx19LN/4WmvdYe5F/ElnLOtxLAbbdIXERi+WTdgDGD90nOecHFYU/h3W00G0hVtUM4sIvP8q7Ejtcb1Zwd8q5Xg5AYDHANMsdK8WNq1jNeJc28YhjDiGcyLEojIZCzXHLFuclJDkj5+OFJJpprq/wDh/wAETFtN27f0vxOk8L+GX8PLOZrz7XLIkcYfMvCJnaP3kj/3j0wPavR7X/j0h/65r/KvMfBFnqthp91b6nBcIFlHkyXU2+WVdoyWAkkUHOfukA9dozXp1r/x6Q/9c1/lRV1sQ0ktCWiiisSQooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAOdg8MNFqeqXbXFqBeQvCogtBGwDMWzIwb94RnAOBxnqTmqk3ghZbZoft4GZEfPkf3YEix97/Yz+OPeutooSsrL0/r7xNX3/rb/ACRj6boI06+Nz9o35Nwdvl4/1s3mdc9unv146VsUUUD6t9wooooAKKKKACiiigAooooAo6ppq6pBBBJJtiS4jndcZ37GDBevHzBfyqlf+Hhfaw1+bkLlbZdnl5/1MrSdc992PbGea26KFpr8weqa76HJQeCFgjkT7cGDyF/9R0zb+Rj73/Av0966qGPyYI4852KFz64FPopJW2/qwPXVhRRRTAyta/5Yf8C/pXnVprWtatrKwxLbWltJC0kRWXzWZVmVWLDaNrbQ2ACRz7V6LrX/ACw/4F/SvPLbXvCdjqdxLbWRt7uVys1xHpcib/n2szSBMFd3Vs4z3raHT5l/Z3/q5VHju8keZYdGJzKsdu0hljRiZ1h+ZzFtzlgfkL9D6csn8Y6rBJ9pksrZYoLC+luLdZyd0kEip8rbM4P0/iPHAzeOq+ELW6vZhZQpMZC0sq6c2Z3SUKSpCfvGWQr0yc81ZlvfDk98lnNpweTaxZn05ikXmLuZXbbtRmByQxBOeetXGSSXMW1uZ83i3UINfjs59PZYoAFuvs6yyAuybxh/K2bRx1ZWJPTA+a1o3i+XUNK1C+utMmgFpbi5AVJAJEKswAMiJlhtPQEcjB9JF1Pw3eStrP2Ay3dsqqsrac/2gI2dpXK7th+bkcdfen6ZqHhi0tWOmQ21vBOkEziC18sOJmKRkgKMkkEc9O+KSUtV/SBbp9DMt/FerahJpqpYpatJfpDMJBKqvG0Tv8vmRK2Rt7DHA55OLfiLxBqFnqK2djDCscclobid5gHCyzbMKm0g8KwJJHXjJFWNKHha4lm0rTbCyVrWXzpreO0CCKRWwGYYADZXIPUgZHFV9V1Tw/J4nsbW502C7vo5/KNzNaki2IjMvEpUruAAO0EEZzTXfzv8tA1t5ol8NeKZtfuJUfTpLaLyxLC7JKNy5IwS6KCeh+UsOvPGTn23jTUbi6Fg2lQW+pPceUttPPImxdsjbmPl4IIiOChYHPUY52dAl0G5lu59Iso7aaUrJOfsZgeUNkq5yoLA/Ng/Xvms6NfCE39o2sOhQSRpukn26STFM0ZIOG2bZGUkjAyck470tUtewb7FWXxhqV/4Z1jUrCzgt1tLJZUeSYs3mNEsmNuzGAG655I6Clv/ABjfaZf3NqLFrqdZPuKJHRAsMbsB5cTNyX4LDHUkjgUsPizRkt4YrnSfIgu4ZhdpHbPIIzFsQq6hM7drD5mAAAA71Pc3XhuRLu21DRbaWK3vFhjiSz+0GVlhRg4RUJGEbHsB15xTd7XT/q47r+v69S7rHiG7sl08WNjDLJdxSTFbq4MOxUUMRwrZOD0rHufiDLC95ImjzNbQQu6uRKPmWLzcM3l+WAenDk5xxzxsa5baBe2dnq2pxxXdjAv7mMwCdZDJtC7UwSSTgDA71Wn1PwrHKuo3GnKlxcwsJZZNNcSLECEbzcplV6D5uMewoV1N3+4joncfceLjBqV1aC0VvLlEELiT/WSlYiqnjjPmn14Ums8eO7yR5li0YnMqx27SGWNGJnWH5naLbnLA/IX6H050YZ/C2nzT2UGmQ27WQa88uPTygymFaRML8xGQMrk88U22uvDMtwt5YWNjKl7LI0l1Fb5MrRfPuBCnzCGGc56jjJourpvb+v1uNjNL8QapqHiCxtpbe3gheC7+0RpKX/eQzLHlSVBI59vvH0Galz4p1IeItRtLe2kNvHHJDEWifYsyRmTez+XtAPTG8nhfl5NaMGr6Pc32nNZ2EbSveS2xeSDypLdzE0rnBXOWwM9M7s0mt6hoOiap9pfTYpdWnVEaWO1JbY7BBvkCnaD0G4jOMUqidl00f47Md1dtdyifF+pWummefT4JjFb2pdo5XLPNMQAAixk7RnJxk9gpq+fE10fDEWppp227kuktRbzs8S7mmEQOWTcF5zyucdqmspvDl5JPo1tZQeXsaNojZ7YZVjO1lUldrhScEDOKoy6xp9h4ktfCsVhpMNuojkjjknERzksPLiEZBIKgj5hz0qr+9r1f6kK8Y6vYo6h41v8AydYhhsXt2toLgRXISRgssQ5JLRiMgkHGGJ4GRyQDU/GV7ZXUltDbTzmK4keQxxs7eUhTKKEiYAnd1fA/2uci9p8+n6jrcks/h2yjXUUmjjvCEeS4WM7WWQbRgEDIGWyBzjpUUWoaRq/i+40e40nRZJLOVpEMkqtcb9qkuIzHgZ453Z4BqE7uOv8AWgSfVPr/AF/w40eN7+aXUEs9BnuPIE3khRIvmGKQIwJMe055ICMx4x1rTTxMH8J/2yFgMm7y/LBlx5m/Ztx5e/dnjbsznj3qDTILHU9T1SDUfDWnW928Ub3BASYyo5OFlO0fMNmSvzDoQTUOqar4a03Sb7ShpsElvaxyEWZtClvI6L5pQHbs3Y+bjPfuDT1sWtyPT/HTXlvI8lgsMkbwRsrSkZaS4kgPBUHjy888844rWvdau4dcNlb21mbeFYXuJri78pgJXZVCLtOT8vcjJIArIF94LS1trsaNEPs0pihRdHfzYWA835U8vcowd2cAc5qa717wlePbajdWguLmKZYrZpdOdptxBdTGGTdggFgRwccc1TauJPQhtPFt+9pcSfYoZUgEaCSW42M8skpRAQEwFHduvsaty+KbqyhuRe2toLm3tXmdbe6MiblcLtyVBBOR1GRW4mnac9pJELC3EFwmJIzAAHX0ZSPc8H1NclDL4fm1C80+bQ/DyWWjGV9m9XniUAMzrB5fAJI5DVmrppSff+vlcVnyJJ6lzSNd1K916ytyUNpLHfGTew35iuBGuMKOACB9Cc5IyX3ni64t9burCHT1uEhjkKujONzogcrkoFzjIwGJHGevGjpFxourN9osbMJJaOwXzbNoXjMg3MQHUEbs5JHWsvS9U8O3l3dal/ZKQanGshlkFgxlkVWKNsfZmToAdueoFXJ7JeYX/QhvvHbwSI1ppr3cDeY4eNZXLxowUlQkbAEtuxuKrwOeeNbSdbu9Sv3EltZw2bNMkBF3umYxSbGJj2gAZ9GOOM9azxqPhC9Ol2g02Kdgz/ZIBppYwFHCsdu35AGxk8evQZroItK0y0vZtRhsLWK7lB824SFRI46nLAZPQflQttfMetzkbnxpqVtctcyWUX2RoT9mhimaRpGM6RKzhYyy4yThd3XHJFXbXxo81vM8+nmCSGKNisjMm5mnaLgOqsB8oIyAecYpltqfgy6hvbqDTIibkR+cDpTK90JT8vBQGQMQeeRxn3qxE/g+5t4HTT7Fks41khVrEA24aQpgAr8p3qwI4II5qVdJJv8ArV/gHf8Art+Za0XxG+ra1qenNapF/Z7bXkEoYSEsQpUemBznGGyvOCaow+KNRltIbr+z9PU3xi+xr9tJcq7YBkGz5cDnjcM8Z71p6Je6LqEs76Vahfs7PEZhaGNSS53hWKgH5wSQD15PUGqN7/wiWnXd1ZXOk2yPdK0k/wDxLspcFQZCC23DkAFsc/nRrZa/8H+vwHvdIgtvGzTJN5likckL28bDzsgtJcPA204GQDHkHuD2pbbxDrN6dDuUs7WOC/ErmFbgszII9yclBg5z7e5qS9uPCNrLAZtNtpZbP5IPK0/zWhVFWQldqnaqhlORwCQOtSnWvDEl5BpphRvszYhP2JjDG3lb8K+3YD5ZJwD0py1TtoHQseF9em121uDd2qWl3BIEltsvviyoIDbkX16jII5B7D0O1/49If8Armv8q8+8MSaJNphn0GwS0tJW3fJZm3WTIGGA2jcMY5/DtXoNr/x6Q/8AXNf5VNXoZy2JaKKKxJCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAyta/wCWH/Av6Vxsnh3T3tzC1xMFaN4c71z88nmHt1yPyrsta/5Yf8C/pXk2p/D+6uLKzjtRZpIpuDcBSiB2kYES5aF8uAMZwrejDvtHZF2TVmjdbwfp73LO99dsiyNLFAXTbCWmWVtvy5ILoPvE4GQMVYuNJtZdcLDVL2P7WPOlsoivlTbVCbmO0sBjaMBgDgcda5aLwfeahPqrGysIRLPcL9qkLedcKxACyDZ9zgkHcc8cdauT+Bpj4lnu4kt/7PdSEiSRYSqeR5XlfLEXCd+JABnO3I5N0rrp/X9f8AtSd2vMsweANFh0prOG6dY5Jo38xYLYbimQqkCLa/Un5gxzznIqSfwnpWn2sMzarfQWthbwiZVaMiVLdi6F/kJ4JOduM1zh+HmtPp8Nsz2KxxNKscSSR5VHWMBy5tsM4KNyEVsEfP1ztzeBBJFeMsdkLq6W8SW4K/PIsv3Nxxk44PtjinJuOsVr/wAMEUnZP0+Rs6bpmnaXqz3EF5cyXWpBpHDsGEuDuDnC8bQwUHgY2jk4qvNomm3PiOeR9Suw0LLdzWWVEIZ42hDEld3Kq3AbGRnHNZkHg+/TxRZamwtooY1iJWKRMw7I9pjTMO4oTno6D5j8vrY8TeFb7V7y6uLeWDa4ttsUjACTyzLkNujdcfvFIyrcr0HBqmlb8PkJX/X5mn4d8Maf4XhmW0bIl2hnaKGM4UHAPlouep5OT71DJ4WglW7tm1jUPst3HMq2okj2J5jbmK/Jluc43FgASMYNR/8ACLCfQNE0u9jt7mKylV54psSIwCONoGwA4LDHyqMDoOlZUXgq9hubQLFp+yI25FyHYS26xMx8uMbOVYHB+ZeC3B7y272a8g2Ssv67F2PwPp8FskcGrX0IVZkcwiBN6SBd67Vj2gYQY2gEetPufC2h+IdOFylw5guZlvUcxxOBmJUA2yowwVAPIyD3FZtv8PVtUt5ILbTYrqKOxzMiYbzIpC0zA7c5dSBnqehwKj0jwFcQLYR3tjo8cFu0PnxQEutyY0lBkYFAN5Lr1z0PPQVbS29F8h2SOvn0i2uNIj0uKaS3S38ryngKhoihBQgYK9hwRj2xWPdeHrK4ng0+61vUZLmWCYTbjGTcwl1Z1c7MKAWAAXacHAqPwz4VvdG169vbiWNo5BIqmN0zLuk3AuBEpyBx8zv1OMVlXXgTULi7vnji02AypcD7THIfNufMnSRVlBjIACqUOd4wemOKV27Se+r+YrLZm3b+CbGC9vr+HUb1ZLyKZDIhiBQSsGYhwm4kbQAWLYHAqUeEtLOmJYw3VzHahZlgWOVf3ayqVIQ46DJI64+nFQ2PhmaLwTeaNdRRSvciXMInCINx6B0iUKO/EfUng1zVr4O1b+0ILa6sdKlaKD5bnG02wM5YNGViVWkAHJATJIPrmXuo2/rVie3NY6jQvDGl2EcD2tzcP5V49wu+OOIFxGYSNiooC4BxgDPXJFW9V0G11W7jujqV1bBxGjpA6bZwj71U7lJ65+6QSCc1hHwPcSRakZWszcTW80VtLjLRl55pDyV4BWRQevfgjrQfwHqYsrMwR2P22G4eVTNMjRQq2z5RGLcIwJTdwqEHo3JNU227Pp/w35Dfu3t/XX8zqNN8KaXo2t3GqwHbNcM/DRxDBdtzfOEDtk9mY47U6fT7TWL97n+1btre2nQzWalPK82IhgTldwIO0/KwBwPfOf4z8L3viGWze1li2xRyxukjquC+3DqWik5G09Ap54Yd9PRtGfTBqsflW6rdXDTJJGfmfcoB3jAwcg9zU3a26fnpYHvbvuVdP8P6TeLFdfapr+wuInktrS5VDEiSkOxC7Qxzx94nGccVbXQoptUS/Op3cscMjSQW+6MxwuVKEqQu7oW4LEDJ46Y5iz8CajBqmnzzS28sUFvDG7CVVZSkXllFJhL7CcniRfvH5c9dDw74W1DS/Deq6VI1rbLcKyWvkMHaIGPbl3EcZcg9CRnAGSabSTdl3t5hHWyZe0G0stDnns49Wvr15Jfn+0xoxEhUuWLpGuSVHViegHHSkvPCVhqNxctLf3ZhnMrC3Vo9kcjp5bOp27s7SeCSBk8Vi23gq/RHMdppOnhp2kEFpIxQA2rw5+4vJZgTx09T1mm+H8COz6dBY2Mpkys0CbHjQ27RNtIHGWIbGecZ60ruL0X9f0kOKT3OhbRbFruW9NxJukkaQ/Ou3PlCI9v7o/P8qzdW8MaZLpVzbT3lwkJhiEyrFFMxSJSB8jRtzznIGcgYxWRpfw/kWGKPU7ewlhWVna3OySPPlbAwCwxrnOP4c4A5NV5fAerGSf7ONPj+0ad9lnlklMjSP5IjBXMW6PkDOHIIH3c1VuZ2e2hF9U7f1ov69Du7C1jsIlt0u5pUihjjVJnDFQowCTjOT3JrOfQIS99/xN7wWuomQSWwMPllnXadp2bs8f3utYN34Kvrq5vQYdOCTNcN9q3t5s4lIIjkGz7qgY+833V4HZmqeBLjzlfSLTTIfKu3mtw7ARQoyx5BiMTK2WQngqRxhhk0vid5Ldfnuv67Du46JbP+n/Xc7O2sYLG4mlWRt0+xSHIx8q4GPwrCPguylgurZ9Uv5klR0RHaI+QryCRgo2cgsoGH3DAx0zUPi/wte6/f2U9tLGEjjaNtzorRksp3oWik547bDwPmqXRPCf8AZOspqIitFmY3n2iWIYeUSzB48nA3YUY56ds00r7+f9fMpabEbeBdMaysrJtQufKs7g3CgJbqxcvv4IjBTnj5NvHFap1iytDcQXt628mV+Yn+VAyrxxzjeg98/WsPUvAVvqDXk72WnPdTrd/vZI8sWkx5RJ25+XHXt2om8IajLPcyefbfvUmUZds5d4WGfl/6ZNn6j8Ig29GraP77bCneKvHV3L0PhvTZLWKO2vryF7eOG1il+UOhgZtrAMmCclgTggjp61DL4U0xZrS3XVb+F5V+fYUxd7ZDMd5KEA7mY4XbkE9hxWl8DC8kuXvoLC4Zp2kgMi7jGGuWlPVeMqQDj6dKpT+AL0X9u1s1qlrFM5SNGRPs6GdpAYw0L4OCBhSnKjk9mpOTXMt9SppLma16eqOh0LSNNttW1HWLW/luJrpzBNuWNFDI5yMIi7iCSNzZOMc02Twppr+JX1+S8mMqvuaNvK2A+WY8Ftm/GCfl3Yyc45qpY+DzDq8dxPbWHkQ3N3PGVGW3SsjI+NoAZcMuc9hg84GFB8O9Qi0e4tphbzz7oTEftKorNHu/eMBbYLHdyHEmc8twDQm1FadP+HBpXdv67HTN4Ps4dNt7eHUr+3MCyp9pVozI6SY3K25COygEDPyjnrmXT9G0meK2vLG5m8uWVb6DBA/5YCEYBXONuDzzn8qraj4evr3w7o1pPbaXez2e0z20uY7aUiJk4AQ4ALAgbccdBxjFsPAWo2uoadLPJbyxwW8KOVlClSkWwopMJfYTnpIv3j8uetPS9hJ6XOp8OeHrPQY7w2lzJcG6m82RmEajcABwsaqo6c8ZJ616Da/8ekP/AFzX+VeZeCtAvfD1jdWtylpHC0oNvHAwdlUKBh3EabzxwSCcYyTXptr/AMekP/XNf5VFTZES2JaKKKxICiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAyta/5Yf8AAv6V47c+MdSivLu5jvrK4aGFg1pCuPsmbhI8yhpACwXJySg68gc17FrX/LD/AIF/SsnFbQT0fqaJXjb+tzzyy8fXTKkd5JZRzTNbLajcpNwHuHjdl2uwOEVT8rEAnqa3PDHiG71nUtRguTbiO2OLcxqwNwm9180Z/h+XbgZ5UnOCK6fFFaDsea2fjDULe0njXU7C5CSuskjIxawH2kR5mJfn5WZhnaMJ3HNKni+//tKKb+1dPAeLbHCyMVvwtw6AwjfgMy4Ofm7dq9JoqUtvILaNI4C28R61uj8qW1+zQm3MqSxPJJJ5tzJEcOX+XAUHkH8qpxeOtauNP1GYHTYHt9hYTyQp5GZNrRn98ctjpv8AL5ByOcD0ukwOeOvWjldkrj6WOWl8QRy+GNE1mW9W3gnmhaWZ/wBwu05zuBYgAntuI9zVPV9Xsj4o0iSx1hpZJZYQ0EV62GifcFaOEfLKpJ+ZsnaFyOldtRTS1v53/LT8BNO3yt+Zx2veKNQ03xbZ6XBFD5MohIEhQGbfIVYKWkU/KAD8qv15xSWV/ev4B12ebUPNu7dr9RImVaIq77R1JBAAI9AR9a7Kii2jRSdpKR594p1y1u7DTbqw12waBBJ5v/E2ktllYKh2iSLOXweFJ755xWr4p8SXWjaPptzbKkAumAd7nYfL+QsFPmSRrkkY5bPXAJrrMZoxmk472e4rbHM+HdRvr3W777bPGm+1tZ0swcmHcp3YOTkZBGQK5m58Y6lFeXdzHfWVw0MLBrSFcfZM3CR5lDSAFguTklB15A5r0yjFDXvXXn+JPK7WuciNZvdQ+H8upO4iuCSFlgdcMBJtDAo7AZA7MR70eG/FU2s+JdRsDLbyW8KuybAqum2QrhgJGI4x94KeCcYNddRjFFveuFnbc82tvFuo2a6hEmpWN0Yp7ncjozSWSi5Ch5Tv5QK5IHy4CjnAJptx4wvo72K4j1jTWVYbgQ/Ixj1DZIoURAPgOclcgt0OB6el0YoSfMmypLmWnc4GLxBrQub0W8tqtvaTu8iTRPI8gN08e1W3jbhV9CPQAVe8MeKL/WdfvrK4jgEUIkyqGMNCVk2hWAkZjkZOWVOnQ547CjFKMWmru45attHH2niE/wBm6na2l0LzVor24QWySCSaJPPKhymc7VBBx6ADvV7wffiXw/YQXF1NJdskpH2psyyKj7Sx9eq5PvXRUVSQpayv6hRRRTAKKKKACiiigAooooAKKKKACiiigAooooAK6a1/49If+ua/yrma6a1/49If+ua/yrKpsRMlooorIgKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD//Z" /></div></div><br />
En regardant le circuit de détection, cer tains se demanderont pourquoi nous prélevons la tension positive de 12 volts sur le diviseur formé par les résistances R9 et R7+R8 et pourquoi nous faisons parvenir une tension positive d’environ 0,3 volt, à travers les diodes DS1 et DS2, sur les deux entrées de l’amplificateur opérationnel IC1/A. Si nous n’avions pas appliqué cette tension aux diodes, pour les faire passer en conduction, nous aurions dû dépasser leur niveau de seuil, en fait nous aurions dû appliquer sur la prise d’entrée du module des puissances exagérées alors que nous savons qu’il ne faut pas dépasser 40 milliwatts.<br />
Ainsi, la diode DS1 est déjà conductrice avec la tension positive prélevée du diviseur de tension à résistances et il suffit d’une puissance dérisoire pour faire activer les deux relais. En fait, les deux relais seront excités avec une puissance de seulement 10 milliwatts.<br />
Il faut signaler que l’amplificateur opérationnel IC1/A est utilisé comme amplificateur différentiel. De cette façon, quand les deux tensions appliquées ont une valeur identique, nous aurons 0 volt sur la broche de sor tie, comme le confirme la formule :<br />
<div style="text-align: center;"><b><br />
</b></div><div style="text-align: center;"><b>Volt de sortie = (R6 : R4) x (V1 - V2)</b></div><br />
D’où :<br />
V1 est la valeur de tension (0,3 volt) présente sur la broche non inverseuse 5.<br />
V2 est la valeur de tension (0,3 volt) présente sur la broche inverseuse 6.<br />
Sachant que la résistance R6 et de 150 kΩ et la résistance R4 de 3,9 kΩ, en sor tie, nous retrouvons une tension de :<br />
<div style="text-align: center;"></div><div style="text-align: center;"><b>(150000 : 3900) x (0,3 – 0,3) = 0 volt</b></div><br />
Lorsque, sur l’entrée du module, nous appliquons le signal HF prélevé de la sor tie d’un émetteur ou d’un VFO, la diode DS1 détecte cette tension et, même si elle est aussi dérisoire que de passer de 0,3 volt à 0,4 volt, sur la sor tie de l’amplificateur opérationnel IC1/A, nous retrouverons une tension positive de :<br />
<div style="text-align: center;"><b><br />
</b></div><div style="text-align: center;"><b>(150000 : 3900) x (0,4 – 0,3) = 3,84 volts</b></div><br />
Cette tension est appliquée sur l’entrée non inverseuse 3 de l’amplificateur opérationnel IC1/B, utilisé comme comparateur de tension.<br />
Dès que la tension sur l’entrée non inverseuse dépasse la valeur de la tension présente sur l’entrée inverseuse 2, qui est d’environ 0,7 volt par la présence de DS3, nous retrouvons, sur la sor tie, une tension positive d’environ 10 à 12 volts. Cette tension polarise la base du transistor TR1, qui devient conducteur et active les deux relais reliés sur son collecteur. Dans le tableau ci-dessous, nous avons reporté les valeurs des résistances qu’il faut utiliser pour l’atténuateur en fonction de la puissance d’entrée.<br />
<br />
<div style="text-align: center;"><img alt="" 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" /></div></div><br />
Note : Les valeurs non standard des résistances peuvent êtres obtenues en reliant en parallèle ou en série deux résistances. Par exemple pour obtenir 75 ohms, il suffit de relier en parallèle deux résistances de 150 ohms, par contre, pour obtenir 95 ohms, il suffit de relier une résistance de 82 ohms et une résistance de 12 ohms.<br />
Jusqu’à une puissance de 250 milliwatts, nous pouvons utiliser des résistances au carbone de 1/4 watt, jusqu’à 600 milliwatts des résistances au carbone de 1/2 watt et pour des puissances supérieures des résistances de 1 watt. Si le VFO ou l’émetteur que nous utilisons pour piloter le module délivre une puissance inférieure à 40 milliwatts, il faut exclure l’atténuateur. Ainsi nous relirons la sor tie du relais 1 directement sur la broche 1 de IC2. Le problème de l’atténuateur d’entrée étant résolu, voyons à présent les broches d’alimentation.<br />
Dans le tableau des caractéristiques, il est indiqué qu’il faut appliquer une tension inférieure à 6 volts sur la broche 3. Pour cela, nous avons réduit la tension de 12 volts d’alimentation à 4,7 volts par l’intermédiaire de la diode zener DZ1.<br />
Pour éviter les auto-oscillations, il faut appliquer la tension d’alimentation sur les différentes broches 2, 3 et 4, à travers des selfs HF en ferrite (voir JAF2, JAF3 et JAF4) et il faut relier, entre ces broches et la masse, des condensateurs de 100 nF et 10 nF.<br />
Ce filtre, qui a une fréquence de coupure d’environ 170 MHz, permet d’éviter de générer à l’antenne des harmoniques à 320, 480 et 640 MHz. Pour fournir à ce module la tension qui lui est nécessaire, il faut utiliser une alimentation stabilisée en mesure de fournir 12 volts sous 2,5 ampères maximum.<br />
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<div style="text-align: center;"><div style="text-align: center;"> <span style="color: #0b5394; font-size: medium;"><b>Réalisation pratique</b></span></div><br />
</div>En regardant le schéma d’implantation des composants, vous vous rendrez compte que pour réaliser un circuit HF, il ne suffit pas de disposer du schéma électrique, mais il faut qu’avec celui-ci, vous ayez également un circuit imprimé adéquat. Le modèle utilisé est un circuit double face à trous métallisés, sur lequel les composants doivent êtres placés dans une position bien précise pour éviter des couplages capacitifs indésirables.<br />
Vous pouvez commencer le montage par le suppor t de circuit intégré IC1 et poursuivre par le transistor TR1 en orientant le côté plat de son boîtier vers le module IC2. Après ces composants, insérez la première diode DS1, en dirigeant le repère de son boîtier vers le condensateur C2, puis la seconde diode DS2 avec son repère dirigé vers R4 et, enfin, la dernière diode DS3, son repère dirigé vers le condensateur C7 (voir schéma de la figure 6).<br />
Insérez maintenant l’inductance JAF1 sur le circuit imprimé, puis toutes les résistances et les condensateurs situés à gauche du relais RL1. Si vous connaissez déjà la puissance que délivre votre VFO ou votre émetteur, vous pouvez installer les résistances R15, R16 et R17 en choisissant leur valeur dans le tableau donné plus haut.<br />
Si le VFO ou l’émetteur délivrent une puissance inférieure à 40 milliwatts, connectez, avec un morceau de fil rigide, les deux pistes où doit se trouver la résistance R16 et ne montez pas les deux résistances R15 et R17. Montez à présent les deux relais spéciaux pour la commutation HF. Ces relais sont capables de commuter des signaux allant jusqu’à une fréquence de 1 GHz.<br />
Comme vous l’avez noté, le relais RL2 est installé sur le côté opposé du circuit imprimé, près de la prise de sor tie. Poursuivez le montage par la mise en place de la diode DS4, dont le repère doit être dirigé vers le bas, puis la diode zener, avec son repère dirigé vers R18 et, enfin, la grosse diode DS5, avec son repère dirigé vers la gauche. Après ces composants, il faut monter le bornier à deux plots, tous les condensateurs céramiques (à l’exclusion de C14, C15, C16, C17, C18 et C19) et les deux condensateurs électrolytiques en prenant soin de respecter leur polarité (patte longue = positif).<br />
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<div style="text-align: center;"><img alt="" height="461" 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TeRvteN+Dtzz0zipovGcPkp5ulat5m0bsWvGe/eoNe8J+GrTw7qdzB4c0ZJobSWSNhYRfKwQkH7vqKt2vg7wvJaQu/hrRizRqSfsEXXH+7R7oWl3/D/gnLWOryQeObvVpNJ1P7LL5+0i35+eKyUcZ9YJP09aTxtq0mu2NrDZaTqZaN5Wbfb7fvQSIO/q4pmm+GNAf4kX1q+h6a1sv2nbCbSMoMQ6eRgYxwXcj/fb1NHxF8MaBY6bZvaaHptuzSTBjDaRoTi3lIzgeoB+oBpXiK0u/wCH/BOrHjK2x/yC9X/8Bf8A69H/AAmVr/0C9X/8Bf8A69TjwX4VwP8AimdG/wDACL/4ml/4Qvwr/wBCzo3/AIARf/E0/dHaXf8AD/gnHtq0h8errA0nVPsmwLn7Pz9xh0z6kV1H/CZWv/QL1f8A8Bf/AK9co3hjQB8TVtBoem/ZtgPk/ZI9n+rY9MY6iuz/AOEL8K/9Czo3/gBF/wDE0vdFaXf8P+CV/wDhMrbHGl6v/wCAv/165fwVq0mh215He6RqamV42XZb56Rqp7+orrz4L8K4P/FM6N/4ARf/ABNcb8PfDGgXtrftd6Hps5V4gpltI2xmJCcZHrzR7oWl3/D/AII/UdWkufG1lqsek6mbWHydxNvg/KtyDxn/AKbJ+vpXSy+M4BC5j0nVWfadqta4BPYHmuX1XwxoEfxF0+1j0PTVt2+z7oltIwhyl4Tkbcc7F/75HoMdZe+EfC9vYXEyeGdF3xxM65sIsZAz/do90LS7/h/wSG18Zx/Y4PP0fVI5vLXzES1+VWxyBz0zUv8AwmVr/wBAvV//AAF/+vUek+FPDN7o1jdS+GdF8ya3jkfFhEBkqCf4auf8IX4V/wChZ0b/AMAIv/iafujtLv8Ah/wSv/wmVr/0C9X/APAX/wCvR/wmVr/0C9X/APAX/wCvVj/hC/Cv/Qs6N/4ARf8AxNH/AAhfhX/oWdG/8AIv/iaPdC0u/wCH/BK//CZWv/QL1f8A8Bf/AK9H/CZWv/QL1f8A8Bf/AK9PufCvg2yt3uLrQNBggQZeSWzhVVHqSRgVS07S/h5q8rxabp3hm7kQZZILeByB64A6e/Si8QtLv+H/AAS1/wAJla/9AvV//AX/AOvR/wAJla/9AvV//AX/AOvVSPTvh3LFdypp3hryrNwlxKbaEJEx6AsRj/6/FXv+ET8HCQR/8I/oW8p5gX7HDkr/AHsY6e9HuhaXf8P+CM/4TK1/6Ber/wDgL/8AXo/4TK1/6Ber/wDgL/8AXqJtC8BJbrcNpXhsQM21ZDbwbSfQHGM0RaF4CnmaGHSvDckq43IlvASMkAZAHckfmKPd7BaXf8P+CbGj61ba3DPJbxzxm3m8mVJ49jK21X6f7rqfxrRrNsYtE0cCxsE0+xEshIggCRb34B+UYyeAPyrSqSgooooAKKKKACiiigAooooAKKKKAOf1L/kIS/h/IVUq3qX/ACEJfw/kKqV0x2RqtgooopjCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK29H/49H/66H+QrErb0f8A49H/AOuh/kKipsTLY0KKKKwMwooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACoby6jsbG4u5QxjgjaV9o5woycflU1ZviL/kWdW/685v/AEA0AZEfjR5YlkTw1rJRwGB3WoyD/wBtqd/wmEv/AELOs/8Afdr/APH6o6f/AMg21/64p/KrNABdeKDd2k1tN4V1h4pkaN0MlqAykYIyJ6iuPiDpmjxxHV9N1HS7Q/Is86xSIpA4GIpHb9K5y78XSwX9xaW2j3V00JI/dAsSASM4CnHIIGT2rlvHM+q+KNDW1t9Av45EcOAYZCW9vuAfr2oA62DxLpGm+Mr7Xru78vTGSeQT+W5+V4dM2naBu5yO1Q+LfF+heK9JhbRL77ULaWXzf3Lpt3Ws+PvKM9D0rzvU/wDhItQ8PLpy+Dr6K4aGKCW4+dgyoIxlUxhWYQQ5OT9yq3hmz17QobmC68H399DM6SADfCysquvUA5UrIwI9+2KLBY9wuvit4Ksbua0uda2TwSNFIn2WY7WU4IyEx1FRf8Lg8Cf9B3/yUn/+Ir571Hw14o1LU7u+k0C+WS5meZlWBsAsxJA9uarf8Ib4l/6AWof9+Gp2HY90k8S6QvjVPEJu/wDiVfZ1l8/y3+6Y2GduN36Vs/8AC4PAn/Qd/wDJSf8A+Irx2X/hIpPDCaX/AMIdei6W2Fr9q+faUDZz5eMbscZz+Hpyn/CG+Jf+gFqH/fhqSQWPpO0+KvgvUL2Cytda8y4uJFiiT7LMNzMcAZKYHJHWub8KeLtC8KWNydavvsguJEEX7l33bYY8/dU46jrXjWmeG/FOlatZ6hFoF88lrOk6K0DYJVgwB9uK2PE9nr2vLbxWvg+/sYYneQqd8rMzBR1IGFARQBiiwWPU77xJpF94r07xDb3W/SljhlM/lOMKiX4Y7Su7jae3at4ePtJ1mF4tJs9Q1W3kg3PLbLHGFDF1x+9dDnKN2rxe2/4SK38LR6SfBt69zFBLbx3R8wDa5k5MeMFgJpQDnjd0OK2vBEmq+GdOKT6DfyO8SoVEEgKlZJW/ukHIcd6LCsep2nidrKzgtYvDOteXBGsaZe1zhRgZ/fe1Tf8ACYS/9CzrP/fdr/8AH65BPGMwnhjudFu7YSMq5lDKRudU4yoBwXHeuqoAl/4TCX/oWdZ/77tf/j9cT8UviKLfwlYQaPLNb3mqKJs7tssEQPfaeCWGOCejV2NVvC3hbQdR8O6Zf32j2N1dGAL5s8KyHAJx1FAHk1npXiz4xxSXkut2KrZlY/skjOoTj7+0KR82Dz6gjgACvRPhX8OrrwYdRu9UMD38xEMZibcoiHJIOAfmOOCP4RXoltZ2tlF5VrbQwR/3YkCj8hU1AHn2n6Pqdrplgt1ol7dmxuzK9vK1oPMUxug8vawDBSwP7whuT1IxStoGuNq6alFp9vbRRxpZraJIGZYPJYEBsgbRI/TGTsBr0Cik1ePKO+tzz6z8K6nHoVza3Vqkt089iysPLVTHGYywwP4lw+Sc7uMHsJX0fVY21VE028kzqEV5CN1sI3RJ0crGQwfcQP48DjqK7yiqv73N1/4b/IUfdioroedXfh3WtSm+1mwaCOV5HltpGhMpRp0baG3FVfapbIJ9Mg8j0WiiklaKiugre85dwooooGFFFFABRRRQAUUUUAFFFFAHP6l/yEJfw/kK4LRdd13WNbv4xdaNFZ2moS2vkGNzOyIeud+Acf7Nd7qX/IQl/D+QrkPD3hWDSr7Ub+6tLGS+uL6aeK5SMGRY3PCliAR34HHNdEenp/ka/Y0/rRjLfxhaw2SveuZ55Lm4jjisLaWVikchUkqAT8oxuPTPTtV3S/FWkayLc2Nw0guIJLiPMbLlEfYx5HHzdq5Oa3m8HXlldTX2kx3Er3wC3s7wxMkswlBEmwgMPlypHPODxVbwpomvDRdF1TTjYNI1pdQSC6LoNss/mLIoUHIwAdpxwRzSTdk/v+5/rYfU7GDxhpFzdWFtbvczS30C3MIjtnb90xwHYgYUZ65xUll4q0u/1EWUDz7nLLDK9u6RTlc7hG5G1iMHoexI6VmeGfC17o1xZPdS27rBo8Vg/lMxJdWJJGQPlwevX2qjoHgi60rUbDzo7eS3sHdo7hr+5kdgQwXEJIjjIDYJ+YdcAZ4rW6+f5/5Cu/y/L/PQ2PFGu3mlT6daWRsoZb13X7VfkiGPaM4OCMsewyOhq34Y1iXXdCivp4oo5C8kbGFi0b7HK70J6qcZHsaoeKvD91q9/pl3Dbaffw2hk82w1AkRSbgAGBCsNy44yp4Jq54U0e40PQxZ3LQ+YZpJfLgz5UIZiwjTIB2jOBwPwpRvd3B3ujSs7+21BJXtZfMWKV4XOCMOpww59DXN33iu6tfGcOnJFAdLWSK2uZjnek0quyAHOAPlQcj+MV0tn9t2S/bRb7/Nfy/Izjy8/LnP8WOvbNcNd/D27vrHVLmXUZE1i6u2u4fLupBbqysPK3LjBICqCdpPp0ou7r+uw5bOx1ieItNkWErMxM141ki7DnzV3bgR2xtJz0xzVOHxros8kyiW4RY4JLhZJLaREljj++yEjDY9qq2/hrUI/FcuoyT2osiGuIol3F0unjWNm5GNuFOO+WNc7D4D12adbi8+w/a/sFzbT3bXss0lxJIm1WIZAEUH+EZxk4FK8vw/G3+f4NAt12uvuv8A5fkdI/jzSZLC9nshdTSwWZvI4ntZE86PsyZUblyRkj61saFqg1rQ7PUvJkg+0RBzHIhUqcc9QDj0Pcc1iS+FruaW2LTQBI9Ek05yCc+Y2zkcfd+U+/tWxoFpeWfhyystQWFbmCBYX8hyyHaMAgkA8gZ6ce9V3/rq/wBLCTbtf+tF/wAExv8AhObS78QaRp2mlpIruaZJJpbaRUZURiWjcgK3zAAkZ/rWnp3inS9UvhaWzXAZ1LQyS27xxzgdTG7ABwM9j79K5+w8K64k2h2t2+n/ANn6Q0yLJFI/mzI0bIp2lcKQCM8nPJz2J4a8FXWkahpzXUVs8Wno6x3H2+5leQkbVIiYiOP5ScgbvbFCvfUHfoa2sa/eWvivSdEs41H2qN55ppLeSQBFIG0FSACcn5iSBxkcim2PjKwGj2lzqd3Cks1pJdGSKN1iZUOG27hnI44PNXrvSp5/FNhqivGILe0ngdSTuLO0ZGOMY+Q559K5G68Aapf6BpGkXF1Zxx6bC8sciEuWusnYSCv+rAJz6ntxS1t/XmPW/wDXkdVfeLNM08Q+cLtjJCJ2WG0kkMMZ/jkCg7BwevofQ1Lb+JdNu9afSbZ5prmNVd2jgdo0Vl3KS4G0ZHTnmuc1nwlquo6j/aXl2ktzcWKW9xEdRubeOORc/MPLAMi/MflOOnUZNbXhzw9JoV5qDZh+zzLbpCkRb5RHEEIO7JHI45PHU1S63Fd/1/Xr/W8l5rpsvFC2E5hjsRp0t5LK+QVKOo65xjDHtU+k+IrHWZpIbdbqKZFD+XdWzwsyE4DqHAyvuKzPEHhabXNTuJfPjit5tJmsScneruykNjoQNvrUXhjw1daZqjX17bW0ci2wt1ZNQubpmyQWOZSAinavygE+9KN9L+f5u36Dl5f1t/wS9q3jLRtFvZrW9kuBJBGksxjtpJFjRiQGZlBAHHehPGeiNb3kxnmjFps8xZLeRXYOcIVUjLBjwMA5qpq3hq8v5PEzRSwAarYR2sG5j8rKJAS3HA+cdM96ra14Rv8AUL65u7ea2WTyLP7OJC2DLBK74bA4U7gMjJ68VPvCd+hqr4x0c2FzdySXEP2aVYZYJbaRZg7Y2L5eNxLZGMDmqei+MoNS1G8glDRJ9vFnaBoHjdm8kSMHVuQQQ/YdB+NGXwtrV1c3+sSNYx6nLdW08FssjPCqwgjaz7ASW3Nzt4461G3hfxF9sk1UHTPt/wDaq36QebJ5ZTyPJKF9mc8k5xzjt0ou76/1t/wQd+n9b/8AANmbxQj63plnZFHhnvLi0uWdSCjRRsx29O4681Z07xTpeqXwtLZrgM6loZJbd445wOpjdgA4Gex9+lYOn+ENUS7s7i+msyyajd3c4gZ/uzRsoC5HUE96b4a8FXWkahpzXUVs8Wno6x3H2+5leQkbVIiYiOP5ScgbvbFON76/1oDfbz/PT8DotV8S2GkXkNnMt3NcyoZRFa2zzMsYOC5Cg4GSKfN4i02BNQeSV1Fhbrc3GY2BWNgSDjGc4U8deKyPGXhy810wGztLNpokfybtruS2ntpD0ZHRWyOuVPtWZqXhTxNLDqUNvd6dcHU9Lhs7m4uWdGEiKwLBVUght3qMehxgpt2ff/h/6/rR9TqbPxHp9/q82l232iS4gAMpFu/lplQwBfG3JBHGc1Xv/EI07xKLO5aGKwXTZb2WZgdylHVfXphj2zT9A0e40q71WWd4mW8uElj2EkgLDGhzkDnKH8MVn+JfClxr+ozyrcRwwyaZJaA5bcJDIjqcD+H5eec03dNW8/yf62FG7Wv9amxpOvWWsvNHbrcxTRAM8N1bvC+052ttcAlTg8+1ddo//Ho//XQ/yFeeeGPDtxpmo3F9d2tvDI8Kwrsv7i7cgEk5aUgAZxhQvrya9D0f/j0f/rof5ClP4SW3bU0KKKKwICiiigAooooAKKKKACiiigDy/S9T8Q6hpNpeyeJb9HniWRlSC22gkZwMwk4+pq552u/9DRqX/fi1/wDjNZ/hsf8AFM6Zx/y7R/8AoNamKYiPzte/6GjUv+/Fr/8AGaPO13/oaNS/78Wv/wAZqTFGKAI/O17/AKGjUv8Avxa//GaPO13/AKGjUv8Avxa//GakxRigCPzte/6GjUv+/Fr/APGaPO13/oaNS/78Wv8A8ZqTFGKAI/O17/oaNS/78Wv/AMZo87Xf+ho1L/vxa/8AxmpMUYoAj87Xv+ho1L/vxa//ABmjztd/6GjUv+/Fr/8AGakxRigCPzte/wCho1L/AL8Wv/xmjztd/wCho1L/AL8Wv/xmpMUYoAj87Xv+ho1L/vxa/wDxmo5/7ZubeWCbxLqLxSKUdTBa8gjBH+pqxijFAHMr4NVFCrr2tALwAJ04/wDHKX/hDgP+Y/rf/f8AT/4iulxRigDn7Xwu1jIZLbXNVjcrtZgYcsMluT5fPJPP+Rb/ALKvv+hk1f8AOH/41WrijFAGV/ZV/wD9DJq/5w//ABqj+yr7/oZNX/OH/wCNVq4oxQBlf2Vf/wDQyav+cP8A8ao/sq+/6GTV/wA4f/jVauKMUAZX9lX/AP0Mmr/nD/8AGqP7Kvv+hk1f84f/AI1WrijFAGV/ZV//ANDJq/5w/wDxqj+yr7/oZNX/ADh/+NVq4oxQBlf2Vf8A/Qyav+cP/wAao/sq+/6GTV/zh/8AjVauKMUAYN34Ze+x9q13VZdoIG4w8cg8fuuuVU59qg/4Q4D/AJj+t/8Af9P/AIiulxRigDmv+EOA/wCY/rf/AH/T/wCIrZsoNV02yhs7TxHqMVvCuxEENscD6mHJq5ijFAEfna9/0NGpf9+LX/4zR52u/wDQ0al/34tf/jNSYoxQBH52vf8AQ0al/wB+LX/4zR52u/8AQ0al/wB+LX/4zUmKMUAR+dr3/Q0al/34tf8A4zR52u/9DRqX/fi1/wDjNSYoxQBH52vf9DRqX/fi1/8AjNHna7/0NGpf9+LX/wCM1JijFAEfna9/0NGpf9+LX/4zWp4Uv9Tk12+sr7U576JLaKVDNHEpVizg42IuR8o65rPxVrwr/wAjdqH/AF4Q/wDoySkB21FFFAwooooAKKKKACiiigDn9S/5CEv4fyFcfb+LXurW/uYND1GSG0na3Vk8smeRZNh2jdkKDyWbAAz6V2Gpf8hCX8P5CuJu/Brz+G5NJS/TL373pMsG6Nw0pk8t03DcvODyM4/Ct1eyt/W3/BNVsiO38eWmoWypb6Zc3N6121p9jieJzvVd7Hfv2bQMc568VU8P+KL6+uNON3NcqbibUAbY26ZKxPhFYjoyjjjOT1NS2nga9sZmvbbVrSLUPtjXKNHYbYFVoxGY/L8zOMKDncORT4PAksUMCtrMhmjF7mZIdjFrg53D5uCp/P2pLm38vx0BX0v3/Aa3j3z7fVYIdLuLfU7Swa8jt53iLFf9oBjsI4JVsHFT23jG4/snSmk0i4n1O8tRcPbxSRLtQYBfczhcHIwM5+mDVXSvAD2Nw7z3tl5baY+nCKzsPIGGIJkY723Nxz0606fwE9xa6UZ7jTbq8sbU2he800TRSR8bT5Zf5WGOobHJ454p36f18X/AuGv9fL/gmnB4y0+6t7u4gjmeK305dQLYA3I2/wCXGfvDyyDTtG8UDW9SntbbTLtYYFQy3TlBGC0auqgbtxOGHbArKufAt1seOw1mO0juNOFhcqLFMOBuIZApVUPztwBjn8avWPh++0G0uV0+5E811dWzMxQL5carHG/UnPyox/HHvTV7u/8AWr/SwtdPx+5frc2L/VItPvNPt5Y3IvZjAki42owRmGfrtI+tYX/CcxzsUsNIvr11SSZ1jMa7YUdk3/MwzuKkgDkgdq1/EOjya3pLWkF41ncrIksNyqBzE6sCDtJGemMe9Y83g25tmhfRdUSyddOGnSmW284Mg+64+dcOMt1yOelS+bW39af5lf1+P+RZXxrp0thqN7DHNJBY2Md+WAA3xurMAOeuFPWm2/jFLzxFJpFpptxM0JQTyCWJTHuUMG2M4cqAwywH0zWZc/D2cWlxY6ZrZtLO606KwnWS1ErkRhgGDbhjIY5GPXGO1rVPBc+q6rZXM1/aiOzmilhdbLFygTGUEocfKTngqetPXm8ha28zZ1jXRpVxaWsVhc315dbjHBb7AdqgFmJdgABkd+SRXN6J42uZtDsnlsbq/wBRuWuJDCvlRNHEkzIN25lUEDAwMkkH3NdBrOjXV9f2OoadfpZ3loJEDSweajxuBuUruU9VUg57Vz3/AArhEtbIG6sbu6tlmRpNQ05Z45FkkMmdm4YYE8EHHJ454T5hvyNOPx1p01hd3cUNw6wxQSogA3TCY7UCjPXcCpz0INInjWN7W7uTpN6sMNybOJiY/wDSJhIU2oN3TI+82B19KT/hCkF7o0yXqpDYxqlxAlqiLdFDuQ4XATa+WwB3pbjwXDc+HJdJluI5GN899HJJbh0VmlMgVkJwy/MVPIyM9Kbv/Xqv0uJX/r0/zEm8bLBo95fPpF15tg+29tvOh3QDbuDbt+1gQRjaSc8Yq/qPiSLSvCZ8QXdncpGsSSNb4HmruIABGcZG71rEk8CXDacttDe6ZbZvEupYrfSVjgkCD5UKK4YgN82Sxyfbirnjexvr3wDd2WTcXknlKzWsJGT5q5KpliMDnqelGv5Djur7f8Erap4uuTZyRRWtzpmoQ3dmHiuBG5aGWYLkFSy8gMOuQRUkHi1oY54hFc6levqFzBDAoihIWM88lgu1QQMk5ORxSv4Ou70zz6jqyTXkslqfNjtdirHBJ5gXbvPJJbJz36cVDdfD+G4xKZrOa4S9uLpBe2QniKzdUZCwzjAIYEdKWuv9dv8Agi1/r0f/AAC7b+NIb68sLWx028uJbpHdwDGv2cJII5N+W/hb+7nPbNTa54rj0bVrPS47Ca7u7pGkREljiBUEAgGRlDNz90c0zRvCg0jULO7FzCxt7SW2aOG0SBGLyK5YKnCgbcYwT6knqvivw1P4ltha/aLFbZo2V47uy8/ax6SIwdSrAZ796evKu+v62/QfcZqXjODTrmZDp13LDaIr30ytGBbBhuwQWyxA5IUHA9adZ+L49Q8R3Ok2mnTyrbSCOacSxDYSAd2wtv2c/exz2zWVP8OIWn8yO4spTJDDFNLf6al1NmNQu9GY4UsAM5DDIzirmoeDZtS8RWepTX1qqWdwk0LR2Wy5VVH+q80OAUPPBXvj3pq/N5Cd7Euva7qGl+KtJs7SzuL6K5trhmtoPLBZlMe1izkYABbv3HBotfG9vf3tpb2em3kvn232mWQ7FW2QOUbfluqlSCBnpVnWtBvr/WtP1XT9TSzuLOKWILJb+akgk2/eG5Tgbe3fHpgwaN4Pj0m585rxrgNYm1lDR7S7NI0jv14yXPGOPWlrb7/1t+gd/l+l/wBSvH8QLIRRXN7p95Z2VxbyXNpcSbGE6Iu44VWJBK8gEciquv8Ai/U7bw9qE66NqWmXMCRSxSSxxyrIjSqpAKll34J+U880f8K9kurS1sNS1f7RY2NtLbWaRW/luoddoZ23EMyrwMAetXbvwzrWq2Fxaap4gikjdIkRILERqCkgcu2XJLHbjggDPQ07Ar9Qj8c2/lXi3Olaha3lu8KLaTKgeUynEe07tvODnJ4wc1Fc/EC1tLINPp88d99pW1a0kmiXY5TeCZC+zaV6HPJ4xmp9c8Fw63dXtxLcR5nS38tJLcSIjQs7AsCcOp3kEccZ59IovB09vpM9pDLoyG4mEk0K6Oi2zoFwEMYYMeedxcnPtxS11/rt/wAENbnQRamo0dtSvbeSyRI2kljmKsyAZJ5UkHgZ4Nc+fHtvBaXM97pd5a+XateQo7Rs08QIBI2sdrDcvytg8/XF7RvCsGmeEG8PTztcQOkqOQCoCuSSqgkkAZwMk1iRfDkJpt5Zm502LzrM2iS2mkxwuckZeRgxLNwOAVHt0wO93b+t/wDgDWy/r+up0OkeIhqmpXWny6dd2NzbxpNsuNh3xvkKw2Me6ng9K7XR/wDj0f8A66H+QrkINH8jxJc6v5+7zrSK28rZjGxnbdnPff0x2rr9H/49H/66H+QpT+Eh3tqaFFFFYEBRRRQAUUUUAFFFFABRRRQB5X4bH/FM6Zx/y7R/+g1PDezXSNJa6VqM8Qd0EsUGVJVipxz6gioPDY/4pnTOP+XaP/0Guw8CceE4f+vq7/8ASiSgRzXm33/QC1X/AMB//r0yS9lt2i+1aZqFskkgjEksGFDHoM+9emVzHjsf8SS1OOBf2+f++xQM5ye7MV1HaxWtzc3EiNII7ePcQqkAn82A/Gl82+/6AWq/+A//ANerugD/AIrqHjpps+fxlh/wrvKBHmsN2ZLuS1ltLm1nRBJ5c8e0lSSAR+KmmpeyzvMLXTL+5SKQxtJDBldw6gGtHxGMeN8+umpn8JH/AMTWn4E/5BV//wBhCb+YoA57zb7/AKAWq/8AgP8A/XpiajA2nzXrLJHHD5gkV0wyGMsrgj1BUj8K9MryLUCU0DxKR/DPqJHH/TWU0Aaa3F66K6aHqpVhkEW/b86ZcX09pbvcXOkanDBGN0kj2/CD1PPSvSLZQlrCo6BFA/Ksbxt/yJOs+1o5/SgZyl1dC1aBBBNNLPJ5UUUCbmZtrMcD/dVj+FHm33/QC1X/AMB//r1Lbj/iq/Dwx0u5T+P2aYf1r0SgR5oLx1u4ra4sLy0klVmj8+LaG24yAfxFDXjtdy21tYXl1JEqmT7PDuCbs4GePStnxmP+J3oR7YuB+O1f8DR4MH/E7109sW4/Ha3+IoAyPNvv+gFqv/gP/wDXpbW6Fy06GGaCWCTy5Ypk2srbQw4/3WU/jXpFed3HHivxEPW6iP8A5LQ/4UAVYb+e5txc22j6nNAwJWSO3yGHqKe1xeIhdtD1UKAST9n6D866Hw8l03wytUsDtvG08+QQQMSFTt6+9dBMsh0mRZOZfIIb67eaBnn0moQJp0d8od4pdnlhEyzbyAoA9SWFO82+/wCgFqv/AID/AP16zLTDeHdA9Gn04fgZohXrlAHmcl7LA8QutMv7ZJZBGsk0GF3HOBn8KdNdmO7S1htLm5ndGk2W8W4hQQCT+JFdF47H/EqsT2GoQ/zNZnh4f8VwOOmmyZ/7+x/4UCKPm33/AEAtV/8AAf8A+vSQ3Zku5LWW1ubWeNFkMc8e0lWLAEfip/KvSq4TxAMeOZD66bDn8JJf8aAM5L2Wd5ha6ZqFysUhjaSGDK7h1ANP82+/6AWq/wDgP/8AXrofAo/4k94e51CfP/fWP6V1FAzzMalAdMlv2EkcMIkMgZCGTYSGGPUFT+VKbi9CF/7C1bbjORbdvzrLvvl8K+IM8YfUQc9sSy16tIZY9NcwqTMsJ2Lj+IDgfnQI84k1GWC1F3PpOpQ22ATK9vhVB6E9+4qe5uxbSQRLBPPNOxSOKBNzEhSx/QGt/wATPcTfDi4kulK3LWsbzKRjDZUtx25zWNZj/ir9BwOksxP/AH5cf4UAQ+bff9ALVf8AwH/+vTVvGF5Ha3FjeWksiM8Yni2hwpAOD7bl/OvS64zxiP8AiotDPfyLof8Aor/CgZjm8drqa3ttPvbp4QvmG3h3Bc8gZ47U7zb7/oBar/4D/wD162fBY/4muvHt5kI/HZXYUAeb2t0tz5y+TLDJDJ5ckcqbWVsBsY+jA1Fb3093bpcW2j6nLBINySJb8MPUc1YmGPE/iIDoL5P1toT/AFrp/BX/ACJGie9lET+KigRyUlzeRRtI+h6qqKCzH7P0A/GiXUIY7KK7VZJEmMaxLGmWcuQFAHqSRXoOpgtpV4AMkwOB/wB8mvMLX5tK8O4HW6sMf9/Iz/SgDQ82+/6AWq/+A/8A9ejzb7/oBar/AOA//wBevSaKBnm1vd+fNPA9tcW88O3fHPHtYAjIrT8K/wDI3ah/14Q/+jJKqal/yOesf7lv/wCgGrfhX/kbtQ/68If/AEZJQI7aiiigYUUUUAFFFFABRRRQBz+pf8hCX8P5CvJdJn1Cx1G8+zzWn9o6trk9p9sktixjSMM3Pz/NwoCjIA56161qX/IQl/D+QrnLrw3o0tlLFNAUiNy16ZFndGSU8lw4YFT16ECt0tn5fqv0TNd4pL+tH+rRzEXibXrye00qG4sI77+07iwnujbsyMI4/MDqm/g4wCN3XNJL4g8UGWW4t7jTPsq6wdMWKS3ctgttDlg/Y/w45Heuo0/w/osENjLZQKyW7vcW8qzM+WkBDOWJO8kMeTnrUw0HTBGYxbfKbv7aR5jf67du3dfXt09qdndX8v0v+v3g9Vp/W/8AwPuOOn8X6zbxHTZWi+3jUZbM3dvYSTgokYk3CFSTuO4DGcDBNdHo+t3k/hi41HULOWO4tvNyr27wecEyQ4R/mUMMcHvmrVx4Z0m5WUPburS3P2syRzOjrLtC7lZWBU7Rjgjj6mrVhpdlplh9itIAlvliVZi5YscsWLEliSTkkkmlaXLa+tvxstfvuP7S7HndzrOsafqmn69qklldEaHdXcUVtE0e0nymKElm3D7vPHeui8La7q99qclrfxzzQNB56XJ0uazVGyAY/wB4Tu4III9DmtCz8GaDYS+ZDZMSIXtwJZ5JFWJsZQKzEBeOmMDt1qWx0XRfDsv2iImKSUJbJJdXTyHGfljUyMcDJ4UVUVZ+X/D/APAJs7f15f8ABG3NjrM2vpcJeRJpweLMQdg21Q5boMZLGMf7qn6VT8FGRvD13tOX/tC9Clj3898V09Y1n4V0nT743lrHcxymR5SovZjGWYksfLL7eSSelK2v3/p/kU+4aBo95pay/bNRnvGZIo1MsrPjavzNyfvMxY8dto7VD4v1a+0fR4ZtPMAuJbuG3UzoWQB3CkkAg9/WtPVLEanplxYtJ5aTrsdtuflPUfiMj8azvFehN4h0qCxURmMXcMsquxUNGrgsARznGcfzold2t3X56hsn6GNB4k1e316HRrx7WeVdSW2knihMYkja3aUYUsdrArjqeKgk1q41DU9NM1vbySQ6/c2sJ+ZdoSKTaeD17HORz0rffwboUlh9je0kZPPFz5huZTL5oGA/mbt+ccdenFLZ+HfD1pLFZWsESy2spvFhE7FkZwyFyC2cEbhzx19KLP8Ar5f5MTvb+vP/ADX3GP4R8RapfatNp2uzpBqCxGRtPexaFlwcbo5N7LInbPX6VU8b3+r3mn+KLOzms4bGw0/98ssLPJNvRicMGAXCjjg811Gm+F9K0m7W6tYpzMkZijaa6lm8tCQSqB2IUcDp6U3VfCei63cST39q8jyxeTLsnkjEiDOAwVgGxk4z07UpRbjYa0bOUuPF+rxX1xFp9vNLFpxiiNrFpc05uMojN+9U7YzhuAQemTwa6XxNqepWUmj2+mPbxzX959nZ7iMuqL5btnAIyfl9amuvCejXl39pmtXLHZvRZ5Fjl2fc3oG2vjA+8D0rQutPtb2a0luIt72kvnQHcRsfaVzweeGI59arf7yUmkcVZ+Jde1C7ttFW4sob43V3DLefZyyFYCuNse8YJ3DucYNWvD/iy/1TUILa4S3H+h3TytGpw0kM4j3Lk8KRk45+ta03hzw/dTvbbNt1HM16fJunjmjeTIL5VgyhsEY6HHtSS+CfD01vZ250/bFZxtFCsc0ifIxyysQw3gnk7s55z1NTZ6P+trX+TK6v1/C/+Rz1t4z1dtFSeVLU3V7plvcWICkBp3fy2UjPIDPGfxp0/i7WRrd0lrBNPBZ3a2rW0WlzSGUfLvfzh8qEbiQMdAM9a6ceFtFA0ofYVP8AZPFll2PlcY9eeg65qPUPD+hfapNVvkEeHSaYvcukLMuNrum4IxGByR2HoKet7/1v/wAOiWna39bf0znZPF+qR+LLa3R4bnTZ79rJvKtHCR8Nj98zAM+V5CqQORnNXdL8T395aeFJJRDu1WSVbjapGAqOw288cqPWtOPwbocd9HeJbz74rg3UaG7lMSSkkllj3bQTk9u9N0/wd4dsb6G/srPbNBI7wsJ5GWItkMFUttUHJ4Ax+Qoiny2f9f1qN3u30/4f/gGT4s1M6L4ottTEfmm10a9lCf3iGiOKq23iTxVLbX0dtZyX1x9mE8EsmlTWiK24Bo8SNhztOVwRnBzXZ3Wk2F7drc3NsssqwyW4LEkeW+NykdDnaOorPh8HaJDDPEtvOwmiWFmku5XdUU5VVZmJQA84Uikov+vn/wAAb3v/AF0/4JB4O1uTWdPnNxei4uYJdkqPZNaywnAO10LNz7g4rFsvFGvPL9unksG0/wDtp9MNskDCXb5hRX37yMg4yNvTNdTpGm6VpVxdwWLlrpystyZblppjkYUsXYtjCnHbg4rI0DwTZ6dcy317EJL03890hSeQxje7FWKEhd4VsZxn3qvtL+uqv+pLTtb+uv8AwDl9K1VdIsNFu2tlmMMerzZydw2SE4GDjnHcGrR8Z+ILfSb67eFpwLBrqOZ9KmtooZAVxHlziQEMcEEH5T68dnH4e0azSBxaoiWgmKF5GKoJTmTOTgg+/Ttiqlt4Q8OPZOIbdp7a5txCpa7klUQnBCxksdq9DhcDgVNnt5f5/wBfIp7/AD/y/r5k97qF7oXhK81G/eG8urWB5m8mIxIxAJAAyxA6DOfeuRl8Y+IrTTL6QxG4dYY5YbmfSp7SJHaVEMZ3n5uHyCDng16LNBFcW8lvNGskMilHRhkMpGCDWA3hTw3ZW7x3ER2XHlwA3N5I5IVgyRqzsSBuAwoIzVfav0/r/gC1shdB1HVX17VdJ1SW1na1SGaOa3haIESbvlKlm6Feue9d7o//AB6P/wBdD/IVzMFjZx6jc38KD7VOqRTOHJyEztGM4GNx/Oum0f8A49H/AOuh/kKifwilsaFFFFYmYUUUUAFFFFABRRRQAUUUUAeV+Gx/xTOmcf8ALtH/AOg12HgTjwnD/wBfV3/6USVx/hsf8UzpnH/LtH/6DXYeBOPCcP8A19Xf/pRJQHU6SuZ8d/8AIAhPYX1r/wCjVFdNXNeO/wDkW1PYX1pn/wACIxQBk+Hh/wAVwD6abJn/AL+x/wCFd3XC+HB/xWzkDppzZ9syL/ga7qgDhvEox40hI76dz+Eh/wATWl4F/wCQNd/9hC4/9DrO8TjHjG1Prp75/CQf41peBf8AkBXH/X/c/wDo1qAOmryDVvk8P+Ksfwzagef96Q16/XkGsjGieK09Zr0Z+pb/ABoEz11FCIqDoowKxPGv/Ija7/14Tf8AoBrdrD8af8iL4g/7Btwf/IbUDOYtR/xV2gcdJ5j/AOQJB/WvQ688shnxhofHR5j+PlMP616HQBx/jUf8TTQj28yYf+Q//rUeCx/xNdePbzIR+Oyl8aj/AE/QT28+Uf8AkJv8KPBQ/wCJhrx7efEP/IS0AdfXnl2MeLtf954T/wCQIx/SvQ688vRjxhrvHV4T/wCQlH9KANPTZHh+EEUsTtHIujF1ZTgq3lE5B7HNdNFvl0tM5Z2hHfkkrXP6JcJZ/CnT7qSBZ0i0WOV4n+7JiEMVPseldNbuJLaJwoUMgIUduOlAHkum4bw74Zx91p9NP/kWI/0r16vINHGfD3hVSP8Altp4P1DJ/UV6/QBy/jv/AJAtpx/y/wBv/wCh1m+Gx/xW74HTTmz+Mi/4GtTx1/yAYP8Ar+tv/Rq1m+GR/wAVnc+2njP/AH8P+FAHcVwniMY8b59dNTP4SP8A4mu7rhvEox40iP8Ae07n8JD/AImgDT8Cj/iRXB7m/uc/9/CP6V01c14FH/FOyHub67z+E7j+ldLQB4/qvHhbxOO/nan+s01esX8jw6ddSxna6ROyn0IBxXk+rDHh/wATDv8Aab//ANGyGvWrxo0sp3mUvEsbF1HcY5FAjmNemluvhdNcTMXlk09JJGI6kqpJ/nWVYDPjHRcDoZyfp5ZH9RWz4heCX4ZXslrGYrc6bvjQ9UTZkD8BWPpo/wCKz0jA6JcH/wAdFAz0GuN8Zf8AId0I99lyP0T/AArsq47xoP8Aib6E3fM6/hsB/oKAHeCh/wATDXj28+Ifj5S119cj4J/4+9eP/T3GP/IKV11AHndxx4r8RD1u4j/5LQj+ldR4LGPAvh/3063J+pjU1y18SninxER186Js/wDbvGP6V1fg9QvgnQVHQadbj/yGtAGnegtY3AHUxMB+VeWadhtK8Mbec3FiR/30p/pXq8wLQSADJKkAfhXk2j4bSvCe0ZzNZEfkD/IUAeuUUUUAefal/wAjnrH+5b/+gGrfhX/kbtQ/68If/RklVNS/5HPWP9y3/wDQDVvwr/yN2of9eEP/AKMkoEdtRRRQMKKKKACiiigAooooA5/Uv+QhL+H8hXGX+gzQyanqcuoNMjRXEggMWApaNUXBz/CqMPfeeldnqX/IQl/D+QrGt76C+gnEsLxIsskDLcqF37eCQM8qRyPatpR5oW8jeLtZmJolnBrPw50vTXmXZNp0CShTklNi7h17jI/GtfTtLi0bTriKA5aSWW4d9oGWdi36ZAHsBSafo2habcebpum6dazPH9+2gRGZM+qjJGQKvNJFLHIglT7vOGHAPetKj5m5LdiirWTPJrfxVrtl4U03WU1uTUrq9srlpbeSOPbC0aFg6hVB+UgA5Jzmr+pa7qehahHaRa9Pe28sFpdSTziPMO+4RG5VQArKzcHpjiul0DRtI8Nx6fpsVjDPdPbGGbUIbZFDhAuRI2cjORgHPStODRvDttZ3Ntb6dpkVtMB58ccMao47bgBg+2aX2r/11/r5EJPls/62OR1TXdSu/EN3p9hrDwQnVrS1WSBUYxo0LM6jIIzkd84NbXjFGg0nRYzI8zJqtmN743ORIOTgAZNaU9noWiQROmlWseZoxElvaruMn3VIAHUAnnsM8gVqT20FyqC4gjlCOJFEiBtrA5DDPQg9DQlt6p/db+vmXrfXt/n/AF8jzfRNd8RXlxY3rTXEa35mSQXk1qLeMqrkeUit5uUYAEHJxuzWn4K1PUBqkul63dahJqLWwuB5rxS20ybseZC6KCAePlPQEV1kWiaVBfS30OmWcd3KCJJ0gUO+euWxk5pNP0PSdJeR9N0yzs2k4c28Cxlh6HApRVt/6/r+ugmrnG3Wq6rpfjMyaje3r6bPeLb2rWTwvArMOIZkK71bP8QPcdKyX8R6zb6DpurrrU011qkN2ZbVlj2QFIpGBQBcjYygHJOc816OdC0g6n/aZ0uyN/nP2nyF8zOMZ3YznHFLBoek2t7LeW+l2UV1MCJZkgVXfPJyQMnPf1pcr5bX/r+v6uUviucPqvi69hjhNjqUTN/YJupCNrhJC8aiUj2DMfTis7ULzUND8RaoLXVbrUZpYLCA3P7jzYleWTIBwqZOeCw43jOa9HtfD+i2KsLTSLCAMjIwitkXKtjcDgdDgZHsKSDw9ottby28GkWEUMyeXLGlsgV1yThhjkZJ4PqaJRbaf9bvT8bEJNK1/wCtNThbe/8AENxqtjok2pX1nG988RlaW1lutgty5V9m5VO4cEgHBFdH4z/toWliuj3EmfNPnwQTRxXE6Bf+WbOpGR1IxyB1Fbdro2l2KQpaabaQLAxeIRQKvlsRglcDgkcE0/UNK0/VoVh1GxtryJW3KlxErgH1AI4NNrQaVjiNL8XrczNINVm+yDRGuFN6qRyeasjqxYAAZGADjjipfA19qut30l1fatcPFb2toRbBUCO8kCszMduTyc4BArrJfD+jTJbJLpFg62o226tbIREPRRj5R9Ks2thZ2IYWlpBbhgqt5UYTIUYUceg4HoKpaX/rq/8AP8As7/12X+X4nn/ifU7zS/FmqSWPmiWa30+AvFs3orzSgld/ygnoCeASKa914rm024s7e5nEtveqgjlvbVb2aMx5Me5QyK4PzcgEr+degz6dY3JnM9lbymeMRTGSJW8xBnCtkcgZPB9TVU+HNDbTxp50fTzZK+8W/wBmTyw397bjGfeoUWk1/W9wa1v/AFsYC69JN8L7/VrG7vDcwWs+2W8jRZkkTcMMFG3II9O1c5qerajbaFexnWDqsdxoi3xeeKJhFJvUcBVA2sCcBgfu16BqWhW934YvNDs1isoJ7d4EEUQCx7gRkKMDvnHFLaeHdIs7KW1j0uxWOdQLhVt0AmI7sMc/jVdW/wCuv/AYrPT+uqOSi1HVbLxiseq6hfNZXl01vZy2ckL22SDiJ0270cY65OT7ZrI0y61HSvCdla2V3qEzX2s3FvI0bQiWMB5ThC4ChmKgkt6nGOBXpCaDo8epHUk0qyW+JJ+0i3USZIwTuxnOOKG0LSHt7m3bS7JobqTzZ4zApWV/7zDHJ9zUqLsv67Dtr/Xmeez6j4plsEb7TdtBZzzrNDa3dqb5412kOdoZGKZZSg2k8Z611Gq67IPh9Fq2nXjgzxwbbyaNdyK7KpkZcbcgEnpjI9K1pfDWgz2sFrNounSW8GfJia1QrHnk7RjAz3xV5rS2ezNm1vE1qU8swlBs24xt29MY7VVnZoaWtzzBb250Tx3cxDXJLpJLvT4JZ5/LDbGSY7GKqB1wc4B5Fdn4a1aXU5tfY3AuYrbUXhgKkEBRGh2gj/aLVeXw1oSWkloui6ctvIFEkQtUCvtJIyMc4JJH1q5Z2Fnp8bR2VpBbRsdzLDGEBOAM4A9AB+AoStf5/p/l+Invf0/X/P8AA4exur240S11m68UN519bzM+nTRxGNmCMfLjGAwKHrktnac1S0nVdXawubyO+m2aboNrdRWUUcYjlleFydwC5xlRwpArvI/D+jQ3st5FpNil1MGEky26B33feycZOe/rVm3sLO0JNtaQQkosZ8uMLlFGFXgdACcDtmp5XZ/L9f8AMpWv/Xl/kcFqt7e6Hohvo/GL3Us1vDN5M6w5wZYw0iFQMJgkYwRz14pdb12abxPPaQXcU1tBfaYqptRwjPI2/scEgL7jtiuwt/Deh2iXCW+jafClyuyZY7ZFEi+jADke1Pg0DRrVAlvpNjEoZGAjt0XBUkqeB1BJI9Mmqtqn2d/x2JSsmjnvAVq1vP4jLXtxOf7WmUpKVIUjB3cAHJyPbgYA7+m6P/x6P/10P8hXOQWFnbXVxdQWkEVxcEGaVIwGkx03EcnHvXR6P/x6P/10P8hUT0gl2SFLq+7NCiiisTMKKKKACiiigAooooAKKKKAPK/DY/4pnTOP+XaP/wBBrsPAnHhOH/r6u/8A0okrj/DY/wCKZ0zj/l2j/wDQa7DwJx4Th/6+rv8A9KJKA6nSVzfjv/kVXPpeWZP/AIFRV0lc347/AORSn9rm1P8A5MR0AZfhkf8AFZ3Ptp4z/wB/D/hXcVxHhcf8VjecdLCPP/fxv8K7egDiPFIx4vsD3NhLn8JE/wAa0vAo/wCKdkOOTfXef+/7j+lZ3ivjxbpnvY3GfweL/GtLwKP+KZz6315+lzIP6UAdJXkWtrjTfFKdzc3Iz/vf/rr12vJNcX/RvE69zeSj8wuP50Az1usXxgA3gnXgeh064B/79tW1WR4rXf4P1tT3sJx/5DagDk9L+fxdohPXZO34+Xj+teh153onz+K9EJH/AC7ztx67VH9a9EoA5Hxv/wAfWgnH/L3IM/8AbGT/AAo8E/8AH3rx/wCnuMf+QUpfHH+t0A9vt7j/AMl5qPA/+u189vt6j8fs8VAHW155qnyeLtbK9dkDfj5eP6CvQ6871s7PFWtkdfs8Lfjtb/CgTN3R7ptN+FthdxortbaLHIqv0JWEEA+3FdHBIZreKUjBdAxA7ZFeW+IvE8ui+EPB+gwwkprNpDbTS5wyRFERtuQRuO/qfQ8c5HVeDvEM2qX+u6RMmf7GuRbpMeDKnONwAAyNp6dfQUDON0Yf8SfwupH/AC82gPsQw/qK9eryPRVzY+GEP/P5Bn8CT/MV65QBzPjv/kXE/wCv60/9HpWd4XH/ABWN6cdLCPP/AH8f/CtPx3/yKxPpe2X/AKVRVm+FR/xV2o8dLGDPt+8l/wAKAO2rh/E4x4xtT66e+fwkH+NdxXEeKRjxfYn1sJf0kT/GgDT8Cj/imM9zfXmfwuZR/Sukrm/An/IqRn1u7sn8bmU10lAHkOrDGkeJBjn7Zd/+jGr1i7kWGynldA6JGzMh/iAHSvKdXH+heIgR/wAv82c+7j+ldB8U/F8/hXRbWO2hEkmoSNCWJwUTHJHB55HUUAaniCWO4+F2oTwwiGKTSHdYl6RqYs46dAP5VkaUM+NdLwOkFwT7fcqrPrEsmheO/DGxni0XTDHDOxG90a3bAYAAZGDyOo96taPg+NdNI/59Lk/hmKgDv64/xqP+JloJ7+bMP/IZ/wAK7CuQ8bD/AE3QW7/aZR/5Bc/0oAd4HH77Xz2+3qPx+zxf4iutrk/A3/MfPY6mP/SaCusoA841UlPE3iMjrmJv/ICj+ldh4VUJ4Q0RR0FhAB/37WuN1zMfiPxGe/lRMP8Av1j+ldr4bUJ4W0hR0FlCB/3wKANSvI/D4/4lng4Y5ElqPyjOf5V65Xknh4f6J4RGORPCMfSN8/yoA9booooA8+1L/kc9Y/3Lf/0A1b8K/wDI3ah/14Q/+jJKqal/yOesf7lv/wCgGrfhX/kbtQ/68If/AEZJQI7aiiigYUUUUAFFFFABRRRQBz+pf8hCX8P5CvK4dAkvtRsoNQ0qSaz/ALfvp5EmgJQoUfYzAjG0nGCeDXqmpf8AIQl/D+QqpXQlp/Xk/wBDW14pf1s1+p5jpvhoab/Y9xb6S8E8erXiSSLCQy22JwgJxkR/cxnjkY61gaDpq3PhPTTpOiXMF6mmXf22cWjKLhXiYIu/GJCzFCAMkY7V7YyhlKnoRg1X0+wttL0+3sbOPy7a3QRxpuJ2qOgyeTS5dGu/+VgStNSXT/M4gaD/AGfJ4bTT9LaGOPTbrzhFAQBI0SD58D7xI78nFUdJ8FWAk8PLPoCBH0SQXge34M37rHmZH38l8Z549q9OoqpJSbb6/wDB/wA/wFGPKku3/A/yPG5tG1F7DTf7Us5ZIzokMMazaNJfSRyjdvQAMpic5X5jjOByNteoaPPNHDBp1zHePPb2kJkupogqysQQeQSNwK5IBOMjk1qUU1pfz/4P+Y1G39en+QUUUUDCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK29H/49H/66H+QrErb0f8A49H/AOuh/kKipsTLY0KKKKwMwooooAKKKKACiiigAooooA8r8Nj/AIpnTOP+XaP/ANBrsPAnHhOH/r6u/wD0okrj/DY/4pnTOP8Al2j/APQa7DwJx4Th/wCvq7/9KJKA6nSVznjv/kULr2lgP/kZK6Oud8dDPg2+46GI/wDkVaAMvwqP+Ku1HjpYwZ9v3kv+FdtXFeEx/wAVZq3tY22eOn7yeu1oA4rxcMeK9HI/isbvP4Pb/wCJrR8Cf8iqh9by8P53MprP8YceJ9EP/TpeL/49Af6Vo+BBjwlB73N0R9DcSUAdHXk2ur/yMi4+Y3+PxIjx/MV6zXlOuD/SvES9/wC0ox+aw4oA9WrL8TLv8KawucZsZh/44a1KzvEClvDeqKvJNnKB/wB8GgDi/D2H8UaKcf8ALlOw/KMf1r0WvOfC+G8TaLjp/Zs7Dj3hH9a9GoA5Pxz/AMwA+mpH/wBJp6PA3/Mf9P7TH/pNBR46/wBVoZ7f2kP/AERNR4FH7rXOODqZ/wDRENAHWV5z4jOzxPrZH/PjC344k/wr0avOPFR2eJNbI/6BkLfj+/H9KAOU8fIFk+GSDoEjx+Hk11vw6IPjHx5gY/4mS/8As9ct8RECX3w2UA4UIAfxh/z/AJ46j4cf8jh486/8hIfzegDL0Qfu/Dakf8v6g+xG/wDwr1qvKNEGZ/D6kf8AMTfP4CU/0r1egDm/Hf8AyKcvtdWh/wDJmOs7wmP+Ks1b2sbbPHT95PWl47H/ABSNyfSe3I/CeM1neEf+Rp1r/rysx/4/cUAdpXE+K+PFume9jcZ/B4v8a7auK8WjHivRz/esbvP4Pb/40AaXgQY8I2/vPcn855DXR1zvgUY8H2fu8zfnM5roqAPJdXX5dfBHXUiD9Cyf0qH49ZNp4eUDrcyHPpwtWdXH+ka6pHXVUB+hMX9Kr/Hgf6J4f/6+ZP5LQBMgzr3xXAU5NhH/AOk7+1bGgc+MtNx/0Drk8em6Csm2GfEnxUABJNnH2/6YPWr4YwfF+nEf9Am46f8AXS2/woA9CrkfG4/0jQW7/bXX/wAgSn+lddXJ+OB82gN3/tFl/wDJac/0oAPAo/da5xwdTP8A6IhrrK5TwKP9F1jj/mJP/wCi466ugDzXxISmv+IiOv2WJh/37b/Cu60JQnh/TUHRbWID/vgVwnirK654iOOfsERH/fEn+Fd/pKhNGsVHQW8Y/wDHRQBcrybw6Pl8JjHP2ocY9Ipf8K9Zryjw4P8ASfCoxyL1wR9IZ8/yoA9XooooA8+1L/kc9Y/3Lf8A9ANW/Cv/ACN2of8AXhD/AOjJKqal/wAjnrH+5b/+gGrfhX/kbtQ/68If/RklAjtqKKKBhRRRQAUUUUAFFFFAHP6l/wAhCX8P5CqlW9S/5CEv4fyFVK6Y7I1WwUUUUxhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFbej/8AHo//AF0P8hWJW3o//Ho//XQ/yFRU2JlsaFFFFYGYUUUUAFFFFABRRRQAUUUUAeV+Gx/xTOmcf8u0f/oNdh4E48Jw/wDX1d/+lElC+A/DiKFSxlRRwFW7mAA9AA/Ara07TrTSrGOysovKt487U3E4ySTySSckk/jQBarnvHH/ACJmpf7i/wDoQroajngiureSCeNZYZFKujjIYHqCKAOP8I/8jTrX/XlZj/x+4rtKo6Xo9ho0DQ2FuIUdtzfMWZj7kkk/nxV6gDjPGIx4i0Nv+mF0v6xH+laHgUY8IWvHWW4I+nnPWrqej2GswJDf2wmVG3IdxVlPqGBBH4GrVvbw2tvHb28SRQxqFSNBhVA6ACgCSvKtbGdU18Yyf7Vtx/47b16rWbP4f0m61WPU5rKN7xCCJDnkjoSOhI7EgkYGOlAGlVHWQToWoAck20n/AKCavUUAeceEAG8SaN6DR524/wB63H9a9HrN03w/pWjzSy6fZRwPKMMVycD+6Mn5V9hgVpUAcp47/wCPXR/+wkv/AKKko8C/8euscf8AMSf/ANFx10V/p9pqlm9pewLNA+CVbjkcggjkEeo5osLC10yzS0soVhgTOFX1PUknkk+p5oAs15v4x+TxDrZH/QGhb8d1yP6V6RWbqegaVrEsUuoWUc7xcKWJGR/dOD8y+xyKAPJviaoj1L4ejB+RlH/j0P8Ah/nt0/w6AHi/x2O/9pA/+h1h/GMY8U+Cxjj7UR0/2463Ph2MeMfHfX/kJL/7PSAztEXOpaApH/MVnz+C3B/pXqtZtv4f0m11STUoLGNLtySZBngn7xA6AnuQMnvWlTA5zx3/AMiden+68LflKhrO8H/8jNrn/Xtaf+hT12Fxbw3VvJb3EaywyKVdHGQwPUEVV0zSLDRoGhsLcQo7bmO4szH3Ykk+nJoAvVxfjDjxPoh/6dLtf/HoD/Su0qjqej2GswpFf24mVG3IdxVlPswII/OgDM8DjHg3T/cO35uxroajggitbeOCCNIoY1CoiDAUDoAKkoA8q1gA6jrSnvrECn8TBVT498WOgNtyBcvz+C16dN4f0q41ZNUlso2vEIIkOeSOjEdCR2JGRgeleYfHz/kG6DyM/an/AJCgC9YL/wAVX8T8A5+yxf8Aol6v+Ev+Rq0/H/QHl/8AQ4Kd4QAPxR8dqRnJtMgjt5ZrsdM0HS9GeVtPs0gaX7xUk8dlGTwo7KMAelAGjXJ+OuE0JvTUv528w/rXWVV1DTrTVLRrW9gWaFiDtORgjoQRyCPUc0Ac/wCBB/oGqHGAdRlx/wB8oK6qq9jY2um2aWlnCsMCfdRfzJ9yfU1YoA8z8YnbrPiJu40uM8/SavRNPTZptqn92FBz9BVXUfD+latcxXF/ZRzyxDCs2RkZzhgD8wz2ORWlQAV5V4d/5Cnhn1/tC4/9E3Neq1m2ugaVZanLqNvZRx3Uudzgnv1IGcKT3wBnvQBpUUUUAefal/yOesf7lv8A+gGrfhX/AJG7UP8Arwh/9GSVu6h4U0bVL1ry7tXa4dQrOk8keQOmQrAVLpXhzStEmmlsLZo5JlCuzTPISASQPmJx1NAGpRRRQAUUUUAFFFFABRRRQBz+pf8AIQl/D+QqpV/UIJnvpGSKRlOMEKSOgqr9luP+eEv/AHwa6ItWRqtiKipfstx/zwl/74NH2W4/54S/98GndDuRUVL9luP+eEv/AHwaPstx/wA8Jf8Avg0XQXIqKl+y3H/PCX/vg0fZbj/nhL/3waLoLkVFS/Zbj/nhL/3waPstx/zwl/74NF0FyKipfstx/wA8Jf8Avg0fZbj/AJ4S/wDfBouguRUVL9luP+eEv/fBo+y3H/PCX/vg0XQXIqKl+y3H/PCX/vg0fZbj/nhL/wB8Gi6C5FRUv2W4/wCeEv8A3waPstx/zwl/74NF0FyKipfstx/zwl/74NH2W4/54S/98Gi6C5FRUv2W4/54S/8AfBo+y3H/ADwl/wC+DRdBcioqX7Lcf88Jf++DR9lu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width="640" /></div></div>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-3442961482921053297.post-32972766823673625722011-05-18T18:40:00.001+01:002020-02-16T10:58:56.228+01:00Une Torche solaire Rechargable Lampe a LED<div dir="ltr" style="text-align: left;">
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg0STLHxA3KNV9GzH-UzZXC_k-w54nnobH0nD8EVrtHgYgB9XMrTdGYN6N7dFYcWlFYJuipg_4UadSpTnjNK3xg0oUeaQQuD5P9q20jphmuT94Xb6LFWJGc5UgMfzcgi0a8zBBVeWW9aJQ/s1600/lampe-torche-solaire.jpeg" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" height="144" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg0STLHxA3KNV9GzH-UzZXC_k-w54nnobH0nD8EVrtHgYgB9XMrTdGYN6N7dFYcWlFYJuipg_4UadSpTnjNK3xg0oUeaQQuD5P9q20jphmuT94Xb6LFWJGc5UgMfzcgi0a8zBBVeWW9aJQ/s200/lampe-torche-solaire.jpeg" width="200" /></a><br />
Ce produit à assembler, importé par la société Synergie 21, est à but éducatif.<br />
( la realisation de cette lampe est tres simple,j'ai pensé a vous le presenter car il peut etre realisé avec vos propres composants ,il faut just un peu d'imagination pour consevoir un <br />
boitier approprié. )<br />
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Conseil avant montage : Faire très attention au sens des diodes et du condensateur (polarités), en cas d’erreur la lampe ne fonctionnera pas. Faire également bien attention au positionnement des fils + (rouge) et – (noir) sur le PCB.<br />
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1. Vue éclatée et nomenclature: <span style="color: black;"></span></div>
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<img alt="" 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" /></div>
<span style="color: #3333ff;">N°</span> <span style="color: #3333ff;">Désignation</span> <span style="color: #3333ff;">Quantité</span> <span style="color: #3333ff;">Spécifications </span><br />
<br />
1 Coque du dessous 1 <br />
2 Plaque transparente 1 <br />
3 Pièce avec logo 0 Déjà assemblée <br />
4 Pièce en caoutchouc 2 <br />
5 Coque du dessus 1 <br />
6 Panneau solaire 1 0.2W – 4V <br />
7 Interrupteur 1 <br />
8 Circuit Imprimé 1 25x15x1.2 <br />
9 Batterie rechargeable 1 1.2V 600mAh <br />
10 Condensateur 1 100uF – 16V <br />
11 Diode D1 1 1N4007 <br />
12 Self 1 100 µH <br />
13 Diode D2 1 1N5819 <br />
14 Coque de tête 1 <br />
15 Plastique de tête 1 <br />
16 Réflecteur 1 <br />
17 5 LEDs (assemblées) 1 5mm – Blanches <br />
18 Vis 2 </div>
<br />
<div style="color: #3333ff; text-align: center;">
<span style="font-weight: bold; text-decoration: underline;">2. Schéma électronique:</span></div>
</div>
<div>
( C'est Schéma électronique qui nous interresse le plus)<br />
<br />
<div style="text-align: center;">
<img alt="" height="272" 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width="640" /></div>
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<div style="text-align: center;">
<span style="color: #3366ff; font-weight: bold; text-decoration: underline;">3. Assemblage du PCB: </span></div>
<br />
<span style="font-weight: bold;">A. Les composants sur le PCB <br />
</span> <br />
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<span style="font-weight: bold;"></span><img alt="" 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/><br />
<span style="font-weight: bold;"></span></div>
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<span style="font-weight: bold;">B. Les composants autour du PCB</span></div>
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<img alt="" 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" /> </div>
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<big><span style="color: #3333ff; font-weight: bold; text-decoration: underline;">4. Assemblage</span></big></div>
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" /> </div>
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<span style="color: #3366ff; font-weight: bold; text-decoration: underline;">5-Avis de Synergie 21</span></div>
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Ce produit à assembler, importé par la société Synergie 21, est à but éducatif. Le montage doit impérativement être encadré par un adulte compétent pour effectuer ce type de montage. La société Synergie21 se désengage de toute responsabilité liée à une mauvaise manipulation, pendant l’assemblage des pièces de la présente lampe, ou de problèmes liés à une ou des erreurs de montage. <br />
Attention : présence de pièce pouvant être avalées, présence de verre susceptible de se briser. <br />
La lampe une fois montée correctement ne convient pas aux enfants de moins de 3 ans. <br />
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Cet appareil est marqué du symbole du tri sélectif relatif aux déchets d’équipements électriques et électroniques. Cela signifie que ce produit doit être pris en charge par un système de collecte sélectif conformément à la directive Européenne 2002/96/CE afin de pouvoir être recyclé soit démantelé afin de réduire tout impact sur l’environnement. Pour plus de renseignements, vous pouvez contacter votre administration locale ou régionale, votre municipalité, votre déchèterie ou le magasin ou vous avez acheté le produit. Les produits électroniques n’ayant pas fait l’objet d’un tri sélectif sont potentiellement dangereux pour l’environnement et la santé humaine en raison de la présence de substances dangereuses. Le recyclage des matériaux aidera à conserver les ressources naturelles. </div>
Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-3442961482921053297.post-38195168322244071852011-05-09T14:11:00.000+01:002015-09-28T00:54:57.392+01:00Schema Amplificateur audio Hifi très simple TDA2030<div dir="ltr" style="text-align: left;" trbidi="on">
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Le TDA2030 est un Amplificateur audio Hifi très simple d'emploi. C'est un circuit intégré en boitier Pentawatt qui se comporte comme un Amplificateurop traditionnel (alimentation + et -, entrée non <br />
inverseuse et inverseuse, sortie).<br />
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Le schéma de l'Amplificateurà base de TDA2030 est semblable à un Amplificateurnon inverseur classique, mis à part qu'on branche directement un haut parleur (4 ou 8 Ohms) dessus ! La puissance typique <br />
est de 14W efficaces, mais dépend de l'impédance du haut parleur et de la tension d'alimentation.<br />
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Schéma de l'Amplificateurà TDA2030<br />
Choix des composants<br />
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- Filtre d'entrée<br />
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R1/C1 forme un filtre passe haut qui élimine les fréquences trop basses inaudibles. Sa fréquence de coupure vaut :<br />
f = 1 / (2.Pi.R1.C1) = 15Hz<br />
L'impédance d'entrée vaut R1. On peut l'adapter au besoin et recalculer C1.<br />
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- Contre réaction et gain<br />
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R3 et R2 définissent le gain du montage par la relation de l'Amplificateurop non inverseur :<br />
Gain = 1 + R3/R2 = 32<br />
C'est à dire que la tension de sortie vaut 32 fois la tension d'entrée. Il s'agit du gain en boucle fermée et non en boucle ouverte. Ce gain doit être supérieur à 16 (24dB) d'après le constructeur. Sinon <br />
l'Amplificateurpeut osciller à haute fréquence (être instable) et poser problème. En revanche, le réseau de Boucherot RC série monté en parallèle avec le haut parleur ne s'avère pas indispensable, il ne figure <br />
ainsi pas sur le schéma (essais réalisés en pratique !).<br />
Si un gain inférieur à 16 est nécessaire, il faut atténuer le signal par un pont diviseur avant de l'amplifier à nouveau. Cela peut paraître idiot, mais c'est nécessaire pour garantir le bon fonctionnemnt de l'AmplificateurTDA2030.<br />
Par simplicité, il n'y a pas de condensateur en série avec R2. L'offset d'entrée (+/-2mV typiques) est ainsi amplifié par le gain au lieu d'être tel quel mais cela n'est pas critique pour des applications standard. <br />
On peut mesurer +/-50mV environ.<br />
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- Diodes<br />
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Les 2 diodes garantissent que la tension de sortie ne dépasse pas les valeurs de l'alimentation. Cela peut arriver si le haut parleur est inductif et que l'Amplificateurest saturé. Le signal de sortie se rapproche <br />
d'un créneau et la continuité de courant dans la charge inductive créerait des surtensions dangereuses pour le TDA2030. Tous les haut parleurs sont inductifs !<br />
Bien sûr, si la charge était purement résistive (pas un haut parleur !), ces diodes seraient inutiles...<br />
Ces diodes sont nommées "catch diode" en Anglais.<br />
Elles ne jouent sur aucun autre paramètre (puissance, gain, etc).<br />
Alimentation<br />
L'alimentation doit être symétrique de +/-6V à +/-18V. Le courant disponible doit être de 0.5A minimum sur chaque moitié d'alimentation.<br />
Caractéristiques de l'AmplificateurTDA2030<br />
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Puissance de sortie en fonction de l'alimentation (0.5% de taux de distorsion)<br />
Montage de l'ampli<br />
Un petit radiateur est indispensable à l'AmplificateurTDA2030 (avec pâte thermoconductrice) ! Il doit mesurer quelques centimètres de côté<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjWiSa9C3DCq7HMzvDoYjnWBsSKRkKbFcwXrQIROX6ssChAsPLWk8XiJMElsHadWp6P0W6uLxHVAK96VDdYxF-twPYoewzVkv_HrXRU48gZnP2OfwqWu0nZuDs6zsVdaH9_Ywj-jQN5ppo/s1600/ampli-a-tda2030.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjWiSa9C3DCq7HMzvDoYjnWBsSKRkKbFcwXrQIROX6ssChAsPLWk8XiJMElsHadWp6P0W6uLxHVAK96VDdYxF-twPYoewzVkv_HrXRU48gZnP2OfwqWu0nZuDs6zsVdaH9_Ywj-jQN5ppo/s1600/ampli-a-tda2030.jpg" /></a></div>
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Montages à base de TDA2030 fixés sur radiateurs (celui de droite contient 2 transistors de puissance en plus)<br />
Le boitier du TDA2030 est relié à la patte 3, donc au - de l'alimentation. Si on ne met pas d'isolant (mica + rondelle entre la vis et le TDA2030), le radiateur se trouve au - de l'alimentation.<br />
Les condensateurs de 100nF (découplage) doivent être aussi près que possible des pattes 3 et 5 (alims). Sinon, l'Amplificateurpeut osciller, ce qui se manifeste par des craquements et des souffles dans le <br />
son.<br />
Qualité du son<br />
C'est un Amplificateurclasse AB qui possède une polarisation au repos (40mA de courant de repos). La qualité du son est ainsi excellente !</div>
Unknownnoreply@blogger.comtag:blogger.com,1999:blog-3442961482921053297.post-68927815249133528962011-05-09T13:18:00.000+01:002015-09-28T01:29:53.718+01:00Schema de Variateur de lumière a Triac 1000W max<div dir="ltr" style="text-align: left;" trbidi="on">
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Pour fabriquer soi-même un variateur de lumière, on peut suivre ce schéma electronique de montage concret :<br />
Montage du variateur de lumière (<b>1000W max</b>)<br />
Le schéma électronique du variateur figure ci dessous :<br />
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Schéma du variateur de lumière 1000W<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhol1Kv5xydFSL09o220ywiPOQj207kLTiDGYLwp5j8T33F-QV5dbgCP_gTUGxFGEHi5H4W30yJSnS2UFgkSsQNsvxqOYm5CUpRPr3Fgi3_cQxClKlb4aEbH81oeI7KLAUf3auRtyVbLUs/s1600/schema-variateur-a-triac2.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhol1Kv5xydFSL09o220ywiPOQj207kLTiDGYLwp5j8T33F-QV5dbgCP_gTUGxFGEHi5H4W30yJSnS2UFgkSsQNsvxqOYm5CUpRPr3Fgi3_cQxClKlb4aEbH81oeI7KLAUf3auRtyVbLUs/s1600/schema-variateur-a-triac2.jpg" /></a></div>
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<b>Composants du variateur:</b><br />
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<span style="text-decoration: underline;">R1</span> : 3.9kOhms/0.25Watt. Valeur minimale pour limiter d'éventuelles pointes de courant sur la gâchette et le diac. On peut choisir 3.3k ou 4.7k sans problème<br />
<span style="text-decoration: underline;">P1</span> : 470kOhms de préférence. Eventuellement 1MOhm,. Il faut minimum 470k sinon même sur la plus grande valeur, l'ampoule brillera toujours un peu.<br />
<span style="text-decoration: underline;">C1</span> : 100nF (non polarisé). La tension à ses bornes ne peut jamais dépasser 35V crête. On peut choisir un modèle 63V ou 100V.<br />
<span style="text-decoration: underline;">Diac</span> : 32V, référence DB3 par exemple. Il n'existe qu'un seul modèle connu.<br />
<span style="text-decoration: underline;">Triac</span> : il faut un modèle 400V minimum. Le courant que supporte le triac pourra être choisi égal au double du courant dans l'ampoule pour garantir une bonne marge. Le triac doit être monté sur un petit radiateur pour 100W et plus.<br />
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<b>Un BTA10-400</b> supporte 10A et pourra graduer une charge jusqu'à 1000W (4.3A sur 230V).<br />
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Pattes du triac : A1 (anode 1), A2 (anode 2), G (gâchette)<br />
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<b>Attention</b> : ce montage de variateur est directement connecté au secteur ! Ce sont des <b>tensions dangereuses</b>. Même si la réalisation est simple, soyez <b>très prudents</b> !</div>
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Unknownnoreply@blogger.comtag:blogger.com,1999:blog-3442961482921053297.post-12577264274423333732011-05-09T11:32:00.000+01:002015-09-28T01:02:29.776+01:00Schema de capteur ultrasonique universel<div dir="ltr" style="text-align: left;" trbidi="on">
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Cet appareil est en mesure de détecter la présence de personnes et d’objets jusqu’à une distance d’environ deux mètres. On peut s’en servir, sur un véhicule, comme radar de recul ou bien pour réaliser des appareils d’automatisme industriel, de petits robots, etc. Il dispose d’une barre de LED indiquant la distance de manière analogique et d’un buzzer d’alarme.<br />
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<b>Caractéristiques techniques :</b><br />
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- Fonctionnement à ultrasons à 40 kHz.<br />
- Mesure de la distance.<br />
- Sortie à relais 1 A 250 V.<br />
- Sortie numérique 0/4 V.<br />
- Détection des objets entre 0,2 et 2,5 m.<br />
- Barre de LED pour indication visuelle de la distance.<br />
- Buzzer pour indication sonore de la distance.<br />
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Le capteur à ultrasons est une sorte de radar comprenant une capsule céramique TX qui émet une vibration à 40 kHz (au-delà de la plage des sons audibles par l’oreille humaine) et un transducteur RX accordé sur cette fréquence et recevant le son réfléchi par un objet situé en face des TX et RX. Ce système est utilisé pour différentes applications car on peut ainsi détecter la présence d’un objet ou d’une personne dans un champ défini (rayon de portée) : le signal capté par le récepteur subit, lors de la détection, une brusque variation de niveau. On peut aussi mesurer la distance séparant les TX/RX de l’objet réfléchissant le signal ultrasonique car l’amplitude du signal reçu par le RX est proportionnelle à la distance qu’il a franchi.<br />
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Notre réalisation<br />
Cet article vous propose de réaliser un appareil basé sur ce principe et de mettre à profit plusieurs fonctions : il pourra vous servir de capteur à installer sur le pare-choc arrière de votre voiture pour vous aider lorsque vous la garez (surtout dans un parking souterrain étroit…) ; ou bien pour fabriquer un mètre à ultrasons (oui, c’est cela : un véritable appareil de mesure) autonome ou relié à un circuit de mesure à convertisseur A/N ; ou encore comme détecteur de proximité pour permettre à un robot de contourner les obstacles. Le circuit est un radar à ultrasons assisté par un microcontrôleur : il dispose d’entrées et de sorties permettant la réalisation des fonctions que nous venons de décrire ; en particulier, quand il détecte la proximité d’un corps fixe ou en mouvement, son relais colle, un transistor monté en collecteur ouvert et piloté par un signal rectangulaire permet de faire retentir un buzzer sans électronique ou un petit haut-parleur et une LED s’éclaire. En outre, on a prévu une sortie numérique compatible TTL et une sortie analogique : la première présente une tension continue quand le radar détecte la proximité de quelqu’un ou de quelque chose ; la seconde fournit un potentiel strictement corrélé à la distance entre le TX/RX et le corps détecté. Une barre de trois LED indique la distance estimée. Mais approfondissons un peu tout cela.<br />
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<b>Comment ça marche ?</b><br />
<br />
La méthode utilisée dans ce montage consiste à propager dans l’air une vibration (une onde ultrasonore) à 40 kHz au moyen d’une capsule céramique accordée sur cette fréquence, puis de capter les ondes réfléchies par l’objet proche ; la réception est effectuée par un second transducteur lequel, alors que le premier fait en quelque sorte fonction de haut-parleur, joue en somme le rôle d’un microphone. En effet, sa membrane céramique est soumise à la pression (accoustique, mais à 40 kHz on est bien loin des sons audibles) de l’air engendrée par les ultrasons réfléchis : l’intensité de cette pression est inversement proportionnelle à la distance parcourue par les ultrasons qui la produisent en comprimant l’air (la matière et l’état de la surface de l’objet réfléchissant caractérisent une porosité qui amortit plus ou moins les ultrasons reçus du TX et renvoyés vers le RX). En tout cas, aux bornes du transducteur RX, on récupère une tension électrique variable produite à partir de la pression ultrasonique sur la membrane céramique (c’est le fameux phénomène piézo-électrique : la tension est proportionnelle à la pression déformant la membrane, comme avec un microphone, dont il existe d’ailleurs un modèle piézo-électrique, justement) ; plus précisément, l’amplitude et la fréquence de cette tension dépendent de la quantité, de l’intensité et du temps d’acheminement des diverses composantes réfléchies. Au repos, c’est-à-dire quand le radar n’est pas en mouvement (le véhicule est arrêté, par exemple) et se trouve dans un environnement d’air stable (pas de vent ni de ventilateur, ni d’objet ou de personne en mouvement), la tension se maintient constante ; c’est-à-dire que son amplitude et sa fréquence restent inchangées. Mais lorsqu’un objet entre dans le champ de portée du radar à ultrasons (0,2 m à 2,5 m), la tension varie. On peut lire cette tension et ses variations en les redressant afin d’en obtenir la composante continue ; il est facile de discriminer la condition de repos de celle d’intrusion d’un objet dans le champ : en effet, aux bornes du redresseur on note une variation de la tension continue obtenue.<br />
Quant aux sorties, elles se comportent comme nous l’avons expliqué plus haut et elles ont chacune une particularité que le tableau de la figure 4 décrit en détail. Voyons plutôt comment fonctionne le système de détection en analysant le schéma électrique et le programme résidant dans le microcontrôleur PIC16F630 programmé EV125 et notamment la “routine” (sous programme) concernant le radar à ultrasons à proprement parler.<br />
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<b>Le schéma électrique:</b><br />
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Le schéma électrique de la figure 1 montre la place que tient le micro PIC pour gérer les capsules TX et RX avec l’aide de quelques amplificateurs opérationnels.<br />
Après l’initialisation des lignes d’E/S, le programme résident du PIC lance une “routine” simulant le fonctionnement du radar à ultrasons : au moyen d’un timer interne, le PIC produit une composante à 40 kHz qu’il envoie par sa ligne RC5 (initialisée comme sortie) au transistor T3, un NPN qui l’amplifie en courant pour piloter la capsule piézo émettrice.<br />
Pendant ce temps il se prépare pour le contrôle cyclique de RA3 (paramétrée comme entrée) dont il lit les variations de tension ; notez que la capsule réceptrice RX n’est pas interfacée directement avec le micro mais que le signal qu’elle produit passe à travers un réseau dont la fonction est d’amplifier la tension analogique obtenue à partir des ondes réfléchies, de la filtrer et de la redresser pour en tirer une composante continue. Plus précisément, le signal électrique produit par le RX est appliqué (à travers C5 et R11) à la broche 2 de IC2a, un opérationnel monté en amplificateur inverseur et dont le gain en tension G est :<br />
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<b>G = R24 : R11</b><br />
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la composante amplifiée est à nouveau inversée et amplifiée par IC2b dont le gain G’ dépend cette fois du rapport :<br />
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<br />
<b>G’ = R25 : R12</b><br />
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La tension qui en résulte est comparée avec une référence constante située dans IC2c, un troisième opérationnel monté cette fois en comparateur non-inverseur : chaque fois que le potentiel provenant du signal reçu dépasse un seuil déterminé par le potentiel appliqué à la broche 9, la 8 passe de zéro à environ 12 V.<br />
Donnons un coup de zoom sur le réseau de polarisation des opérationnels IC2a, IC2b, IC2c : il a été conçu pour fournir à chacun une référence précise ; les deux premiers ont leur entrée non-inverseuse polarisée avec un peu moins de 6 V (obtenu par le pont R19/R20, alimenté en aval du filtre R1/C13) et cela est judicieux car, lorsqu’on amplifie des signaux analogiques, il faut mettre (au repos) leur sortie à la moitié de la tension d’alimentation, de façon à garantir une égale excursion de la demi onde positive et de la négative. Du 6 V utilisé pour IC2a et IC2b, le pont R5/R6 tire le potentiel servant de référence au comparateur ; il s’agit d’une tension un peu plus faible (environ 5,8 V) que celle présente au repos à la sortie de IC2b, ce qui permet d’obtenir que le comparateur commute lorsque le pic du signal issu de la capsule réceptrice dépasse 200 mV positif.<br />
Chaque fois que le signal en question dépasse le seuil, le comparateur fournit une impulsion positive et quand il descend en dessous du zéro fictif constitué par le 6 V polarisant IC2a et IC2b, le comparateur maintient sa propre sortie au niveau bas (environ 0 V). On peut déduire de ce mode de fonctionnement que IC2c est essentiellement un redresseur à simple alternance ou, si vous préférez, un détecteur : son rôle est de rendre unidirectionnelle la tension variable issue de la capsule RX et d’en tirer des impulsions rectangulaires que le PIC pourra lire. Etant donné que l’amplitude de ces impulsions est d’environ 12 V et que les lignes d’entrée du PIC n’acceptent pas plus de 5,5 V, il a été nécessaire d’intercaler la zener ZD1 laquelle, de concert avec la résistance de limitation du courant R26, limite à 5,1 V le potentiel appliqué à RA3.<br />
Puisque nous sommes revenus à cette ligne du PIC, que le programme lit cycliquement afin de vérifier la présence des impulsions dues au retour de l’onde réfléchie à 40 kHz, précisons que lorsque l’arrivée des impulsions a été détectée, une “routine” élabore les données correspondantes en mesurant la valeur moyenne de la tension composée par les impulsions.<br />
Plus exactement, le micro vérifie la largeur et l’intervalle des impulsions afin de déterminer l’intensité du signal réfléchi vers le RX. La mesure intéresse le convertisseur A/N interne au PIC que nous attribuons à la ligne RA3 au cours de la phase d’initialisation ; le convertisseur a une résolution de dix bits et peut être couplé à un maximum de huit E/S (lues en multiplex) ; il permet en outre de définir, à l’aide du potentiel appliqué à RA0, la tension de référence de l’échantillonnage. Pour nous, avec le trimmer RV1 nous définissons la gamme de tensions que l’A/N doit convertir et nous choisissons la sensibilité de la conversion : quand on tourne le curseur vers le positif 5 V, le circuit devient moins sensible et vice-versa. L’amplitude de l’échelle de référence du convertisseur est directement proportionnelle à la sensibilité, c’est-à-dire à la distance de détection du radar ; par conséquent avec le trimmer RV1 nous pouvons définir la distance couverte par le capteur et choisir entre 0,2 m et 2,5 mètres.<br />
La conversion A/N détermine des données numériques qui sont lues par le programme principal afin d’évaluer la distance et de commander les sorties en fonction de cette dernière. Voyons, l’une après l’autre, comment ces sorties sont gérées :<br />
- La ligne RA2, pour commencer, est forcée au niveau logique haut quand l’objet détecté se trouve entre la distance minimale et la distance maximale perceptibles ; dans le cas contraire (objet trop éloigné ou trop près) RA2 se met au zéro logique ; la LED LD4 s’allume quand le radar détecte la proximité d’un objet entre 0,2 m et une distance dépendant de la sensibilité paramétrée avec le trimmer RV1. Quant au relais, il colle peu après l’allumage de LD4 et se met au repos avec un léger retard par rapport à l’extinction de la LED. Notez que le logiciel considère dépassé le seuil de distance minimale quand il détecte que le signal capté par la capsule RX et amplifié par IC2a et IC2b est juste au dessous du niveau maximum ; il considère l’objet au delà de la distance maximale quand, en fonction du réglage de RV1, le signal arrive sur RA0 avec une amplitude inférieure à celle du seuil minimal établi. La ligne RA2, responsable du contrôle de LD4 et T1, pilote aussi le transistor T4, un NPN utilisé comme “buffer” (tampon) pour contrôler la sortie numérique : la ligne Dout fournit un niveau logique qui en suit l’alternance, soit le zéro logique quand RA2 se trouve au niveau logique bas et le un logique (4 V environ) lorsqu’elle est au niveau logique haut.<br />
- Le logiciel prévoit en outre une sortie analogique qui fournit un potentiel dont l’amplitude est directement proportionnelle à la distance à laquelle se trouve l’objet détecté (bien sûr toutefois dans les limites 0,2 m à 2,5 m) ; Aout (c’est le nom de cette sortie analogique) détermine une tension obtenue au moyen d’une “routine” (sous-programme) engendrant une onde PWM dont le rapport cyclique est directement proportionnel à la distance détectée ou, si vous préférez, inversement proportionnelle à l’amplitude de la composante lue par le convertisseur A/N du micro. Les impulsions sortant de RC3 sont filtrées par la cellule passe-bas composée de R22 et C11 ; aux extrémités de la cellule nous trouvons donc une tension continue et bien lissée dont l’amplitude suit le rapport cyclique de l’onde PWM et par conséquent cette amplitude est d’autant plus importante que l’intensité du signal lu par la capsule RX est faible (et que la distance est importante) et vice-versa.<br />
Le potentiel est appliqué à l’entrée d’un opérationnel (IC2d) monté en “buffer” non-inverseur qui le restitue avec la même amplitude sur sa broche 13 à partir de laquelle, à travers R13, il atteint Aout et est lu par la RA1. Le rôle du “buffer” est de permettre de piloter avec l’Aout des dispositifs consommant quelques dizaines de mA sans charger RC3, ligne qui ne pourrait pas fournir un courant supérieur à ces quelques mA.<br />
- Une dernière sortie est prévue pour la commande du buzzer : elle correspond au transistor T2, un NPN dont la base est pilotée par le microcontrôleur au moyen de sa ligne RC4 ; ce buzzer est utile surtout en mode radar de recul pour aider au parcage des voitures (en effet, ce buzzer sonne différemment selon la distance où se trouve l’obstacle). Voici comment il fonctionne : si le radar ne détecte rien ou si l’objet se trouve au delà du rayon de portée –2,5 m–, la ligne RC4 se met au zéro logique, le transistor est bloqué et le buzzer reste muet ; en revanche, quand la distance entre RX et obstacle est inférieure à 2,5 m, le micro lance le premier signal d’alarme en faisant commuter la condition logique de la ligne RC4 (typiquement 0,5 s au niveau logique haut et 0,5 s au niveau logique bas) et en faisant alterner conduction et saturation de T2, ce qui détermine l’émission d’un son intermittent de la part du buzzer relié aux points BUZ+ et BUZ–. Enfin, si le radar et l’objet détecté sont trop rapprochés –moins de 0,2 m–, RC4 est fixé au niveau logique 1, le transistor est constamment saturé et le buzzer retentit continûment.<br />
- Le microcontrôleur peut en outre commander une échelle de LED qui expriment à leur manière (analogique : barre de trois, LD1, LD2, LD3) la distance entre RX et objet ou obstacle. Elles sont commandées par des convertisseurs internes dont chacun a paramétré un seuil différent.<br />
LD3 s’allume quand l’objet est à faible distance (mais à au moins 0,2 m), LD2 s’allume avec LD3 lorsque l’objet est plus éloigné (typiquement au delà d’un mètre) et LD1 vient s’ajouter aux deux autres (autrement dit LD1, LD2 et LD3 sont toutes trois allumées) quand l’objet est à la distance maximale détectable (2,5 m).<br />
Au dessous de 0,2 m toutes trois sont éteintes. Durant le fonctionnement il peut arriver qu’une ou plusieurs LED ne s’illumine pas de façon stable : cela se produit typiquement lorsque l’objet ou l’obstacle est en mouvement ou se trouve à une distance ne correspondant à aucun des seuils paramétrés.<br />
Bon, eh bien, puisque vous connaissez maintenant en détail le fonctionnement de toutes les sorties, vous saurez les mettre à profit en fonction de l’application à laquelle vous destinez l’appareil.<br />
Si vous souhaitez utiliser l’interaction des trois formes de signalisations, sachez à titre d’exemple qu’avec le curseur de RV1 à mi course Aout fournit 0,8 V quand seule LD3 est allumée, c’est-à-dire si le radar détecte un objet à une distance juste inférieure à 0,5 m. Concluons cette analyse du schéma électrique en précisant que la totalité du montage fonctionne sous une tension d’alimentation continue comprise entre 12 et 15 V à appliquer aux points 12 V et GND (une batterie de voiture, en mode radar de recul, convient parfaitement) ; D3 protège le circuit contre une inversion accidentelle de polarité et ne permet le passage du courant que de l’entrée d’alimentation vers le reste du circuit. Le régulateur VR1 est un 78L05 donnant le 5 V stabilisé nécessaire au fonctionnement du micro, du trimmer de réglage de la sensibilité et du transistor servant de “buffer” pour la sortie numérique.<br />
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<b>Figure 1</b> : Schéma Eléctronique du capteur à ultrasonique<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgtOnpQXn3L8O97Q7GRxhqRdYJZfoKOe3Y-y8u_IFGBgs_09LMUfOZZO9LEBnDX7DEGmYWJ-Xg9kxv-6hEYFDhyZcMT2TyJf1_DXsRNh8iQgGlv2i3txG1lDHYuFAT6mkZEXLzBXhHpgdc/s1600/schema-capteur-ultrasonique+schema.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgtOnpQXn3L8O97Q7GRxhqRdYJZfoKOe3Y-y8u_IFGBgs_09LMUfOZZO9LEBnDX7DEGmYWJ-Xg9kxv-6hEYFDhyZcMT2TyJf1_DXsRNh8iQgGlv2i3txG1lDHYuFAT6mkZEXLzBXhHpgdc/s1600/schema-capteur-ultrasonique+schema.jpeg" /></a></div>
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<b>Figure 2a</b> : Schéma d’implantation des composants de la platine du capteur à ultrasons.<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjb_iUBRckhsAPNIOKzescLRBapRAOVlJg6sNleDfJ_-IZpzTHabqrwcjsb7kN7JfBSWoM18CMZ4Y3Nn2aCn_xpXTgYo65fqGS6Fa7YWeoq3fX1xzBuyadF7PD-47WkZIqWV0bFOtA6RCw/s1600/montage-capteur-ultrasonique+2.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjb_iUBRckhsAPNIOKzescLRBapRAOVlJg6sNleDfJ_-IZpzTHabqrwcjsb7kN7JfBSWoM18CMZ4Y3Nn2aCn_xpXTgYo65fqGS6Fa7YWeoq3fX1xzBuyadF7PD-47WkZIqWV0bFOtA6RCw/s1600/montage-capteur-ultrasonique+2.jpeg" /></a></div>
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<b>Figure 2b</b> : Dessin, à l’échelle 1, du circuit imprimé de la platine du capteur à ultrasons.<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjWGh-TEWPC4bjOocmBxZRoBsIIvSBYUWJsqErw-6VmpqiKWWVctoF0cnNZ8bF3B5Dyf1xMlQBurHlAl6CWiSCy95B4j-LartHwVmpNfb8wDqs8qj03mPiQu18rSdCfUr3LkIht1hkUwFQ/s1600/schema_capteur_ultrasonique+circuit+imprimer.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjWGh-TEWPC4bjOocmBxZRoBsIIvSBYUWJsqErw-6VmpqiKWWVctoF0cnNZ8bF3B5Dyf1xMlQBurHlAl6CWiSCy95B4j-LartHwVmpNfb8wDqs8qj03mPiQu18rSdCfUr3LkIht1hkUwFQ/s1600/schema_capteur_ultrasonique+circuit+imprimer.jpeg" /></a></div>
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<b>Figure 3</b> : Photo d’un des prototypes de la platine du capteur à ultrasons..<br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjwwWLXsUBiZGZTWABf6Oq2zYr9yLGR2oulyUry5Z8A5pGQMH5QUf0lpUm0JSN6oTbdwGRgvXjtz05fmU2UYRjXidiifGVh_r9LryeHK-IsrPYDtS_AcYR7VT6XQetRAcMbAVBAMU3Y6Y8/s1600/schema-montage-capteur_ultrasonique+1.jpeg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjwwWLXsUBiZGZTWABf6Oq2zYr9yLGR2oulyUry5Z8A5pGQMH5QUf0lpUm0JSN6oTbdwGRgvXjtz05fmU2UYRjXidiifGVh_r9LryeHK-IsrPYDtS_AcYR7VT6XQetRAcMbAVBAMU3Y6Y8/s1600/schema-montage-capteur_ultrasonique+1.jpeg" /></a></div>
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<br />
Liste des composants<br />
R1 ...... 47<br />
R2 ...... 47<br />
R3 ...... 47<br />
R4 ...... 220<br />
R5 ...... 10 k<br />
R6 ...... 270 k<br />
R7 ...... 1 k<br />
R8 ...... 1 k<br />
R9 ...... 1 k<br />
R10 ..... 1 k<br />
R11 ..... 1 k<br />
R12 ..... 1 k<br />
R13 ..... 1 k<br />
R14 ..... 1 k<br />
R15 ..... 1 k<br />
R16 ..... 1 k<br />
R17 ..... 1 k<br />
R18 ..... 1 k<br />
R19 ..... 15 k<br />
R20 ..... 15 k<br />
R21 ..... 15 k<br />
R22 ..... 15 k<br />
R23 ..... 15 k<br />
R24 ..... 22 k<br />
R25 ..... 22 k<br />
R26 ..... 22 k<br />
RV1 ..... 10 k trimmer MO<br />
C1 ...... 100 nF multicouche<br />
C2 ...... 100 nF multicouche<br />
C3 ...... 100 nF multicouche<br />
C4 ...... 100 nF multicouche<br />
C5 ...... 10 nF céramique<br />
C6 ...... 10 nF céramique<br />
C7 ...... 18 pF céramique<br />
C8 ...... 18 pF céramique<br />
C9 ...... 10 μF 35 V électrolytique<br />
C10 ..... 10 μF 35 V électrolytique<br />
C11 ..... 10 μF 35 V électrolytique<br />
C12 ..... 100 μF 25 V électrolytique<br />
C13 ..... 100 μF 25 V électrolytique<br />
C14 ..... 470 μF 25 V électrolytique<br />
LD1 ..... LED 3 mm rouge<br />
LD2 ..... LED 3 mm rouge<br />
LD3 ..... LED 3 mm rouge<br />
LD4 ..... LED 3 mm rouge<br />
ZD1 ..... zener 5,1 V 400 mW<br />
D1 ...... 1N4148<br />
D2 ...... 1N4148<br />
D3 ...... 1N4007<br />
X1 ...... quartz 8 MHz<br />
IC1 ..... PIC16F630-EV125 déjà programmé en usine<br />
IC2 ..... TLV274<br />
VR1 ..... 78L05<br />
T1 ...... BC547<br />
T2 ...... BC547<br />
T3 ...... BC547<br />
T4 ...... BC547<br />
RY1 ..... relais 12 VDC 10 A 1 contact<br />
TX ...... capsule émettrice à ultrasons<br />
RX ...... capsule réceptrice à ultrasons<br />
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<b>Divers :</b><br />
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2 supports 2 x 7<br />
1 barrette mâle horizontale 12 pôles<br />
1 boîtier plastique<br />
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Les deux capsules à ultrasons peuvent être montées sur le circuit imprimé verticalement ou horizontalement (dans ce dernier cas, il faut les souder sur des picots ou des queues de composants verticaux) ; on peut également les placer à distance (dans ce cas on les reliera à la platine au moyen de câbles blindés). Ne pas oublier les trois “straps” filaires J1, J2 et J3.<br />
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<table><tbody>
<tr bgcolor="#559de5"><td><b>SORTIE</b></td><td><b>FONCTION</b></td><td><b>UTILISABLE…</b></td></tr>
<tr bgcolor="#bed3d8"><td>Relais</td><td>Normalement en conduction entre COM et NC, se ferme entre COM et NO chaque fois que Dout se met au niveau logique haut et retourne au repos avec un léger retard par rapport au retour à zéro volt de Dout.</td><td>…couplé ou à la place de Dout, comme contact anti-intrusion dans les systèmes d’alarme ou pour lancer la reproduction d’un message ou l’ouverture d’un tourniquet ou d’une barrière quand une personne ou un véhicule s’approche.</td></tr>
<tr bgcolor="#92bfe9"><td>Dout</td><td>Normalement au niveau logique bas, prend le niveau logique haut (4 V) lorsque la présence d’un corps à une distance de 0,2 à 2,5 m est détectée.</td><td>…couplé ou à la place de la sortie à relais, laquelle se calque pratiquement sur ses changements d’état.</td></tr>
<tr bgcolor="#bed3d8"><td>LD4</td><td>Suit les états de Dout : allumée quand le radar détecte un corps à une distance de 0,2 à 2,5 m ; éteinte lorsqu’il n’y a rien à détecter ou si l’objet est plus près que 0,2 m ou plus loin que 2,5 m.</td><td>…comme signalisation lumineuse permettant de comprendre qu’un objet est entré dans le rayon d’action du radar ; en utilisation comme capteur antivol, signale l’état de la sortie.</td></tr>
<tr bgcolor="#92bfe9"><td>Aout</td><td>Fournit une tension directement proportionnelle à la distance de l’objet détecté, variant de 0 V (quand l’objet n’est pas à plus de 0,2 m) à 4 V lorsqu’il est à 2,5 m et plus.</td><td>…pour piloter un microampèremètre à aiguille dont l’échelle peut être graduée en décimètres, ou bien un voltmètre numérique ou un circuit capable de visualiser la tension ; le but est de réaliser un mètre à ultrasons.</td></tr>
<tr bgcolor="#bed3d8"><td>Buzzer (BUZ +/–)</td><td>Commande un buzzer en le faisant retentir de manière impulsionnelle si un objet est détecté à moins de 2,5 m et de manière continue si l’objet détecté est à moins de 0,2 m ; si la distance dépasse 2,5 m le buzzer reste muet.</td><td>…quand le circuit est monté sur un véhicule comme radar de recul (aide au parking) : le son impulsionnel avertit le conducteur que le véhicule se rapproche d’un mur ou d’un autre véhicule ; le son continu signifie que l’obstacle est très proche et qu’il faut s’arrêter.</td></tr>
<tr bgcolor="#92bfe9"><td>LD1, LD2, LD3</td><td>Forment une barre indiquant la distance : la distance pour laquelle elles s’allument dépend du réglage du trimmer ; LD3 indique la plus faible distance, LD2 (allumée avec LD3) la distance intermédiaire et quand LD1, LD2 et LD3 sont allumées toutes les trois c’est que l’obstacle est à la distance maximale ; toutes trois sont éteintes si un obstacle est à moins de 0,2 m.</td><td>…comme indicateur de distance ; donne une indication approximative dépendant du réglage et dans certains cas cela peut être utile : par exemple, on peut utiliser le circuit comme radar de recul pour le parking (il permet une évaluation visuelle de la distance à laquelle se trouve un obstacle, à utiliser avec ou à la place des indications sonores du buzzer).</td></tr>
</tbody></table>
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<i>Figure 4 : Les fonctions des sorties.</i></div>
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<b>La réalisation pratique:</b><br />
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Une fois qu’on a réalisé le circuit imprimé simple face (la figure 2b donne le dessin à l’échelle 1 de la platine) ou qu’on se l’est procuré, on monte tout d’abord les trois “straps” J1, J2 et J3, les quatre picots pour les deux capsules piézo et les deux supports de circuits intégrés puis on vérifie la qualité de ces premières soudures (ni court-circuit entre pistes ou pastilles ni soudure froide collée).<br />
On n’insèrera les circuits intégrés que lorsque toutes les soudures auront été effectuées.<br />
Montez ensuite tous les composants dans un certain ordre en regardant fréquemment les figures 2a et 3, ainsi que la liste des composants. Leur insertion et leur soudure ne posent pas de problèmes particuliers, elles réclament seulement un peu de soin, mais prenez tout de même bien garde à la polarité (au sens de montage) des composants polarisés (diodes, zener, LED –si vous les déportez, utilisez de la paire rouge/noir–, condensateurs électrolytiques, transistors et régulateur en boîtiers plastiques demi lune et bien sûr à la fin les circuits intégrés).<br />
Attention, quelques résistances sont montées verticalement. Montez dans un second temps les composants les plus encombrant comme le trimmer, le quartz, le connecteur, le relais et les deux capsules piézo. A propos de ces dernières : montez d’abord la capsule TX (elle est marquée d’un S ou d’un T) puis la RX (elle est marquée d’un R). En cas de doute la TX n’est pas blindée à l’arrière, tandis que la RX est blindée du côté où sortent les pattes à souder (c’est afin d’éviter toute interférence) ; vous pouvez les déporter loin de la platine, mais dans ce cas reliez-les avec du câble blindé, le point chaud allant au + et la tresse à la masse (pour la RX la masse est bien sûr le blindage).<br />
Le connecteur à 12 pôles au pas de 2,54 mm peut être omis et les fils peuvent être soudés directement sur les pastilles.<br />
Quand tout cela est fait, enfoncez les deux circuits intégrés dans leurs supports, en orientant bien leurs repères détrompeurs en U vers R2 pour le PIC IC1 et vers R22 pour IC2. Le PIC est disponible déjà programmé en usine.<br />
Vérifiez tout au moins deux fois systématiquement (identification des composants, respect des valeurs, polarité et qualité des soudures), vous ne le regretterez pas car le montage fonctionnera du premier coup.<br />
Alimentez le circuit (si vous l’utilisez à bord d’un véhicule, alimentez-le avec la batterie de bord) à partir d’un petit bloc secteur fournissant une tension de 12 à 15 Vcc pour un courant de 100 mA au moins.<br />
Dans tous les cas, montez un fusible retardé de 500 mA. En voiture (radar de recul), prenez le 12 V après contact de Neimann au boîtier de fusibles, afin que l’appareil soit éteint quand vous n’en avez pas besoin puisque le véhicule n’est pas censé rouler (on évite ainsi de décharger la batterie de la voiture !). Quand l’appareil est sous tension, mettez le curseur de RV1 à mi course et placez-vous devant les capsules : vérifiez qu’au delà de 0,2 m et jusqu’à quelques mètres le capteur vous détecte (vous le saurez car vous entendrez le relais coller et verrez les LED s’allumer en fonction de la distance à laquelle vous vous trouvez ou avez placé l’obstacle).</div>
Unknownnoreply@blogger.comtag:blogger.com,1999:blog-3442961482921053297.post-55521258778903662322011-05-05T11:28:00.000+01:002016-06-16T12:09:34.135+00:00Detecteur HF des ondes Electronique Simple<div dir="ltr" style="text-align: left;" trbidi="on">
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Ce détecteur te permettra de vérifier la présence des ondes radio émises par les appareils qui nous <br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEinVdTVP_FrNp7W3v105yguuLSg03moclWGO3moD5niZNjbzma_8xlTbuxHzBhsUmbZTs7Id1vQcTejMrm7I4eE_hNUJ8QiFdTEUdt7CM3tGXEBAUtGcTSmh43fnVV-1QgEzeruhB26xWA/s1600/detecteur_hf_gsm_electronique_simple.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEinVdTVP_FrNp7W3v105yguuLSg03moclWGO3moD5niZNjbzma_8xlTbuxHzBhsUmbZTs7Id1vQcTejMrm7I4eE_hNUJ8QiFdTEUdt7CM3tGXEBAUtGcTSmh43fnVV-1QgEzeruhB26xWA/s1600/detecteur_hf_gsm_electronique_simple.JPG" /></a></div>
entourent (téléphones portables GSM, routeurs WiFi, ... ) ainsi que les fuites d'énergie à haute fréquence à <br />
la porte des fours à micro-ondes ...<br />
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<b>Comment ça marche?</b><br />
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Les ondes radio sont émises en faisant varier rapidement un courant électrique dans une antenne (courant alternatif d'une certaine fréquence). <br />
Un simple fil électrique, placé à distance, peut capter ces variations de courant, mais avec une amplitude diminuant rapidement avec la distance. <br />
Lorsque la puissance d'un émetteur est élevée (plus de 10 watts), on peut facilement allumer une ampoule électrique à moins de 10 cm...! <br />
Pour de faibles puissances (moins de 1 watt pour les téléphones portables), il faut des détecteurs plus sensibles, mais ceux ci sont en général polarisés (munis de signes + / -), et il faudra transformer le <br />
courant alternatif en courant redressé, à l'aide d'une diode... <b><br /></b><br />
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<b>Réalisation</b><br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjp-bhbbjOVPzWKf4tDftjEsn-tAh-bt_sSUxf_prIPokOxXT_jVsStIFCagY8BZ35jBQhePTVQpLkEqF1m08SJ2OvHN9H61sQakzzmi9XhROuhzdUApk0eh2h9CdABvkKLxGvTs-iZe_4/s1600/detecteur_hf_electronique_simple+circuitT.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjp-bhbbjOVPzWKf4tDftjEsn-tAh-bt_sSUxf_prIPokOxXT_jVsStIFCagY8BZ35jBQhePTVQpLkEqF1m08SJ2OvHN9H61sQakzzmi9XhROuhzdUApk0eh2h9CdABvkKLxGvTs-iZe_4/s1600/detecteur_hf_electronique_simple+circuitT.png" /></a></div>
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Le montage ne comportant que peu de composants, il pourra être réalisé sur<br />
une simple plaque de bakélite cuivrée,sur laquelle on aura gravé 3 rainures<br />
d’isolation à l’aide d’un cutter :<br />
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<b>Soudage de la diode</b><br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhQs8DgoV49_MxriqPxH6UtPh03Sy5GmD56EgVF7ieIpNpCK-eacBd6qpZifxTZldHPfmDO-dB1r71_pw1n3imfTyK7E-6_-JHJ1SOtZ5COty1w7Gb8a_L9xJsCDtcq6qyz2JJmGGavvV0/s1600/detecteur_hf_electronique_simple+Soudage+de+la+diode.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhQs8DgoV49_MxriqPxH6UtPh03Sy5GmD56EgVF7ieIpNpCK-eacBd6qpZifxTZldHPfmDO-dB1r71_pw1n3imfTyK7E-6_-JHJ1SOtZ5COty1w7Gb8a_L9xJsCDtcq6qyz2JJmGGavvV0/s1600/detecteur_hf_electronique_simple+Soudage+de+la+diode.JPG" /></a></div>
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Comme pour tous les composants CMS, étamer d’abord le plan de<br />
cuivre pour un premier côté de la diode, A l’aide de brucelles,déposer la<br />
diode sur cet étamage, et chauffer rapidement avec un fer à souder<br />
(compter 1 à 2 secondes), le premier côté est soudé. Il ne reste qu’à souder<br />
l’autre côté… pas si compliqué ! [Pour dessouder, en cas d’erreur ou de<br />
récupération, il suffit de recharger en soudure les 2 électrodes du composant, et<br />
de maintenir ces 2 soudures chaudes en passant alternativement le fer à souder<br />
d’un côté à l’autre, puis pousser le composant avec la pointe du fer au<br />
moment venu. ]<br />
<br />
<b>Essais</b><br />
On fabriquera un dipôle de fortune avec 2 brins de cuivre directement<br />
soudés sur le circuit imprimé. Pour une réception optimale, la longueur<br />
totale du dipôle doit être égale à une demi-longueur d’onde.<br />
Voici quelques valeurs de longueurs d’onde trouvées en appliquant la<br />
formule L (m) = 300/F (MHz) :<br />
L = 33 cm pour le GSM à 900 MHz<br />
L = 16 cm pour le GSM à 1,8 GHz<br />
L = 12,5 cm pour le Wifi, le<br />
Bluetooth, ou le four à micro ondes, émettant tous les trois sur 2,4 GHz .<br />
Soit respectivement des antennes demi onde d’environ 16 cm, 8 cm et 6<br />
cm. Le prototype utilisé pour cet article utilise un dipôle de 8 cm,<br />
réalisant un compromis pour détecter les 3 fréquences, et essayer quelques<br />
expériences…<br />
<b>Avec un téléphone GSM</b><br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjoOxEtPFadr1YxFQy3kHCsWxxo23C5w3m88crWXEbw_XiNH3XlKDiPYo4_sICA5sJJYHSRScDg4aTnRYluhm77CrHAA8F42n3Vn6cvUT8i_cKBBnn3EVKbX44CZtH_wMU7FiqIyY5ga6Y/s1600/detecteur_hf-gsm_electronique_simple+un+t%25C3%25A9l%25C3%25A9phone+GSM.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjoOxEtPFadr1YxFQy3kHCsWxxo23C5w3m88crWXEbw_XiNH3XlKDiPYo4_sICA5sJJYHSRScDg4aTnRYluhm77CrHAA8F42n3Vn6cvUT8i_cKBBnn3EVKbX44CZtH_wMU7FiqIyY5ga6Y/s1600/detecteur_hf-gsm_electronique_simple+un+t%25C3%25A9l%25C3%25A9phone+GSM.JPG" /></a></div>
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Il suffit de placer le détecteur à 5 cm du téléphone portable, et de composer<br />
le 123 pour appeler votre messagerie (gratuite) afin d’observer les effets<br />
d’une transmission, avec des phases d’impulsions (réception seule) et des<br />
périodes de pleine puissance lorsque l’on parle… avis aux bavards !<br />
<b>Avec un four à micro-ondes</b><br />
Le niveau de signal reçu s’apparente à celui d’un téléphone GSM, en<br />
promenant le détecteur à 5 ou 10 cm devant la porte du four. On<br />
remarquera une différence de variation du signal si un verre d’eau<br />
est placé au bord, ou au centre du plateau tournant. L’aiguille dévie à<br />
pleine échelle si le four tourne à vide (non recommandé). On retrouvera le<br />
signal par réflexion en s’approchant d’un appareil métallique (grille pain,<br />
évier en inox…) placé sur le trajet des ondes…<br />
<br />
<b>Avec le WiFi</b><br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgvjEYkeOZNaoxFXqB3lgxu39sDnZPIBZLPaGQL-xu54e-2z6vCvjEOyn3WxHrO_SEI7kMTdGYOFS3AFJ8suBQdnAYtdeLEd5AFi81vKWjxvq1YtcFLxB4_TO6lMQ6FblWsSmAOgYyhm5Q/s1600/Avec+le+WiFi.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgvjEYkeOZNaoxFXqB3lgxu39sDnZPIBZLPaGQL-xu54e-2z6vCvjEOyn3WxHrO_SEI7kMTdGYOFS3AFJ8suBQdnAYtdeLEd5AFi81vKWjxvq1YtcFLxB4_TO6lMQ6FblWsSmAOgYyhm5Q/s1600/Avec+le+WiFi.png" /></a></div>
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<br />
Le niveau de signal reçu est plus difficile à capter si l’activité réseau est<br />
faible. On obtient une bonne déviation de l’aiguille en se connectant à un flux<br />
de télévision sur Internet (comme NASA TV par exemple)…<br />
A vous de jouer… !<br />
En imaginant des antennes à gain, à polarisation circulaire, à réflecteurs<br />
paraboliques, ou à cavités filtrantes…pour gagner en directivité, en<br />
sensibilité et en sélectivité, dans le but d’essayer de capter les relais GSM<br />
situés sur les terrasses des immeubles !</div>
Unknownnoreply@blogger.comtag:blogger.com,1999:blog-3442961482921053297.post-87120476828429926242011-05-04T17:58:00.000+01:002016-06-16T12:00:15.365+00:00Schema de doubleur de tension 12V / 24V à BASE DE NE555<div dir="ltr" style="text-align: left;" trbidi="on">
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<span style="font-family: inherit; font-size: small;">circuit doubleur de tension 12V VERS 24V à BASE DE NE555 : La Description du montage 12v/24v .Le schéma d'un doubleur de tension à l'aide très simple minuterie NE555 est montré ici. Voici IC NE555 est câblé comme une exploitation multivibrateur astable <a href="https://draft.blogger.com/null" name="more"></a>à environ 9KHz. La base des deux transistors (Q1 et Q2) est court-circuité et la sortie du multivibrateur astable (axe 3) est relié. Lorsque la sortie de multivibrateur astable est faible, Q1 et Q2 être OFF sera allumé. La borne négative du condensateur C3 sera court-circuité à la masse par T2 et il sera chargé à la tension d'alimentation d'entrée. Lorsque la sortie du vibrateur astable multi est élevé, le transistor Q1 sera ON et le transistor Q2 sera OFF.Le condensateur C4 sera débité de la tension aux bornes du condensateur C3, plus la tension d'alimentation d'entrée (qui est le double de la tension d'entrée).</span><br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjpljQf3dxvx2rydKsFJvcTULTArpyCO9UJgwwYPiZr4Otbr8iC3NIQNae27uwTk0zuvTkJ9PhJ-dV7QSzlEhZwMM_uZjHP-FaV_ap-PxcW3HqG5LThga85mCi4I0gJT60FNyTrqGDNMxc/s1600/doubleur-de-tension-12v-24v-a-base-de-ne555.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="144" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjpljQf3dxvx2rydKsFJvcTULTArpyCO9UJgwwYPiZr4Otbr8iC3NIQNae27uwTk0zuvTkJ9PhJ-dV7QSzlEhZwMM_uZjHP-FaV_ap-PxcW3HqG5LThga85mCi4I0gJT60FNyTrqGDNMxc/s320/doubleur-de-tension-12v-24v-a-base-de-ne555.png" width="320" /></a></div>
<span style="font-family: inherit; font-size: small;"><br />Ce circuit doubleur de tension peut fournir jusqu'à 50 mA seulement courant de sortie et au-dessus de cette limite actuelle de la tension de sortie sera considérablement réduit. La tension de sortie réelle se situera autour de 19V pour une entrée de 12V DC et la tension de sortie sera un peu instable. Quoi qu'il en soit, pour les applications de faible intensité ce circuit est assez bien.</span></div>
Unknownnoreply@blogger.comtag:blogger.com,1999:blog-3442961482921053297.post-25475106639211111112011-05-04T16:14:00.000+01:002011-05-18T16:54:51.645+01:00Schema De Programmateur des microcontroleurs ATMEL<div class="separator" style="clear: both; text-align: center;"><a href="http://electroremy.free.fr/im/elec-mo-atmel/photo1.jpg" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="http://electroremy.free.fr/im/elec-mo-atmel/photo1.jpg" width="320" /></a></div><br />Les progrès de l’informatique ont entraînés dans leur sillage une forte évolution des composants électroniques ; on peut trouver aujourd’hui pour quelques euros des circuits intégrés regroupant un CPU, de la RAM et de la ROM, dont la puissance égale celle des premiers ordinateurs des années 1980 à 1990.<br /><a name='more'></a><br /><br />Les microcontrôleurs les plus populaires à l’heure actuelle sont incontestablement les PIC de MICROCHIP. Mais à l’origine, le secteur était disputé, comme pour les CPU des ordinateurs, entre les deux géants que sont MOTOROLA (avec son 6809 puis son <span class="IL_AD" id="IL_AD4">68HC11</span>) et INTEL (avec son 8051 notamment).<br /><br />C’est à ce dernier que je m’intéresse ; bien que passé de mode, le 8051 a imposé son langage et son architecture, si bien qu’aujourd’hui il existe des puces modernes (avec flash et ram intégrée) qui sont compatible avec son langage. C’est le cas des microcontrôleurs AT89C1051 et 2051 de ATMEL.<br /><br />Cela ravira les anciens qui souhaitent se remettre à programmer quelques circuits sans devoir réapprendre un nouveau langage.<br /><br />Dans cette page je vais vous proposer de réaliser un programmateur pour microcontrôleurs ATMEL AT89C1051 et AT89C2051. Vous trouverez aussi en téléchargement gratuit la <span class="IL_AD" id="IL_AD2">documentation</span> et tous les outils nécessaires pour créer vos programmes, les simuler et programmer les puces.<br /><br /><a href="http://www.blogger.com/post-edit.g?blogID=9099247261227974222&postID=1764961475263618622" name="1"></a><br /><br /><h2><span style="font-size: small;">1. Le schéma</span></h2>Le schéma utilisé a été fait en suivant de près les indications données par l’auteur du <span class="IL_AD" id="IL_AD3">logiciel de programmation</span>. Je serais assez bref sur son fonctionnement.<br /><br />Voici le schéma :<br /><br /><br /><br /><br /><br /><br /><br /><center><img height="640" src="http://electroremy.free.fr/im/elec-mo-atmel/schema.gif" width="452" /></center><br clear="ALL" /><br /><br /><br /><br /><br /><br /><br />L’alimentation est très classique, elle utilise un régulateur 7805.<br /><br />Les transistors et les diodes zeners servent à générer les niveaux de tension requis sur la broche RST pour la programmation ou la lecture de la puce. Sans tension de commande sur T2 et T3, T1 envoie une tension de 12V sur RST. Si T2 est commandé, la tension chute à 5V, si T3 est commandée, elle tombe à 0V.<br /><br />Le port parallèle n’ayant pas assez de broches, la programmation est faite en série.<br /><br />Le circuit CD4021 est un multiplexeur, il est utilisé pour lire l’octet présenté par l’Atmel sur son port P1. Voici le brochage et la table de vérité du CD4021 :<br /><br /><br /><br /><br /><br /><br /><br /><center><img height="400" src="http://electroremy.free.fr/im/elec-mo-atmel/cd4021.gif" width="333" /></center><br clear="ALL" /><br /><br /><br /><br /><br />Le circuit CD4094 est un démultiplexeur ; il sert à présenter d’un seul coup un octet sur l’Atmel pour écriture, octet qui aura été transmit bit par bit via le port parallèle. Voici le brochage et la table de vérité du CD4094 :<br /><br /><br /><br /><br /><br /><br /><br /><center><img height="281" src="http://electroremy.free.fr/im/elec-mo-atmel/cd4094.gif" width="400" /></center><br clear="ALL" /><br /><br /><br /><br />Sur le schéma les numéros entre parenthèse correspondent aux numéros des broches d’un connecteur Centronix femelle. L’emploi de ce connecteur permet d’utiliser un câble d’imprimante pour connecter notre montage au port parallèle d’un ordinateur.<br /><br /><a href="http://www.blogger.com/post-edit.g?blogID=9099247261227974222&postID=1764961475263618622" name="2"></a><br /><h2><span style="font-size: small;">2. La liste des composants</span></h2><tt>IC1 : Support tulipe pour Atmel DIL 20 broches<br />IC2 : CD4021<br />IC3 : CD4094<br />REG1 : Régulateur 7805 en boîtier TO220<br />T1 = T2 = T3 : BC547B<br />D1 : Diode zener 12V 1/4W<br />D2 : Diode 1N4148<br />D3 : Diode zener 5V6 1/4W<br />D4 = D6 : Diode LED rouge basse consommation<br />D5 : Diode zener 3V3 1/4W<br />B1 : Pont de diodes 30V 500mA minimum<br />C1 = C2 = C4 = C5 : Condensateur céramique 100nf 250V<br />C5 : Condensateur chimique 470µf 35V<br />R1 = R13 : 100 Ohms 1/4W<br />R2 : 680 Ohms 1/4W<br />R3 = R4 = R5 : 3,3 KOhms 1/4W<br />R6 = R7 = R8 = R9 = R10 = R11 : 1 KOhms 1/4W<br />R12 = R14 : 2,2 KOhms 1/4W<br />+ Un interrupteur<br />+ Un connecteur Centronix 36 broches femelle pour port imprimante</tt> <br /><a href="http://www.blogger.com/post-edit.g?blogID=9099247261227974222&postID=1764961475263618622" name="3"></a><br /><h2><span style="font-size: small;">3. Les typons</span></h2>Voici le typon :<br /><br /><br /><br /><br /><br /><br /><br /><center><img height="640" src="http://electroremy.free.fr/im/elec-mo-atmel/typon.gif" width="487" /></center><br clear="ALL" /><br /><br /><br /><br /><br /><br /><br />Remarque : vous constaterez que les typons et les schémas d'implantation ne sont pas inversés; donc, il faudra placer le typon face non-imprimée contre la vitre de l'insoleuse<br /><br /><a href="http://electroremy.free.fr/download/elec-mo-atmel/prgatmel.pcb">Cliquez ici</a> pour télécharger le typon (8 ko), pour le logiciel Quickroute 3.6 lite, disponible dans les disquettes et CD-rom accompagnant la revue Electronique Pratique.<br /><br /><a href="http://electroremy.free.fr/download/elec/qr36lite.zip">Cliquez ici</a> pour télécharger le logiciel Quickroute 3.6 lite (871 ko)<br /><br />Procurez-vous tous les composants avant de réaliser votre circuit imprimé ; vous aurez peut-être à modifier le typon en fonction des dimensions de vos composants.<br /><br />Je vous recommande de placer les circuits intégrés CD4021 et CD4094 sur des supports.<br /><br /><a href="http://www.blogger.com/post-edit.g?blogID=9099247261227974222&postID=1764961475263618622" name="4"></a><br /><h2><span style="font-size: small;">4. L’implantation des composants</span></h2>Voici l’implantation des composants :<br /><br /><br /><br /><br /><br /><br /><br /><center><img height="640" src="http://electroremy.free.fr/im/elec-mo-atmel/implantation.gif" width="487" /></center><br clear="ALL" /><br /><br /><br /><br /><br /><br /><br />Faites attention il y a de nombreux straps (20). Un rond repère le sens dans lequel placer les circuits intégrés et le support d’Atmel. Le condensateur C2 est logé sous le support d’Atmel, ou côté cuivre si sa taille ne le permet pas ; cela est nécessaire pour protéger l’Atmel contre les perturbations.<br /><br /><a href="http://www.blogger.com/post-edit.g?blogID=9099247261227974222&postID=1764961475263618622" name="5"></a><br /><h2><span style="font-size: small;">5. Quelques photos</span></h2>J’ai placé mon programmateur et le transformateur dans un petit coffret en contre-plaqué :<br /><br /><br /><br /><br /><br /><br /><br /><center><img height="400" src="http://electroremy.free.fr/im/elec-mo-atmel/photo1.jpg" width="400" /></center><br clear="ALL" /><br /><br /><br /><br /><br /><br /><br />Une fiche secteur éviter d’avoir à souder et à enrouler un cordon 220V.<br /><br />J’ai disposé la plaque et pratiqué une encoche dans le coffret de façon à ce que l’on puisse facilement extraire l’Atmel de son support en le soulevant de chaque côté avec un tournevis :<br /><br /><br /><br /><br /><br /><br /><br /><center><img height="297" src="http://electroremy.free.fr/im/elec-mo-atmel/photo2.jpg" width="400" /></center><br clear="ALL" /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><center><img height="325" src="http://electroremy.free.fr/im/elec-mo-atmel/photo3.jpg" width="400" /></center><br clear="ALL" /><br /><br /><br /><br /><br /><br /><br /><a href="http://www.blogger.com/post-edit.g?blogID=9099247261227974222&postID=1764961475263618622" name="6"></a><br /><h2><span style="font-size: small;">6. Téléchargement et installation des logiciels</span></h2><br /><a href="http://electroremy.free.fr/download/elec-mo-atmel/graveur.zip">Cliquez ici</a> pour télécharger le logiciel (79 ko) pour utiliser votre programmateur (D. Laues – C. Segment). Après avoir décompressé l’archive lisez le fichier LISEZMOI.TXT.<br /><br />Si l’ordinateur utilisé est sous Windows XP, vous aurez besoin de Porttalk pour pouvoir faire fonctionner le logiciel du programmateur. <a href="http://electroremy.free.fr/download/elec-mo-atmel/porttalk.zip">Cliquez ici</a> pour télécharger Porttalk (20 ko) (Craig Peacock). Après avoir décompressé l’archive lisez le fichier LISEZMOI.TXT.<br /><br /><a href="http://electroremy.free.fr/download/elec-mo-atmel/compilateur.zip">Cliquez ici</a> pour télécharger les logiciels (702 ko) permettant de compiler vos programmes pour Atmel. (KEIL ELEKTRONIK)<br /><br /><a href="http://electroremy.free.fr/download/elec-mo-atmel/simulateur.zip">Cliquez ici</a> pour télécharger le logiciel (103 ko) permettant de simuler vos programmes pour Atmel (Adam Dybkowski).<br /><a href="http://www.blogger.com/post-edit.g?blogID=9099247261227974222&postID=1764961475263618622" name="7"></a><br /><h2><span style="font-size: small;">7. Utilisation du programmateur</span></h2>Voici la procédure à respecter pour utiliser le programmateur :<br /><ul><li>Lancer le logiciel pour mettre les sorties du port dans un état correct </li><li>Quitter le logiciel </li><li>Insérer la puce à programmer ou à lire dans le programmateur </li><li>Raccorder le programmateur au port </li><li>Raccorder le programmateur au 220V </li><li>Allumer le programmateur </li><li>Lancer le logiciel </li><li>Si une erreur est signalée changer le port dans le menu config </li><li>Utiliser le logiciel pour lire ou graver des fichiers BIN </li><li>Remarque : si le fichier BIN n'est pas complété à 1 ou 2Ko avec des octets à 255 une (fausse) erreur est signalée </li><li>Quitter le logiciel </li><li>Eteindre le programmateur </li><li>Débrancher le port et le 220V </li><li>Retirer la puce du programmateur</li></ul>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-3442961482921053297.post-29393666394377413942011-05-04T16:03:00.000+01:002020-02-16T10:46:55.788+01:00Schema Micro Espion FM 88-108 Sans fil<div class="separator" style="clear: both; text-align: center;">
<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEje27fxT6BH3xqE8E5annb5yIgXc9OpRqPSijRdpp34PpecaLUeaEmKxQ4dorqKr0OoPUGRkiv2lOptj8bfDF1_rtRMW1GhepNKTCiR229-YWAjVVEG-NP3V726yasEU4kS5auOQQou8EU/s1600/Mini-emmeteure-fm.gif" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" height="88" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEje27fxT6BH3xqE8E5annb5yIgXc9OpRqPSijRdpp34PpecaLUeaEmKxQ4dorqKr0OoPUGRkiv2lOptj8bfDF1_rtRMW1GhepNKTCiR229-YWAjVVEG-NP3V726yasEU4kS5auOQQou8EU/s200/Mini-emmeteure-fm.gif" width="200" /></a></div>
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Ce transmetteur FM fonctionne dans la bande de fréquence 88-108 Mhz, ce montage électronique de faible puissance et est facile à réaliser et à l'utiliser dans nos maisons et avec laquelle nous pouvons commencer à pratiquer un peu de la transmission radio. <br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhsXnZnyGzuFK8fFpFa8zOanyPBESW6zxB97IYCOT5SWIC2EWZN6eOqyRdUwqc4S9RPMnqg6mU8sDf2jR2FIUTFIr6-3tUnOWGAJjtoUOr3EB8zw6YZUG-H30AK-ep5V9bHzdLMqVuS6G0/s1600/schema-fm-mini.gif" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhsXnZnyGzuFK8fFpFa8zOanyPBESW6zxB97IYCOT5SWIC2EWZN6eOqyRdUwqc4S9RPMnqg6mU8sDf2jR2FIUTFIr6-3tUnOWGAJjtoUOr3EB8zw6YZUG-H30AK-ep5V9bHzdLMqVuS6G0/s320/schema-fm-mini.gif" width="312" /></a></div>
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La construction de bobine :<br />
N est le nombre de tours = 5 tours<br />
D: est le rayon de la bobine en pouces = 0,5 cm <br />
L: est la longueur en pouces = 1 cm <br />
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Modulation de fréquence (FM).<br />
La modulation FM est effectuée sur la base-émetteur du transistor Q2 et à ce <span class="IL_AD" id="IL_AD3">moment</span> il ya une somme de la fréquence d'arrivée (audio) et la fréquence de la sortie de l'oscillateur. f 1= Entrée pour chaque sortie de fréquence d'entrée deux fréquences sont les suivantes: f = 1 f osc- osc f- f in y f 2= f in+ f osc . f dans et f 2 = f + f dans osc. <br />
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Antenne :<br />
Nous soudure d'un mètre la longueur de câble un à la fin du premier tour de la boucle qui est le plus proche au collecteur du transistor Q2.<br />
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Ajustement :<br />
Pour fonctionner correctement, nous devons ajuster VR1 afin que nous ayons de la tension collecteur Q1 entre 1,5 et 1,9 volts.<br />
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Réglage de la fréquence : <br />
Tune d'une radio FM environ 95 MHz (dans une zone où il n'ya pas de station) suite à quelques mètres du circuit. Nous appliquons ensuite la tension à l'émetteur et a commencé à changer le réglage de la C2 lentement jusqu'à ce que le bruit de fond de silence, une fois atteint, nous pouvons tester les <span class="IL_AD" id="IL_AD1">performances</span> de moduler notre voix dans le microphone. Nous essayons aussi de changer la fréquence de transmission séparément ou ensemble des spires de la bobine. Lorsque se sont réunis pour diminuer la fréquence et augmentation de la séparer. <br />
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjXrept7Uv1BHY6vv8393G7KLmNShUEaaSOfK9XEx1Lpth8tYJ9lsvaC-RYywvZbn7CVY24hFpEMUmb0mzz7J_PIgyuvIvxDVwt-IJJoWSmRbhHfTc6Qjjbt75VTHRZJMjV4Jsv9D6jip8/s1600/mini-imprimer-3.gif" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjXrept7Uv1BHY6vv8393G7KLmNShUEaaSOfK9XEx1Lpth8tYJ9lsvaC-RYywvZbn7CVY24hFpEMUmb0mzz7J_PIgyuvIvxDVwt-IJJoWSmRbhHfTc6Qjjbt75VTHRZJMjV4Jsv9D6jip8/s1600/mini-imprimer-3.gif" /></a><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhqDD9uCz7F7jdeuZY15KwhB5AiyjwTX22P3tag8pUfklRBSXincrj0sY7WDaxipFzsjLNtBRdZmYrUpGPJ46wsI1Tnf6bzaoJ52TuTTpqSCs-HaBI03dWBV17UFWCSaUispJ52O8sqTYM/s1600/imprimer1.gif" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhqDD9uCz7F7jdeuZY15KwhB5AiyjwTX22P3tag8pUfklRBSXincrj0sY7WDaxipFzsjLNtBRdZmYrUpGPJ46wsI1Tnf6bzaoJ52TuTTpqSCs-HaBI03dWBV17UFWCSaUispJ52O8sqTYM/s1600/imprimer1.gif" /></a><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiyKV03fdWEtlq9uRCHIjyREBD_Ozm4DkpPbpsCDiNOVJohb8reglyURQsM0LsA5bR5ORYo8SxOwfWs_OdyCUK7H1u-iUKFGL0oPSEq3bhwqb7FytgkCzrNh3bcIlAqn2OILE3Keajf4tI/s1600/Mini-emetteur-fm.gif" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="171" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiyKV03fdWEtlq9uRCHIjyREBD_Ozm4DkpPbpsCDiNOVJohb8reglyURQsM0LsA5bR5ORYo8SxOwfWs_OdyCUK7H1u-iUKFGL0oPSEq3bhwqb7FytgkCzrNh3bcIlAqn2OILE3Keajf4tI/s320/Mini-emetteur-fm.gif" width="320" /></a></div>
Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-3442961482921053297.post-91379120874275766322011-05-04T15:58:00.000+01:002011-05-18T16:54:51.645+01:00Declencheur crepusculaire au declencheurs a lumiere a TR 2N2222<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiKrT7WvBOCQp5-iRmTQMsRiDrSaYNQk6NAl1XPygAxZt05hRYi6DLMX4kz_Oijh7ZLKrPUtqmynSgBVp1POT8XHbXmw37QjCswVkvo2HpHKiVrQrzVAcP5BJmv64OfQj9jGtTqHt1Q9sg/s1600/light-activate-circuit-schema.GIF" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" height="200" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiKrT7WvBOCQp5-iRmTQMsRiDrSaYNQk6NAl1XPygAxZt05hRYi6DLMX4kz_Oijh7ZLKrPUtqmynSgBVp1POT8XHbXmw37QjCswVkvo2HpHKiVrQrzVAcP5BJmv64OfQj9jGtTqHt1Q9sg/s200/light-activate-circuit-schema.GIF" width="156" /></a>Aujourd'hui, nous avons deux circuit simple est un commutateur à transistor à la base du transistor 2N2222 avec un diviseur de tension. Le premier est le 1K 100K Potentiomètre plus résistance de la couche de protection.Deuxièmement, la résistance de LDR. Il s'agit de la <a name='more'></a>représentation schématique du circuit declencheurs a lumiere</div><br />Lorsque les changements de lumière sur la surface de la LDR, LDR est la résistance. Le plus de lumière, plus la résistance de la LDR, le moins de frottement, plus la tension de celui-ci. Les moins de lumière, plus la résistance et donc plus la tension à ses bornes.<br />la liste des composantes électronique :<br />D1 = 1N914<br />Q1=2N2222 OR similar NPN transistor Q1 = 2N2222 ou transistor NPN similaires<br />R1 =Photoresistor R1 = photorésistance<br />R2=50K Variable Resistor R2 = résistance variable 50K<br />R3=1K R3 = 1K<br />Relay = 5 to 6 volt relay. Relais = 5 à 6 volts relais.<br /><br /><br />Lorsque la tension augmente, le SD du transistor 2N2222 et donc de la glace augmente en conséquence, jusqu'à ce que le courant est suffisant pour activer le relais.<br /><br /> La quantité de lumière qui peut être changé pour activer le relais par un changement dans le potentiomètre 100k. tout changement dans le potentiomètre vers la perte de tension des effets LDR parce qu'ils sont tous deux membres du diviseur de tension sont décrites ci-dessus.<br /><br />La diode 1N4001 est utilisé pour éliminer le stress de plus, si le relais est désactivé. Il est très important de la diode, comme on peut être porté atteinte sans le transistor.<br />Avant de servir le travail dans la mesure où l'activation. Il ne détecte pas un problème, clair ou foncé ou de faire fonctionner le relais, mais ce sera un problème si les relais sont libérés. À ce stade, le circuit a une grande hystérésis. Par conséquent, nous devons continuer à renforcer le signal avant que nous appliquons à le transistor de commutation.<br /><br /> Nous BC517 Darlington paire de transistors NPN. Devrions-nous 2N2222 entre lui et le LDR, comme le montre le circuit suivant:<br /><br /><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhL1ua62owAUjC2ats3OIBEx1vb5Dsbxd5G9xgv4Fnt0-buNxRih6FVcvgvLvz2Z2cAWaU3U-ILuSM0tT0LDBvDs9HKFq2wGH1HPNy9XATq0dwR6fdNrMjiwzbcMVX8q5YL1ihZ_XgiBc0/s1600/dark-activated-circuit-schema.GIF" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhL1ua62owAUjC2ats3OIBEx1vb5Dsbxd5G9xgv4Fnt0-buNxRih6FVcvgvLvz2Z2cAWaU3U-ILuSM0tT0LDBvDs9HKFq2wGH1HPNy9XATq0dwR6fdNrMjiwzbcMVX8q5YL1ihZ_XgiBc0/s1600/dark-activated-circuit-schema.GIF" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><br />Cet ajout augmente la sensibilité du circuit. La fenêtre d'hystérésis est fortement diminué, mais il reste encore une région connue comme le relais est activé, il ne sera pas mis en rotation par la même quantité de lumière qui existaient juste avant l'activation.<br />Seul un ajustement et qui (bien sûr) potentiomètre. Votre but est de faire fonctionner le circuit lorsque le relais est égale ou moins de lumière à la valeur prédéfinie. La meilleure façon de faire est la suivante:<br /><br /> Que le LDR par la quantité de lumière vous éclaire. Tenez le potentiomètre dans la plus grande valeur. Ensuite, démarrez lentement tournant le potentiomètre et réduire la traînée. Si vous "cliquez" du relais écoute pour trouver votre référence. Dès ce moment, chaque fois que la lumière est inférieur ou égal à (ou plus si le circuit est allumé la lumière "selon la configuration) est à la lumière que vous avez créé cette préférence est activée, le relais.Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-3442961482921053297.post-46499152108919582022011-05-04T15:48:00.000+01:002011-05-18T16:54:51.645+01:00Schema Electronique du micro emetteur FM<a 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" 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" width="200" /></a><br /><br />Le schéma de principe du micro émetteur F.M. est d'une simplicité déconcertante puisqu'il n'est constitué que de deux étages. Pourtant son fonctionnement ne pose aucun problème, les résultats obtenus étant d'une qualité étonnante. Les sons sont captés par un micro à électret. Celui-ci est alimenté à l'aide <a name='more'></a>d'une cellule de filtrage RC constituée des résistances R1, R2 et du condensateur C2. Les signaux sont transmis au transistor amplificateur T1 via le condensateur C5 destiné à bloquer la composante continue.<br /><br /><div style="text-align: center;"><img alt="" src="data:image/gif;base64,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" /></div><br /><br />Une fois amplifiés, ils sont prélevés sur le collecteur de T1 à l'aide d'une capacité (C4) afin d'attaquer la base du transistor T2 qui constitue l'émetteur proprement dit. C'est un transistor monté en oscillateur dont la fréquence de fonctionnement est fixée par le réseau LC placé dans son circuit de collecteur. Le condensateur C9 de 10pF entretient les oscillations du circuit. Les signaux B.F. injectés dans la base du transistor modifient faiblement la fréquence d'oscillation, ce qui produit une modulation de la fréquence d'émission. Les signaux H.F. peuvent être prélevés directement sur le collecteur du transistor à l'aide d'un condensateur (C8) de très faible valeur et être ensuite dirigés vers l'antenne émettrice. Le réglage du condensateur ajustable C7 permet de caler la fréquence d'émission sur la bande F.M. de radiodiffusion. <br /><br /><strong>Tracé du circuit imprimé </strong>(à l'échelle pour la self gravée; au pire on peut en fabriquer une avec la formule de résonance)<strong> :</strong><br /><br /><div style="text-align: center;"></div><br /><br /><div style="text-align: center;"><strong>Implantation des composants</strong> :</div><br /><br /><div style="text-align: center;"><a 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" /></div><br /><div style="text-align: center;"><strong>Réalisation pratique</strong></div><br />La réalisation pratique du micro émetteur a été réduite à sa plus simple expression. En effet, la self L1 a été réalisée en piste de cuivre sur le circuit imprimé. Il suffira de mettre en place l'unique strap afin de la relier au condensateur ajustable. Il faudra débuter le câblage par la mise en place de ce strap et de toutes les résistances. On soudera ensuite les condensateurs et les transistors. L'un d'entre eux, T2, pourra être choisi parmi divers modèles. On prendra de préférence le BF199. Mais nous étant aperçus que son approvisionnement pouvait poser des problèmes, nous avons procédé à des essais avec d'autres modèles.<br /><br />Ainsi, le 2N2222 fonctionne très bien, de même que les BC547 et BC550. Seulement, les brochages étant différents, il a été prévu sur la platine un trou supplémentaire qui permettra d'orienter convenablement le transistor choisi. <br /><br /><div style="text-align: center;"><strong>Réglages et essais</strong></div>On réglera le récepteur F.M. sur le bas de la bande, aux alentours de 89MHz. L'émetteur étant alimenté par une pile de 9V, on manœuvrera le condensateur ajustable de manière à recevoir l'émission sur le récepteur. Pour cela, on utilisera un tournevis en plastique. Attention, car le réglage est très pointu. Une fois la réception obtenue, on pourra peaufiner ce réglage à l'aide du récepteur. Il se peut que durant les premières minutes d'émission, la fréquence dérive. C'est normal, la fréquence de l'émetteur n'étant pas stabilisée par un quartz. Lorsque nous avons procédé à des essais, sans antenne sur l'émetteur, nous avons obtenu une portée de plus de dix mètres à travers les murs d'une pièce, avec une alimentation par pile passablement déchargée. Le moindre bruit est audible tant la sensibilité du microphone est élevée. Il convient d'ailleurs de ne pas placer celui-ci trop près de la source sonore car il y aurait alors un risque de saturation. Le montage achevé, il pourra être placé dans un petit boîtier prévu pour contenir une pile de 9V. Il sera nécessaire de prévoir un interrupteur de mise en ou hors tension. Un trou devra être pratiqué pour le passage du microphone. <strong></strong><br /><strong><br />Résistances</strong><br />* R1: 4,7 kΩ (jaune, violet, rouge)<br />* R2, R4: 47 kΩ (jaune, violet, orange)<br />* R3: 2,2 MΩ (rouge, rouge, vert)<br />* R5: 1 kΩ (marron, noir, rouge)<br />* R6, R7: 10 kΩ (marron, noir, orange)<br />* R8: 100Ω (marron, noir, marron)<br /><br /><strong> Condensateurs</strong><br />* C1: 10 µF/16V<br />* C2: 47 µF/16V<br />* C3: 1 nF<br />* C4, C5: 100 nF<br />* C6, C10: 330 pF<br />* C7: condensateur ajustable 3/30 pF<br />* C8: 1,5 pF<br /><strong><br />Semi-conducteurs</strong><br />* T1: BC548 ou BC 547C<br />* T2: BF199 ou 2N2222<br /><br /><strong> Autre</strong><br />* 1 microphone à électret 2 fils<br />* 1 connecteur pour <span class="IL_AD" id="IL_AD2">pile 9V</span><br />* 1 interrupteur unipolaire<br />* 1 boîtier plastiqueUnknownnoreply@blogger.com0tag:blogger.com,1999:blog-3442961482921053297.post-20136881145353422592011-05-04T15:40:00.000+01:002011-05-18T16:54:51.645+01:00Schema allumage progressif de 12 V en courant continu<h3 class="post-title entry-title"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEincd1kNOSwdD_lvuMtTxWVNckY6BrBv1ZVaWBm7TtaIuKjvT_SIqhIpnEjSp-ovtZ4tjoWe6Sjp_qHCR_1RLDdGAlLJjLNIjajNqAPS-IXdsDmjT9prD_RSJQkjg8VR18cGtPYm-rSgoo/s1600/tete.JPG" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" height="155" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEincd1kNOSwdD_lvuMtTxWVNckY6BrBv1ZVaWBm7TtaIuKjvT_SIqhIpnEjSp-ovtZ4tjoWe6Sjp_qHCR_1RLDdGAlLJjLNIjajNqAPS-IXdsDmjT9prD_RSJQkjg8VR18cGtPYm-rSgoo/s200/tete.JPG" width="200" /></a><span style="font-size: x-small;"><span style="font-weight: normal;"> Avec le système PWM, c’est-à-dire à modulation de largeur d’impulsion, il est possible d’allumer graduellement une ampoule 12 V continu en un laps de temps réglable de 2 à 25 secondes. Très utile en voiture (si vous avez un peu l’esprit “tuning”) ou à la maison si vous utilisez des ampoules basse <a name='more'></a>tension en courant continu (maison solaire) ou si vous voulez augmenter encore l’esthétique rétro de votre ampli à lampes.</span></span> </h3><h3 class="post-title entry-title"><span style="font-size: x-small;"><span style="font-weight: normal;">Si nous relions un générateur d’onde en dent de scie et un générateur de rampe aux entrées d’un comparateur, on obtient un circuit PWM (Pulse Width Modulation) permettant d’allumer graduellement une ampoule en 12 Vcc. Ce montage permet également de régler à volonté le laps de temps que mettra l’ampoule pour passer de l’extinction à sa complète luminosité (réglable entre 2 et 25 secondes).</span></span></h3><div class="post-header"></div><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEixxUvpXEkWUd56buvo0jXQieKo_JKYOoHoOoQiO9aS2AFp9OAEHevzezd2mzUSOHjud__j_x0bEm1Yw4NfuhTf4w9yVzoyl06S9NB1qfOvdMNBO9o61SHh1-caWqWo4wj6tQs4xxUDfhPN/s1600/fig5.jpg" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img alt="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEixxUvpXEkWUd56buvo0jXQieKo_JKYOoHoOoQiO9aS2AFp9OAEHevzezd2mzUSOHjud__j_x0bEm1Yw4NfuhTf4w9yVzoyl06S9NB1qfOvdMNBO9o61SHh1-caWqWo4wj6tQs4xxUDfhPN/s400/fig5.jpg" border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEixxUvpXEkWUd56buvo0jXQieKo_JKYOoHoOoQiO9aS2AFp9OAEHevzezd2mzUSOHjud__j_x0bEm1Yw4NfuhTf4w9yVzoyl06S9NB1qfOvdMNBO9o61SHh1-caWqWo4wj6tQs4xxUDfhPN/s400/fig5.jpg" /></a> Ce circuit pourra être installé, par exemple, à l’intérieur d’un amplificateur (l’un de ceux que nous vous avons proposé, pourquoi pas ?) de telle manière que l’ampoule éclairant le Vu-mètre s’illumine progressivement (dans un amplificateur à lampes, cela s’impose presque !). Après tout les <span class="IL_AD" id="IL_AD2">audiophiles</span> ont aussi deux yeux entre les oreilles.<br />Mais c’est peut-être dans votre voiture que vous voudrez le monter : vous pourrez alors allumer les plafonniers ou même les feux de position et les lanternes de manière progressive (vous aurez même la satisfaction d’éviter aux ampoules du véhicule tout choc thermique pouvant abréger leur durée de vie). Là encore, si vous avez une voiture de collection, cela va presque de soi…Malades du “tuning”, vous nous avez compris.<br /><img alt="" height="84" 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" width="320" /><br />Figure 1 : Ce dessin représente l’allumage d’une lampe à trois moments différents. Sa luminosité est inversement proportionnelle à la durée pendant laquelle le rapport cyclique du signal reste au niveau logique haut. En d’autres termes, la lampe augmente progressivement sa luminosité au fur et à mesure que le niveau logique haut du signal rétrécit.<br />Le schéma électrique<br />Dès que l’alimentation est fournie au circuit, le générateur de courant LM334 IC1 (voir le schéma électrique de la figure 2) charge C3 au maximum et produit à ses bornes une rampe de tension allant de 0 à 12 V en une durée variable de 2 à 25 secondes en fonction de la position du curseur du trimmer R5. Quand nous <span class="IL_AD" id="IL_AD1">coupons</span> cette alimentation, le transistor TR1 entre en conduction et décharge C3 de telle manière qu’à la mise sous tension suivante le cycle recommence avec le même laps de temps, fonction de R5.<br />L’opérationnel IC2/A, contenu dans le LM358, est utilisé comme oscillateur pour produire des ondes en dent de scie à une fréquence d’environ 1 600 Hz. C’est la valeur mesurée sur notre prototype, mais le vôtre aura peut-être quelques centaines de Hz en plus ou en moins (cela n’affectera en rien le bon fonctionnement du montage). L’onde en dent de scie présente aux bornes de C4 est acheminée à l’entrée non-inverseuse 3 de IC2/B, un comparateur de tension constitué du second amplificateur opérationnel contenu dans le LM358. La rampe de tension, acheminée par l’entrée inverseuse 2 de ce même comparateur, détermine le rapport cyclique variable du signal PWM à onde carrée à la sortie 1 de IC2/B.<br />La luminosité de la lampe est inversement proportionnelle au temps pendant lequel le rapport cyclique du signal PWM demeure au niveau logique haut, comme le montre la figure 1 : plus large est l’impulsion du rapport cyclique, plus longtemps le signal reste au niveau logique haut et plus faible est la luminosité de l’ampoule ; au fur et à mesure que la largeur de l’impulsion de niveau logique haut rétrécit, la luminosité de l’ampoule augmente jusqu’à atteindre la valeur maximale. Nous avons utilisé un MOSFET P IRF9540 “costaud” : il est en effet capable de supporter une charge jusqu’à 10 A, ainsi nous pourrons utiliser une ampoule très gourmande (plus de 100 W ! Attention à la batterie du véhicule tout de même).<br />En outre, grâce au système PWM, nous pouvons relier à notre circuit des ampoules assez puissantes (et voraces…) sans que le MOSFET ne chauffe excessivement car, travaillant comme interrupteur et non dans sa zone linéaire, il dissipe une puissance minimale et seulement pendant la phase de mise sous tension.<br />Que cela ne vous empêche pas toutefois, si vous pensez utiliser des ampoules consommant plusieurs ampères, de monter le MOSFET sur un dissipateur (type ML26) ou bien, comme le montre la figure 8, contre la paroi du boîtier métallique. Mais cette dernière considération nous fait sortir du schéma électrique pour entrer de plain pied dans la réalisation pratique.<br /><br /><img alt="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEipwwlFq3Zh63tkzG5NVbqni2Xxe5yEdjL25lO8aMuHeaughUZ5t0AUuySTM9aYCKkK40q8zHdTY9vByGxSx9fGo6SUourrHPzG9onCKYjCkIc0NEkS0kox7rvaQadnnyueWJ9vJg4yZNSt/s400/fig2.jpg" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEipwwlFq3Zh63tkzG5NVbqni2Xxe5yEdjL25lO8aMuHeaughUZ5t0AUuySTM9aYCKkK40q8zHdTY9vByGxSx9fGo6SUourrHPzG9onCKYjCkIc0NEkS0kox7rvaQadnnyueWJ9vJg4yZNSt/s400/fig2.jpg" /><br />Figure 2 : Schéma électrique du circuit à PWM variable pour allumer progressivement une ampoule 12 V en un temps réglable à volonté de 2 à 25 secondes (à l’aide du trimmer R5). Pour obtenir un système PWM, nous avons relié aux entrées du comparateur IC2/B un générateur d’onde en dent de scie (l’opérationnel IC2/A) et un générateur de rampe (le circuit intégré IC1 avec le condensateur C3).<br /><img alt="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgg6CH7GmBXDDzrzTWSschL-KrVpD-OgEt7wx-LB6Y2zTeTS9L0Sk1Fx0SP8BXYYp0CCty481gifX4HscjaZ1HuiwdV5l1exKVQKxqKwu96HY8p47BfFyKHFhdC0eBUfYIEXecGd22FWYpf/s400/fig3.jpg" height="198" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgg6CH7GmBXDDzrzTWSschL-KrVpD-OgEt7wx-LB6Y2zTeTS9L0Sk1Fx0SP8BXYYp0CCty481gifX4HscjaZ1HuiwdV5l1exKVQKxqKwu96HY8p47BfFyKHFhdC0eBUfYIEXecGd22FWYpf/s200/fig3.jpg" width="200" />Figure 3 : Brochages du circuit intégré LM358 (double amplificateur opérationnel) vu de dessus, du MOSFET IRF9540 vu de face et du transistor BC557 et du circuit intégré LM334 (tous deux en boîtiers TO 92) vus de dessous.<br /><br /><img alt="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh9u4BY4aW8OtLgCCLFVbGYMhdf8xgoEeqIOFDj6rOCdlUmjSwSQuPTa-nVWdeLn1UWIQd7KjLiwJPx5t2UJzlZp-ahWwcZCAKw1FfAAeXEf6B-Dub2ckfhLPUny-6pDYzD7Q7xbIDDQYsk/s400/fig4a.jpg" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh9u4BY4aW8OtLgCCLFVbGYMhdf8xgoEeqIOFDj6rOCdlUmjSwSQuPTa-nVWdeLn1UWIQd7KjLiwJPx5t2UJzlZp-ahWwcZCAKw1FfAAeXEf6B-Dub2ckfhLPUny-6pDYzD7Q7xbIDDQYsk/s400/fig4a.jpg" />Figure 4a : Schéma d’implantation des composants de la platine de l’allumage progressif pour ampoule 12 V. Le MOSFET canal P que nous avons choisi supporte une charge jusqu’à 10 A. Pour un montage correct, sa semelle métallique doit “regarder” R1-R2.<br /><br /><img alt="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgF1CaxHKUYF1TazVhUbfOescW7zX7Tcv2IdDF_nt9s8ssMZK6rwAI72HD_jf1cyk1z1ReNU92U1my3VkaliNKwSGfpUOgLDA2n-PVC6b6kF6wSWtdWn1_cI2IUlZtkHMI9ihVSrhQC_qZ2/s400/fig4b1.jpg" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgF1CaxHKUYF1TazVhUbfOescW7zX7Tcv2IdDF_nt9s8ssMZK6rwAI72HD_jf1cyk1z1ReNU92U1my3VkaliNKwSGfpUOgLDA2n-PVC6b6kF6wSWtdWn1_cI2IUlZtkHMI9ihVSrhQC_qZ2/s400/fig4b1.jpg" />Figure 4b-1 : Dessin, à l’échelle 1, du circuit imprimé double face à trous métallisés de la platine de l’allumage progressif pour ampoule 12 V EN1648, côté soudures.<br /><br /><br /><img alt="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjAPd88IG_71K9qzyV01v7frgQ7e-upE6dM7V-UrpINH-zl6pD9DonXxU0ObAlEF5gXopr7qPbH-O1Y1r2cXmbSnPp19pI0cHOSlfhICch0C8orCWxHp3U_p8V5hImi_LsBSFbRsWnJCk2Q/s400/fig4b2.jpg" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjAPd88IG_71K9qzyV01v7frgQ7e-upE6dM7V-UrpINH-zl6pD9DonXxU0ObAlEF5gXopr7qPbH-O1Y1r2cXmbSnPp19pI0cHOSlfhICch0C8orCWxHp3U_p8V5hImi_LsBSFbRsWnJCk2Q/s400/fig4b2.jpg" />Figure 4b-2 : Dessin, à l’échelle 1, du circuit imprimé double face à trous métallisés de la platine de l’allumage progressif pour ampoule 12 V EN1648, côté composants.<br /><br /><br /><div style="text-align: center;"><img alt="" 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" /></div>Figure 5 : Photo d’un des prototypes de la platine de l’allumage progressif pour ampoule 12 V EN1648. Le trimmer visible en bas sert à régler la durée de l’allumage entre 2 et 25 secondes.<br /><br />Liste des composants<br />R1 ........ 47<br />R2 ........ 10 k<br />R3 ........ 10 k<br />R4 ........ 1 k<br />R5 ........ 10 k trimmer<br />R6 ........ 100<br />R7 ........ 10 k<br />R8 ........ 10 k<br />R9 ........ 100 k<br />R10 ....... 47 k<br />R11 ....... 10 k<br />R12 ....... 100 k<br />R13 ....... 47<br />C1 ........ 100 μF électrolytique<br />C2 ........ 10 μF électrolytique<br />C3 ........ 10 μF électrolytique<br />C4 ........ 3,3 nF polyester<br />C5 ........ 100 nF polyester<br />DS1 ....... 1N4150<br />DS2 ....... 1N4150<br />TR1 ....... PNP BC557<br />MFT1 ...... MOSFET P IRF9540<br />IC1 ....... LM334<br />IC2 ....... LM358<br /><br />Note : les résistances sont des 1/4 de W.<br /><br /><br />La réalisation pratique<br />Ce montage est à la portée d’un débutant.<br />Pour construire ce petit (mais puissant) appareil, il vous faut le circuit imprimé double face à trous métallisés EN1648, sur lequel tous les composants seront montés, hormis peut-être le MOSFET de puissance (voir figure 8) que vous pourrez fixer contre une paroi du boîtier métallique, à l’intérieur : la figure 4b-1 et 2 donne les dessins des deux faces à l’échelle 1. Fabriquez-le ou procurez-vous le.<br />Quand vous l’avez devant vous, montez d’abord le <span class="IL_AD" id="IL_AD3">support</span> de IC2 et vérifiez bien ce premier travail (ni court-circuit entre pistes ou pastilles ni soudure froide collée) ; puis montez tous les autres composants en allant des plus bas (résistances, diodes) aux plus hauts (trimmer, condensateurs, transistor et LM334 en boîtiers TO 92, MOSFET –voir figures 7 et 8– et borniers).<br />Contrôlez avant soudure l’orientation des composants polarisés (électrolytiques, diodes –bagues vers R7 et vers C5–, transistor et LM334 –méplats vers la gauche– et circuit intégré, n’insérant ce dernier dans son support qu’après le montage dans le boîtier et la dernière connexion réalisée).<br />Aucune difficulté si vous regardez bien les figures 4a à 8 et la liste des composants.<br />Vérifiez bien, plusieurs fois, l’identification et l’orientation des composants et la qualité de toutes les soudures, puis passez à l’installation dans le boîtier.<br /><br />L’installation dans le boîtier<br />Bien sûr, ce montage dans un boîtier métallique est facultatif : si vous l’utilisez, comme nous vous l’avons suggéré, pour l’allumage progressif du rétro-éclairage des Vu-mètres de votre amplificateur, vous monterez la petite platine directement dans ce dernier.<br />Si ce n’est pas le cas, prenez le petit boîtier en aluminium (voir figures 6 et 8) et percez quatre trous au fond en vous servant de la platine (déjà percée) comme gabarit de perçage ; dans la foulée, percez deux trous de 10 mm environ dans les deux grands côtés opposés.<br />Dans les quatre trous, montez quatre entretoises métalliques de 5 mm ; dans les deux trous insérez deux passe-fils en caoutchouc; fixez la platine sur les entretoises avec ses quatre vis et faites entrer/sortir les deux fils d’alimentation 12 Vcc et les deux fils allant à l’ampoule à piloter. Utilisez du fil dont le diamètre soit en rapport avec l’intensité consommée par la charge (ne lésinez pas sur le diamètre).<br />Si vous avez choisi l’option “fixation du MOSFET contre la paroi intérieure” ou si vous dotez ce MOSFET d’un dissipateur, n’oubliez surtout pas d’interposer entre sa semelle métallique et le métal du support dissipateur un kit d’isolation composé d’un canon isolant pour le boulon et d’un mica pour la surface de la semelle.<br />Toutes les connexions étant faites et vérifiées, vous pouvez insérer le circuit intégré dans son support avec beaucoup de soin et dans le bon sens –repère-détrompeur en U vers C5. Si vous êtes débutant, prenez tout de suite cette excellente habitude.<br /><br /><img alt="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgiX_RPj-wGCC2Ys2n-4e5C-wEYdeGLusLtZq-92dbqYpVVi75RGVOfW_V7QWJ6sCJ-3CPK0qzOYyId_a5BOCrBDy4CknvFP-EcxNmp07rK950IIuXnjh7CHfnkOaq8U8vJYCFYeLMSXY9I/s400/fig6.jpg" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgiX_RPj-wGCC2Ys2n-4e5C-wEYdeGLusLtZq-92dbqYpVVi75RGVOfW_V7QWJ6sCJ-3CPK0qzOYyId_a5BOCrBDy4CknvFP-EcxNmp07rK950IIuXnjh7CHfnkOaq8U8vJYCFYeLMSXY9I/s400/fig6.jpg" />Figure 6 : Photo d’un des prototypes de la platine de l’allumage progressif pour ampoule 12 V EN1648 installée dans son boîtier MOX30 (vous devrez le percer pour fixer la platine au fond à l’aide de quatre entretoises, pour laisser entrer les deux fils d’alimentation 12 V et pour laisser sortir les deux fils allant à la charge).<br /><br /><img alt="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj0CfvdPbxUzBu6Ie_WLXz-XtYmEqHg9AOxCW5CHc3GG7dHok2KY9SvdQTdRNZVzAMvcvZZCfOIlLqV1h11Hv4lyTyB9lBQP0saLEzZulopwirqhbWg5Hm6dCiXZVg3MrtNMokgk4C16BpC/s400/fig7.jpg" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEj0CfvdPbxUzBu6Ie_WLXz-XtYmEqHg9AOxCW5CHc3GG7dHok2KY9SvdQTdRNZVzAMvcvZZCfOIlLqV1h11Hv4lyTyB9lBQP0saLEzZulopwirqhbWg5Hm6dCiXZVg3MrtNMokgk4C16BpC/s400/fig7.jpg" />Figure 7 : Pour assurer au MOSFET MFT1 une dissipation de chaleur élevée, montez-le directement sur le boîtier métallique (figure 8), sans oublier d’utiliser le kit d’isolation (canon isolant et mica).<br /><br /><img alt="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgMjhUPKljONC-b0J9v-Gv2xulPnEMksV1ztNjZF7coELc36gccvmVIlxlMDDRTGrFkh6yy3bdfdCkvjqgHi-dbwVX6kAHDt8BhTHQCn-C-PpMaxNck8rQu22ClkKDrEsMNK13IsAM9j31i/s400/fig8.jpg" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgMjhUPKljONC-b0J9v-Gv2xulPnEMksV1ztNjZF7coELc36gccvmVIlxlMDDRTGrFkh6yy3bdfdCkvjqgHi-dbwVX6kAHDt8BhTHQCn-C-PpMaxNck8rQu22ClkKDrEsMNK13IsAM9j31i/s400/fig8.jpg" />Figure 8 : Avant d’insérer la platine dans le boîtier métallique, percez quatre trous au fond de ce dernier (utilisez la platine comme gabarit de perçage) et vissez quatre entretoises métalliques de 5 mm (cette légère surélévation de la platine par rapport au fond du boîtier métallique évitera tout court-circuit).<br />Percez les deux trous de passage des fils d’entrée et de sortie de la tension dans les deux grands côtés et placez des passe-fils en caoutchouc. Reliez les pattes du MOSFET aux points SDG de la platine avec des fils de couleurs différentes afin de ne pas les intervertir (voir figure 7).<br /><img alt="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgRBDYWHEP8RabrtM_cFZI-bg2Xh2eXPA-gsJjbqooXg8pm2ERV2qeyX63TXPL7FNVb_MBu2TgnTxS9tSkQSVHVyGfL_IGWljeCcDTg1AtOW0FIf9CdPacSwhA8Oedq9BDylAeKKx4Bedl1/s400/fig9.jpg" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgRBDYWHEP8RabrtM_cFZI-bg2Xh2eXPA-gsJjbqooXg8pm2ERV2qeyX63TXPL7FNVb_MBu2TgnTxS9tSkQSVHVyGfL_IGWljeCcDTg1AtOW0FIf9CdPacSwhA8Oedq9BDylAeKKx4Bedl1/s400/fig9.jpg" /><br />Figure 9 : La tension12 V pour alimenter ce circuit est appliquée au bornier de gauche et la lampe à celui de droite. <br /><br /><div style="text-align: center;"> <img alt="" 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" /></div><br /><br />Figure 10 : Si vous prélevez la tension 12 V sur la batterie du véhicule, les fils négatifs de l’entrée comme de la sortie peuvent être reliés au châssis (masse) de celui-ci.<br /><br />Le réglage<br />Avec un petit tournevis réglez le curseur du trimmer à mi course : ainsi, dès la mise sous tension du circuit vous pourrez vérifier l’allumage progressif de l’ampoule.<br />Cette dernière est bien sûr une 12 V et vous l’alimentez en courant continu (par exemple, batterie du véhicule ou alimentation stabilisée de l’amplificateur : dans ce dernier cas, au besoin, montez un régulateur 7812). Voir figure 9.<br />Mettez sous tension : la luminosité de l’ampoule augmente graduellement à une vitesse fonction du réglage du trimmer. Pour régler cette durée (temps que met l’ampoule pour atteindre sa luminosité maximale), vous allez procéder par essais successifs en agissant chaque fois sur le trimmer, mais procédez toujours à ce réglage appareil éteint.<br />Tournez la vis du trimmer puis alimentez l’appareil et jugez si ce réglage vous convient ; sinon coupez l’alimentation et retouchez le trimmer dans un sens ou dans l’autre puis remettez l’appareil sous tension, etc.<br />Si vous envisagez une utilisation automobile, pour un allumage graduel des plafonniers, voire aussi des feux de position et pourquoi pas des phares, voyez la figure 10 : pour les fils de masse (en entrée comme en sortie), pensez à les relier à la carrosserie, mais faites une bonne connexion de masse (le métal doit être dépourvu de peinture et de rouille). Si vous appliquez l’allumage graduel au circuit des phares de la voiture, montez deux circuits (avec un vous risqueriez de faire fondre le MOSFET) et réglez la durée au minimum.<br />Si vous n’êtes par féru, faites-vous aider par un garagiste aimable (si si ça existe !) ou par un électricien auto : cela vous évitera peut-être des déboires (à bord du véhicule, ce qu’il y a de plus dangereux, juste après le conducteur, c’est le réservoir à carburant et le circuit électrique).Unknownnoreply@blogger.com1tag:blogger.com,1999:blog-3442961482921053297.post-9336100213440742592010-05-24T00:29:00.000+01:002011-05-18T16:55:28.575+01:00Schemas D'une variateur pour moteur cc ou pour une lampe de 12 volts<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEha9oLoOY5ugRHdjSIuFqjCuHiLVc4c1m6gohb0_4YMtSX5w5H15MMQUQqeZ_B3ZEcIwCJd3X5g4pF3gX-Okbf19ERVpMb0ObbSNkU6tnZJ2tf4Rswg1CyskN6wRIaY61WDUGWv6gP_Yoo/s1600/schemas_moteur_regul_simple.gif" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" height="107" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEha9oLoOY5ugRHdjSIuFqjCuHiLVc4c1m6gohb0_4YMtSX5w5H15MMQUQqeZ_B3ZEcIwCJd3X5g4pF3gX-Okbf19ERVpMb0ObbSNkU6tnZJ2tf4Rswg1CyskN6wRIaY61WDUGWv6gP_Yoo/s200/schemas_moteur_regul_simple.gif" width="200" /></a></div><br /><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhPLAgjgffbjHzIz3YBxKUBLZ-DqzcJbhBRQ0ttkcOTxAoPzXiMt0VU0n5eJqyiA3V-rR939wXYp9WW9OP9hxrlHY6Z3Slz4ysvQNRRdokljmfJ5caVpLud7lM_s9avioXc0wBzZOfMvms/s1600/circuit_imprime.gif" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" height="121" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhPLAgjgffbjHzIz3YBxKUBLZ-DqzcJbhBRQ0ttkcOTxAoPzXiMt0VU0n5eJqyiA3V-rR939wXYp9WW9OP9hxrlHY6Z3Slz4ysvQNRRdokljmfJ5caVpLud7lM_s9avioXc0wBzZOfMvms/s200/circuit_imprime.gif" width="200" /></a>Une variateur pour moteur electrique cc de 12 volts ou pour une lampe de 12 volts<br />Le circuit integre est un classique NE555 pour générer un signal périodique rectangulaire qui varie grace au potentiomètre RV1.<br />La sortie du NE555 (borne 3) est épaulé par un transistor de puissance<br /><script type="text/javascript"><!--google_ad_client = "pub-5960961930419712";/* 200x90, date de création 03/04/10 */google_ad_slot = "6474320149";google_ad_width = 200;google_ad_height = 90;//--></script><br /><script type="text/javascript"src="http://pagead2.googlesyndication.com/pagead/show_ads.js"></script><br />2N3055 ,car ce dernier supporte bien des courants de 10A <br />L'alimentation pourra s'effectuer sous 5V à 15V, et sera fonction de la tension nécessaire à l'équipement (ampoule ou moteur) commandé. Ne pas dépasser la tension d'alimentation de +15V, le circuit NE555 supportant au maximum 16VUnknownnoreply@blogger.com0tag:blogger.com,1999:blog-3442961482921053297.post-5108930775799465002010-05-16T03:15:00.000+01:002011-05-18T16:54:51.647+01:00Schema de micro fm sans fil emetteur<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh-iC_l2UVEUveXPgOd4JGr0KnhZhL0ObOakMDRnGXgc4VCtFlxYhvIWxEXDhHlNlnQC6Cqz3Y-S6V_9PQfT5SuqbjWS_MmLeo_ODU-9ibLxWcbcOI9rBz5e5yFJiCv4VKub_PS-l3awTE/s1600-h/micro_fm_emetteur.jpg" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" height="98" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh-iC_l2UVEUveXPgOd4JGr0KnhZhL0ObOakMDRnGXgc4VCtFlxYhvIWxEXDhHlNlnQC6Cqz3Y-S6V_9PQfT5SuqbjWS_MmLeo_ODU-9ibLxWcbcOI9rBz5e5yFJiCv4VKub_PS-l3awTE/s200/micro_fm_emetteur.jpg" width="200" /></a>Un micro FM (FM = Frequency Modulation = Modulation de fréquence), appelé aussi parfois "Micro Espion", du fait qu'il permet de transmettre, grâce à un microphone intégré, une conversation d'un point à un autre sans liaison filaire. Mais appelons-le donc ici Micro FM, car il va de soi que vous savez qu'il est interdit d'espionner quelqu'un sans le lui dire (quelle drôle d'idée aussi, que d'espionner quelqu'un après l'avoir <br /><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEja9RPdNNsN8kPfwuL3qtc1aviTlxl4SBN8Fz_YYroivOdzFOrfMEltXfGvOaxChBFuYzfV5kKSLTQ_zOLqUVrpH_dJ2KfJDolf1wI6bYu-O8y-JypREnP_m5KABsUVBu4CK0CzNJhA81Q/s1600-h/schema_micro_fm.png" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"><img border="0" height="201" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEja9RPdNNsN8kPfwuL3qtc1aviTlxl4SBN8Fz_YYroivOdzFOrfMEltXfGvOaxChBFuYzfV5kKSLTQ_zOLqUVrpH_dJ2KfJDolf1wI6bYu-O8y-JypREnP_m5KABsUVBu4CK0CzNJhA81Q/s320/schema_micro_fm.png" width="320" /></a></div>.<br /><br /><br /><br /><br /><br /><br /><br />informé de vos intentions). Ce montage est donc un émetteur, et vous aurez besoin d'un récepteur pour compléter la chaine de transmission. Tout récepteur FM classique permettant de receptionner la bande 88 à 108 MHz (VHF) conviendra parfaitement<br /><br /> les mesure de celf<br /><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjiNeIs6EJ3SlQRyVY7viPVECPGFRCnhS1BJfrE2rgIn2xJg0p-JuRGP0fLpIW4aBG2zwPfEiYFTNCzkExqW9d_50THClR7FVxQ2019VUjcipcaOMzdUUcegwlyfFHNfDD1wNgWvOojSCo/s1600-h/self_micro_fm.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjiNeIs6EJ3SlQRyVY7viPVECPGFRCnhS1BJfrE2rgIn2xJg0p-JuRGP0fLpIW4aBG2zwPfEiYFTNCzkExqW9d_50THClR7FVxQ2019VUjcipcaOMzdUUcegwlyfFHNfDD1wNgWvOojSCo/s1600/self_micro_fm.png" /></a></div>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-3442961482921053297.post-27363828657400441622010-04-26T18:07:00.000+00:002011-05-18T16:55:39.455+01:00La Montre A Quartz<div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh8bOhqNURf6Cke6FQQ3Ls2-tsFWSdfvSc9SDJhxnTBYj8jaAWMLIBYMzF5TLnYrOOPgqwA0uiFx76E4jR_STWpcqlr92steg91qJWyPy5SiMVQGjfunn9GfZgmu6e_LQtNoe8RZO_iB2Y/s1600/montre_a_quartz.jpg" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" height="200" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh8bOhqNURf6Cke6FQQ3Ls2-tsFWSdfvSc9SDJhxnTBYj8jaAWMLIBYMzF5TLnYrOOPgqwA0uiFx76E4jR_STWpcqlr92steg91qJWyPy5SiMVQGjfunn9GfZgmu6e_LQtNoe8RZO_iB2Y/s200/montre_a_quartz.jpg" width="191" /></a></div><div style="color: blue;"><b> La Montre A Quartz </b></div>Avoir toujours au poignet l'heure exacte, quasiment à la seconde près, est chose si ordinaire aujourd'hui qu'on n'y prête plus attention. Or, cette précision de laboratoire, impensable il y a seulement vingt ans, on la doit au quartz, dont le fonctionnement reste beaucoup plus mystérieux que celui <a href="http://www.google.fr/cse?cx=partner-pub-5960961930419712%3A35swqty75wn&ie=UTF-8&q=d%27un+balancier+d%27horloge&sa=Rechercher">d'un balancier d'horloge</a>.<br />Si l'on excepte quelques passionnés de belles mécaniques qui ont encore au poignet une Rolex ou une Longines, tout le monde porte aujourd'hui une montre électrique à quartz, dont la précision à long terme est considérable : en moyenne, la dérive n'excède guère plus de trois secondes par mois, soit à peine plus d'une demi-minute dans l'année. Autant dire qu'en pratique on n'a jamais besoin de remettre sa montre à l'heure - à part pour les stupides changements d'heure au début et à la fin des beaux jours.<br />Cette stupéfiante stabilité est si vite entrée dans les moeurs que nul n'y fait plus attention. Pourtant, il y a seulement une vingtaine d'années, il n'y avait que des montres mécaniques à balancier spiral dont les meilleures versions, parfaitement réglées, dérivaient tout de même de ± 2 secondes par jour . Les modèles ordinaires, quant à eux, prenaient facilement quinze secondes par jour, d'où la nécessité de remettre la montre à l'heure toutes les semaines.<br />En contrepartie, le fonctionnement de ces montres mécaniques était connu de tous, car les <a href="http://www.google.fr/cse?cx=partner-pub-5960961930419712%3A35swqty75wn&ie=UTF-8&q=d%27un+balancier+d%27horloge&sa=Rechercher">horloges à balancier </a>étaient encore courantes et rares ceux qui, dans leur enfance, n'avaient pas ouvert ou démonté un <a href="http://www.google.fr/cse?cx=partner-pub-5960961930419712%3A35swqty75wn&ie=UTF-8&q=r%C3%A9veil.+Le+ressort&sa=Rechercher">réveil. Le ressort</a> qu'on remontait, le balancier spiral, l'ancre, les engrenages étaient choses familières. Il en va tout autrement avec le quartz qu'on imagine le plus souvent à l'image de ce que fournit la nature, un prisme cristallin transparent terminé par une petite pyramide, genre taille diamant ou pendeloque de lustre.<br /><br /><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhtq1ElG2KHYS5qi2DmFBCEHVDJpf6ODgfUTbQg48i2hyW3IWxe7r-vUZ1ah5P51TIfABMOlMEnKg7Nh82973uYJQXZIgYo0QZ2-NX_Iw3a0EAuwuTdC51ME58xbQyAR-ouxM3TOdYkWP0/s1600/Le_quartz.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="79" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhtq1ElG2KHYS5qi2DmFBCEHVDJpf6ODgfUTbQg48i2hyW3IWxe7r-vUZ1ah5P51TIfABMOlMEnKg7Nh82973uYJQXZIgYo0QZ2-NX_Iw3a0EAuwuTdC51ME58xbQyAR-ouxM3TOdYkWP0/s200/Le_quartz.gif" width="200" /></a></div><div style="text-align: center;"><a href="http://www.google.fr/cse?cx=partner-pub-5960961930419712%3A35swqty75wn&ie=UTF-8&q=+Le+Quartz&sa=Rechercher"><b> Le Quartz</b></a></div><br /><b style="color: blue;">Comment ce cristal donne-t-il l'heure ?</b><span style="color: purple;"> </span>Cela reste un mystère insondable pour beaucoup. Pour lever ce mystère, il faut remonter à 1817, année où l'abbé Haüy, un des fondateurs de la cristallographie, découvre que certains corps cristallisés présentent sur leurs faces des charges électriques dès qu'on les soumet à des contraintes ; autrement dit, dès qu'on tire ou appuie dessus. Il fallut pourtant attendre la communication de Pierre et Paul Jacques Curie à l'Académie des sciences en 1880 pour que ce phénomène, dit de piézo-électricité, soit vraiment connu et quantifié par une loi : la charge électrique recueillie est proportionnelle à la force exercée.<br />L'année suivante, Gabriel Lippmann montrait que le processus est réversible et que les champs électriques appliqués à certaines faces produisent une déformation du cristal. Parmi les corps piézo-électriques, le plus courant et le plus intéressant est le quartz, qui n'est autre que de la silice cristallisée (oxyde de silicium SiO2). Celle-ci est le minéral le plus abondant sur Terre puisque le sable, le gneiss, le granit, le grès sont à base de silice. L'aspect du quartz tel qu'il se présente à l'état naturel dans les roches est connu : il forme des prismes hexagonaux transparents, terminés par une face pointue. Mais, une fois taillé et poli, il peut prendre toute forme voulue, depuis le cube jusqu'à la sphère. Pour les spécialistes, le réseau cristallin du quartz se repère par trois axes, selon lesquels ses propriétés physiques sont différentes (on dit qu'il est anisotrope) : un axe optique Z dans la longueur du prisme, un axe mécanique perpendiculaire à un couple de faces, et un axe électrique parallèle à ces faces et passant donc par deux arêtes opposées. C'est cet axe électrique qui va nous intéresser ici.<br />Comme tous les solides, le quartz est élastique, au même titre que le verre, l'acier et la porcelaine. Il peut donc être le siège de vibrations quand on l'écarte de sa position d'équilibre et qu'on l'abandonne, comme un ressort en acier sur lequel on tire brusquement. Mais comme le quartz est piézo-électrique, toute déformation donne naissance à un champ électrique (celui lié aux charges qui apparaissent sur les faces), et réciproquement. Or, une vibration n'est autre qu'une suite de déformations périodiques alternées, lesquelles vont engendrer des courants périodiques alternés - autrement dit, des courants alternatifs. Qui plus est, le quartz étant un cristal très dur, ses fréquences de vibration sont très élevées : des dizaines de milliers de hertz, ce qui met le son engendré par ces vibrations au niveau des ultrasons.<br /><b style="color: blue;">Quand on applique une tension électrique sur les deux faces d'un quartz</b>, il se déforme en flexion, en extension ou en cisaillement selon la disposition des électrodes. Quand on coupe brusquement le courant, il oscille, tout comme une lame élastique sur laquelle on a tiré et qu'on relâche d'un seul coup. Mais, parce que le quartz est piézo-électrique, ces oscillations vont engendrer un courant alternatif de même fréquence que les vibrations.<br />En couplant de manière appropriée le courant d'entrée, qui va servir à entretenir les vibrations du quartz (tout comme on entretient les oscillations d'une balançoire en donnant une petite poussée à chaque passage), et le courant de sortie, qui va servir à découper le temps, on obtient un résonateur à quartz dont les oscillations ont une remarquable constance. Il ne reste plus qu'à compter ces oscillations pour avoir une horloge.<br />Il faut bien voir en effet qu'on ne sait pas mesurer le temps de manière continue, comme le ferait une lourde toupie bien lancée, car aucun phénomène rotatif n'est stable à notre échelle. On en est donc réduit, depuis les débuts de l'horlogerie, à fractionner le temps et à compter ces fractions en espérant qu'elles soient toutes rigoureusement égales, ce qui, bien entendu, n'est jamais vraiment le cas. Le balancier des horloges - dont les oscillations sont entretenues par un système de cliquets agissant sur une roue à rochet mue par un ressort ou des poids - découpe le temps en fractions à peu près égales à condition que la température ne change pas (le balancier s'allonge ou raccourcit selon qu'il fait chaud ou froid), que les frottements des engrenages restent constants, etc.<br />Le balancier spiral des montres et des réveils est soumis aux mêmes problèmes et, sauf pour le matériel de laboratoire, les oscillations sont loin d'être toutes d'égale durée. Comme on mesure le temps en additionnant toutes ces oscillations, les écarts interviennent aussi dans le total et le décompte final s'écarte de plus en plus de l'heure réelle (celle définie par les mouvements astronomiques ou, plus récemment, par les oscillations des atomes).<br />Avec des horloges à balancier installées dans les sous-sols des observatoires, à l'abri de la moindre secousse, de la plus infime variation de tempé- rature ou de pression, on pouvait réduire ces écarts au point d'avoir une heure plus précise que la rotation de la Terre sur elle-même. Mais avec un bracelet-montre, basculé et secoué toute la journée au bout du bras, la somme des écarts dépassait toujours une seconde au bout de vingt-quatre heures.<br />Les ingénieurs qui concevaient les mouvements d'horlogerie savaient depuis longtemps que la seule manière de réduire ces écarts était d'augmenter la fréquence du balancier spiral, ce qui était mécaniquement très difficile : une roue oscillant autour de son axe ne peut pas faire des milliers d'aller et re- tour par seconde. En revanche, un simple diapason d'accordeur de piano, vibrant à 440 hertz, aurait constitué un régulateur bien supérieur.<br />De fait, malgré la difficulté inhérente à la conversion d'une vibration en rotation, il y eut des horloges et même des montres à diapason. Mais, dès les années vingt, les chercheurs pensèrent au quartz qui commençait à être utilisé pour régler la fréquence des émetteurs radio, et dont les vibrations sont de 100 à 1 000 fois plus rapides que celles des diapasons. A partir de 1930, les Allemands Scheibe et Adelsberg mirent au point des horloges de laboratoire dont l'organe régulateur était un barreau de quartz. Les vibrations à 100 000 hertz étaient entretenues par des circuits à lampes triodes. Le comptage des oscillations posait de gros problèmes à cette époque, et pourtant la comparaison des horloges Scheibe avec les meilleures horloges à balancier des observatoires prouvait que le quartz donnait la même précision.<br />Or, le balancier était au sommet de son art, alors que le quartz n'en était qu'à ses débuts. La Deuxième Guerre mondiale interrompit les recherches ; mais, à partir de 1950, tous les observatoires astronomiques s'équipèrent d'horloges à quartz qui avaient beaucoup progressé et dont la précision dépassait nettement celle des balanciers. L'invention des transistors puis celle des circuits intégrés allaient permettre de miniaturiser cette technique et de lui donner un essor fantastique : les pendules, les réveils, les montres sont quasiment tous aujourd'hui à quartz.<br />Il faut dire que le dispositif est d'une remarquable simplicité : un morceau de quartz unique, mis en vibration (le plus souvent à 32 768 hertz, soit 32 768 oscillations/seconde), dont le courant de sortie est compté par des circuits intégrés, similaires à ceux qui font les opérations dans les calculatrices, puis affiché par des cristaux liquides ou des aiguilles commandées par un moteur pas-à-pas.<br /><b style="color: blue;">Dans les montres, le quartz, toujours minuscule, est un diapason dérivé du diapason</b><span style="color: blue;"> </span>présenté par Karolus en 1954. Dans les pendules ou les réveils, il a la forme d'une mince pastille. Dans tous les cas, il est enfermé sous vide dans un petit conteneur en cupronickel. Les branches du diapason, ou les faces du disque, sont métallisées par dépôt sous vide d'or, d'aluminium ou de chrome. Ce film métallique sert d'électrodes pour amener le courant sur le quartz.<br />Le dessin des électrodes est calculé sur ordinateur, car il joue un rôle essentiel dans la qualité du résonateur, le quartz servant à la fois d'oscillateur mécanique et d'isolant du condensateur dont les armatures sont les dépôts métalliques. Il faut bien voir que ce qui change entre la montre à diapason, telle qu'elle a brièvement existé vers 1965, et la montre à quartz actuelle, c'est le mode de comptage des oscillations.<br />Dans le premier cas, un cliquet attaché à une branche du diapason métallique poussait une dent d'une roue à rochet à chaque oscillation. Dans le second, la vibration mécanique du cristal de silice est transformée en courant alternatif par effet piézo-électrique, et un circuit électronique compte les alternances. Mais, dans les deux cas, il s'agit d'un matériau élastique mis en vibration. La montre mécanique utilise d'ailleurs aussi les oscillations d'un petit ressort élastique mis en spirale, l'ancre et la roue d'ancre servant à compter les aller et retour d'une minuscule toupie liée au ressort.<br />Le gain en précision reste essentiellement dû à l'augmentation de fréquence du système oscillant : de 2,5 à 5 hertz pour le balancier spiral, 300 Hz pour le diapason métallique, 32 768 Hz pour le diapason quartz. Celui-ci est l'équivalent d'un balancier qui oscillerait encore au bout d'un mois sans qu'on lui ait redonné le moindre élan.<br />Une performance due à sa nature cristalline et qui explique son exceptionnelle régularité : en labboratoire, le quartz garantit un écart ne dépassant pas une seconde en 275 ans<br /><br /><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgaHSL6UZXSlko0PEzTIAD5P4CpLSkDXkk22hWPxyXPlwcg3WUz7n9tFGIvbhZ6X7t9WU0XTOZfvsrk_odX0sZyciq2fBnL0XnDVxS0nC08iXtY73u1NP79rMB2L26QV3GtkbxekIcDPLI/s1600/montre_quartz.gif" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" height="264" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgaHSL6UZXSlko0PEzTIAD5P4CpLSkDXkk22hWPxyXPlwcg3WUz7n9tFGIvbhZ6X7t9WU0XTOZfvsrk_odX0sZyciq2fBnL0XnDVxS0nC08iXtY73u1NP79rMB2L26QV3GtkbxekIcDPLI/s320/montre_quartz.gif" width="320" /></a></div><div style="color: blue; text-align: center;"> <b> Légende:</b></div><br />En A, la pile miniature comme source d'énergie<br />En B, le résonateur à quartz, vibrant à une fréquence stable et précise de 32768 Hz<br />En C, le circuit intégré divise la fréquence successivement 15 fois par 2 pour arriver à une fréquence de 1 Hz soit égale à une seconde.<br /><br /> Enfin un micro moteur électrique en D, est "excité" par les signaux obtenus et pas à pas il transforme les impulsions de secondes en mouvement précis qui actionnent le rouage des aiguilles en E.Unknownnoreply@blogger.com2tag:blogger.com,1999:blog-3442961482921053297.post-64105743686036956072010-04-20T04:30:00.000+00:002011-05-18T16:55:12.829+01:00Les condensateurs : Code des couleurs<div align="center"><br /><br /><br /><center><br /><div style="text-align: left;"><br /></div><table border="0" style="width: 400px;"><tbody><tr><td width="394"><div style="text-align: left;"><span style="color: black; font-size: small;"><b><u>Les codes de coleur de condensateur</u></b></span></div><div style="text-align: left;"><span style="color: black; font-size: small;"><b><u>Exemple :</u><br />Blanc, rouge, orange, noir, rouge => 92 nF - 20% - 250V</b></span></div><div style="text-align: left;"></div><div align="center"><br /></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEif41DeTijwLbl2dscedSLgjC_q7cGomaxlP9p_seOYbEbouU9zHt9nexj8XyGZOtDQ8VRxXWOBy6u0DlA2d9QBdXXyk9dGSlh1zPDRhlrdNtHS7FP1CnESE5gX_b4r4_CGIKf1x3jKs0M/s1600/condo_color.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEif41DeTijwLbl2dscedSLgjC_q7cGomaxlP9p_seOYbEbouU9zHt9nexj8XyGZOtDQ8VRxXWOBy6u0DlA2d9QBdXXyk9dGSlh1zPDRhlrdNtHS7FP1CnESE5gX_b4r4_CGIKf1x3jKs0M/s1600/condo_color.gif" /></a></div><div align="center"></div><table align="center" border="1" bordercolordark="white" bordercolorlight="black" cellspacing="0" style="width: 370px;"><tbody><tr> <td bgcolor="white" width="44"><div align="center"><span style="color: black; font-size: xx-small;">Couleur</span></div></td> <td bgcolor="white" width="54"><div align="center"><span style="color: black; font-size: xx-small;">1er anneau</span></div></td> <td bgcolor="white" width="54"><div align="center"><span style="color: black; font-size: xx-small;">2ème anneau</span></div></td> <td bgcolor="white" width="64"><div align="center"><span style="color: black; font-size: xx-small;">Multiplicateur</span></div></td> <td bgcolor="white" width="64"><div align="center"><span style="color: black; font-size: xx-small;">Tolérance</span></div></td> <td bgcolor="white" width="50"><div align="center"><span style="color: black; font-size: xx-small;">Isolation</span></div></td> </tr><tr> <td bgcolor="black" width="44"><div align="center"><span style="color: white; font-size: xx-small;">Noir</span></div></td> <td bgcolor="black" width="54"><div align="center"><span style="color: white; font-size: xx-small;">0</span></div></td> <td bgcolor="black" width="54"><div align="center"><span style="color: white; font-size: xx-small;">0</span></div></td> <td bgcolor="black" width="64"><div align="center"><span style="color: white; font-size: xx-small;">1 pF</span></div></td> <td bgcolor="black" width="64"><div align="center"><span style="color: white; font-size: xx-small;">20%</span></div></td> <td bgcolor="black" width="50"><div align="center"><br /></div></td> </tr><tr> <td bgcolor="#c8b030" width="44"><div align="center"><span style="font-size: xx-small;">Marron</span></div></td> <td bgcolor="#c8b030" width="54"><div align="center"><span style="font-size: xx-small;">1</span></div></td> <td bgcolor="#c8b030" width="54"><div align="center"><span style="font-size: xx-small;">1</span></div></td> <td bgcolor="#c8b030" width="64"><div align="center"><span style="font-size: xx-small;">10 pF</span></div></td> <td bgcolor="#c8b030" width="64"><div align="center"><span style="font-size: xx-small;">1%</span></div></td> <td bgcolor="#c8b030" width="50"><div align="center"><span style="font-size: xx-small;">100 V</span></div></td> </tr><tr> <td bgcolor="red" width="44"><div align="center"><span style="color: white; font-size: xx-small;">Rouge</span></div></td> <td bgcolor="red" width="54"><div align="center"><span style="color: white; font-size: xx-small;">2</span></div></td> <td bgcolor="red" width="54"><div align="center"><span style="color: white; font-size: xx-small;">2</span></div></td> <td bgcolor="red" width="64"><div align="center"><span style="color: white; font-size: xx-small;">100 pF</span></div></td> <td bgcolor="red" width="64"><div align="center"><span style="color: white; font-size: xx-small;">2%</span></div></td> <td bgcolor="red" width="50"><div align="center"><span style="color: white; font-size: xx-small;">250 V</span></div></td> </tr><tr> <td bgcolor="#f8b870" width="44"><div align="center"><span style="font-size: xx-small;">Orange</span></div></td> <td bgcolor="#f8b870" width="54"><div align="center"><span style="font-size: xx-small;">3</span></div></td> <td bgcolor="#f8b870" width="54"><div align="center"><span style="font-size: xx-small;">3</span></div></td> <td bgcolor="#f8b870" width="64"><div align="center"><span style="font-size: xx-small;">1 nF</span></div></td> <td bgcolor="#f8b870" width="64"><div align="center"><br /></div></td> <td bgcolor="#f8b870" width="50"><div align="center"><br /></div></td> </tr><tr> <td bgcolor="yellow" width="44"><div align="center"><span style="font-size: xx-small;">Jaune</span></div></td> <td bgcolor="yellow" width="54"><div align="center"><span style="font-size: xx-small;">4</span></div></td> <td bgcolor="yellow" width="54"><div align="center"><span style="font-size: xx-small;">4</span></div></td> <td bgcolor="yellow" width="64"><div align="center"><span style="font-size: xx-small;">10 nF</span></div></td> <td bgcolor="yellow" width="64"><div align="center"><br /></div></td> <td bgcolor="yellow" width="50"><div align="center"><span style="font-size: xx-small;">400 V</span></div></td> </tr><tr> <td bgcolor="#18dc38" width="44"><div align="center"><span style="font-size: xx-small;">Vert</span></div></td> <td bgcolor="#18dc38" width="54"><div align="center"><span style="font-size: xx-small;">5</span></div></td> <td bgcolor="#18dc38" width="54"><div align="center"><span style="font-size: xx-small;">5</span></div></td> <td bgcolor="#18dc38" width="64"><div align="center"><span style="font-size: xx-small;">100 nF</span></div></td> <td bgcolor="#18dc38" width="64"><div align="center"><br /></div></td> <td bgcolor="#18dc38" width="50"><div align="center"><br /></div></td> </tr><tr> <td bgcolor="blue" width="44"><div align="center"><span style="color: white; font-size: xx-small;">Bleu</span></div></td> <td bgcolor="blue" width="54"><div align="center"><span style="color: white; font-size: xx-small;">6</span></div></td> <td bgcolor="blue" width="54"><div align="center"><span style="color: white; font-size: xx-small;">6</span></div></td> <td bgcolor="blue" width="64"><div align="center"><span style="color: white; font-size: xx-small;">1 uF</span></div></td> <td bgcolor="blue" width="64"><div align="center"><br /></div></td> <td bgcolor="blue" width="50"><div align="center"><span style="color: white; font-size: xx-small;">630 V</span></div></td> </tr><tr> <td bgcolor="#f050e0" width="44"><div align="center"><span style="color: white; font-size: xx-small;">Violet</span></div></td> <td bgcolor="#f050e0" width="54"><div align="center"><span style="color: white; font-size: xx-small;">7</span></div></td> <td bgcolor="#f050e0" width="54"><div align="center"><span style="color: white; font-size: xx-small;">7</span></div></td> <td bgcolor="#f050e0" width="64"><div align="center"><br /></div></td> <td bgcolor="#f050e0" width="64"><div align="center"><br /></div></td> <td bgcolor="#f050e0" width="50"><div align="center"><br /></div></td> </tr><tr> <td bgcolor="silver" width="44"><div align="center"><span style="font-size: xx-small;">Gris</span></div></td> <td bgcolor="silver" width="54"><div align="center"><span style="font-size: xx-small;">8</span></div></td> <td bgcolor="silver" width="54"><div align="center"><span style="font-size: xx-small;">8</span></div></td> <td bgcolor="silver" width="64"><div align="center"><span style="font-size: xx-small;">0,01 pF</span></div></td> <td bgcolor="silver" width="64"><div align="center"><br /></div></td> <td bgcolor="silver" width="50"><div align="center"><br /></div></td> </tr><tr> <td bgcolor="white" width="44"><div align="center"><span style="font-size: xx-small;">Blanc</span></div></td> <td bgcolor="white" width="54"><div align="center"><span style="font-size: xx-small;">9</span></div></td> <td bgcolor="white" width="54"><div align="center"><span style="font-size: xx-small;">9</span></div></td> <td bgcolor="white" width="64"><div align="center"><span style="font-size: xx-small;">0,1 pF</span></div></td> <td bgcolor="white" width="64"><div align="center"><br /></div></td> <td bgcolor="white" width="50"><div align="center"><br /></div></td> </tr><tr> <td bgcolor="#c8d0d8" width="44"><div align="center"><span style="font-size: xx-small;">Argent</span></div></td> <td bgcolor="#c8d0d8" width="54"><div align="center"><br /></div></td> <td bgcolor="#c8d0d8" width="54"><div align="center"><br /></div></td> <td bgcolor="#c8d0d8" width="64"><div align="center"><span style="font-size: xx-small;">0,01 pF</span></div></td> <td bgcolor="#c8d0d8" width="64"><div align="center"><span style="font-size: xx-small;">10%</span></div></td> <td bgcolor="#c8d0d8" width="50"><div align="center"><br /></div></td> </tr><tr> <td bgcolor="#f8e478" width="44"><div align="center"><span style="font-size: xx-small;">Or</span></div></td> <td bgcolor="#f8e478" width="54"><div align="center"><br /></div></td> <td bgcolor="#f8e478" width="54"><div align="center"><br /></div></td> <td bgcolor="#f8e478" width="64"><div align="center"><span style="font-size: xx-small;">0,1 pF</span></div></td> <td bgcolor="#f8e478" width="64"><div align="center"><span style="font-size: xx-small;">5%</span></div></td> <td bgcolor="#f8e478" width="50"><div align="center"><br /></div></td> </tr></tbody></table></td> </tr></tbody></table></center></div>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-3442961482921053297.post-89406764070078693222010-04-20T04:13:00.000+00:002011-05-18T16:55:12.829+01:00Le triac : cracteristique de composant<span style="font-size: small;"><b>Le triac </b></span><br /><span style="font-size: small;">Le triac est un composant actif de plus en plus utilisé dans les montages d'aujourd'hui. Son utilisation directe sur le secteur EDF permet en effet de commuter des charges importantes à partir de circuits beaucoup plus modestes.</span><span style="font-size: small;"> Ce composant dont le symbole est rappelé</span><span style="color: red; font-size: small;"> figure 1</span><span style="font-size: small;"> fonctionne théoriquement selon </span><span style="color: magenta; font-size: small;">quatre modes</span><span style="font-size: small;">, appelés aussi quadrants, que l'on peut résumer par le tableau de la </span><span style="color: red; font-size: small;">figure 2</span><span style="font-size: small;">.</span><br /><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhZ-3Y2ma8C1wQuh9utBYjWI5-WRfNRR-LQDYEkS6YfBGF40xNAtcWOL1n1TjNjtedVCL-2Cozu95c_B9J7VkJe2t23s8UQGjnPXHcITPTDIHfNHadHKAQhHN_8xNnxhPQJxrA_BbgYTWE/s1600/1.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="197" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhZ-3Y2ma8C1wQuh9utBYjWI5-WRfNRR-LQDYEkS6YfBGF40xNAtcWOL1n1TjNjtedVCL-2Cozu95c_B9J7VkJe2t23s8UQGjnPXHcITPTDIHfNHadHKAQhHN_8xNnxhPQJxrA_BbgYTWE/s200/1.gif" width="200" /></a></div><div style="text-align: center;"><b><span style="font-size: x-small;"><span style="color: red;">Figure 1 </span></span></b></div><br /><span style="font-size: small;">Ces quatre quadrants dépendent en fait de la polarité de l'anode</span><span style="color: magenta; font-size: small;"> A2 </span><span style="font-size: small;">par rapport à</span><span style="color: magenta; font-size: small;"> A1</span><span style="font-size: small;"> et de la gâchette du triac.</span><br /><div class="MsoNormal"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgnivtWlbL-tgKE7bqMskFZ2MUW6Jf-fn-i5auYG_50V04mNVw1I2jmY1KNxWyPhqYcj7n3wlkZ5CY1Dq0zaeJWvquFQnkzfgxz4ADs9UZ8rtrePbqdTlzfojkd7cMwrEgRFEollUugvGg/s1600/2.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="220" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgnivtWlbL-tgKE7bqMskFZ2MUW6Jf-fn-i5auYG_50V04mNVw1I2jmY1KNxWyPhqYcj7n3wlkZ5CY1Dq0zaeJWvquFQnkzfgxz4ADs9UZ8rtrePbqdTlzfojkd7cMwrEgRFEollUugvGg/s320/2.gif" width="320" /></a></div><div class="MsoNormal" style="text-align: center;"><b><span style="font-size: x-small;"><span style="color: red;"> Figure 2</span></span></b></div><br /><div class="MsoNormal"><span style="font-size: small;">Dans l'exemple donné</span><span style="color: red; font-size: small;"> figure 3</span><span style="font-size: small;">, l'anode</span><span style="color: magenta; font-size: small;"> A2</span><span style="font-size: small;"> sera tour à tour </span><span style="color: magenta; font-size: small;">positive</span><span style="font-size: small;"> puis </span><span style="color: magenta; font-size: small;">négative,</span><span style="font-size: small;"> tandis que la gâchette est négative (extraction de courant) lorsque le transistor conduit.</span></div><div class="MsoNormal"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhYviSRZ8DZ8oe3TilCAH8SWDrTuaCBcBoMm7S3MMD1z4D8p5K9vCaIh-2PkuAWDvhz_bD1mJvTdxGxrVJY59_IXyA9o1wVebBYkHlb4HTd7vEdAzTMBYEWluublo5_IbRpC5IZmrbtHPw/s1600/3.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="145" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhYviSRZ8DZ8oe3TilCAH8SWDrTuaCBcBoMm7S3MMD1z4D8p5K9vCaIh-2PkuAWDvhz_bD1mJvTdxGxrVJY59_IXyA9o1wVebBYkHlb4HTd7vEdAzTMBYEWluublo5_IbRpC5IZmrbtHPw/s320/3.gif" width="320" /></a></div><div class="MsoNormal" style="text-align: center;"><b><span style="font-size: x-small;"><span style="color: red;"> Figure 3</span></span></b></div><span style="font-size: small;"><br /></span><br /><div class="MsoNormal"><span style="font-size: small;"> Nous aurons donc anode : </span><span style="color: magenta; font-size: small;">A2 = A+ et A- <br /> Gâchette = G-</span></div><div class="MsoNormal"><span style="font-size: small;"> En observant le tableau, on dit que le triac fonctionne dans les quadrants</span><span style="color: magenta; font-size: small;"> 2</span><span style="font-size: small;"> et</span><span style="color: magenta; font-size: small;"> 3</span><span style="font-size: small;">.</span></div><div class="MsoNormal"><span style="font-size: small;"> Différentes combinaisons peuvent donc être obtenues. II faut simplement signaler que le mode </span><span style="color: magenta; font-size: small;">4</span><span style="font-size: small;"> est à éviter, du fait d'une consommation exagérée se situant au-dessus de</span><span style="color: magenta; font-size: small;"> 100 mA</span><span style="font-size: small;"> contre seulement </span><span style="color: magenta; font-size: small;">50 mA</span><span style="font-size: small;"> dans les modes </span><span style="color: magenta; font-size: small;">1 ,2 et 3</span><span style="font-size: small;"> pour un triac du type 'classique'.</span></div><div class="MsoNormal"><span style="font-size: small;"> II existe en effet des modèles dit « sensibles » , qui ne nécessitent qu'un faible courant de gâchette de l'ordre de </span><span style="color: magenta; font-size: small;">5</span><span style="font-size: small;"> à</span><span style="color: magenta; font-size: small;"> 10 mA</span><span style="font-size: small;">. Cela à son importance du fait que l'intensité de la charge doit être supérieure à l'intensité de gâchette, et c'est pourquoi sur les gradateurs du commerce on trouve, en plus de l'indication de charge maximale, une indication de charge minimale, faute de quoi le triac ne fonctionne plus.</span></div><div class="MsoNormal"><span style="font-size: small;"> Le principe même du triac est qu'il reste amorcé après une impulsion de commande jusqu'au passage par zéro suivant de l'onde secteur.</span></div><div class="MsoNormal"><span style="font-size: small;"> La commande peut donc être impulsionnelle et la</span><span style="color: red; font-size: small;"> figure 4</span><span style="font-size: small;"> précise un tel montage, qui s'avère beaucoup moins gourmand que la commande en continu de la </span><span style="color: red; font-size: small;">figure 3</span><span style="font-size: small;">.</span></div><div class="MsoNormal"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhVyDIZLy1HXLAq0e_CWTP3AZfEMpc_uI_lZmUBXsXpRxNWC4ylTbYMRwGdAzb8t5R9U1OTM6CQaiQVidZxBis71-dRq2RKrR4Ws4WcmWiTUIENHaRyZT1BqhbFLIYr9Nct9CuEXoHWlVY/s1600/4.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="176" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhVyDIZLy1HXLAq0e_CWTP3AZfEMpc_uI_lZmUBXsXpRxNWC4ylTbYMRwGdAzb8t5R9U1OTM6CQaiQVidZxBis71-dRq2RKrR4Ws4WcmWiTUIENHaRyZT1BqhbFLIYr9Nct9CuEXoHWlVY/s320/4.gif" width="320" /></a></div><div class="MsoNormal" style="text-align: center;"><b><span style="font-size: x-small;"><span style="color: red;"> Figure 4</span></span></b></div><span style="font-size: small;"><br /></span><br /><div class="MsoNormal"><span style="font-size: small;">Ce genre de circuit peut alors être alimenté par un réseau </span><span style="color: magenta; font-size: small;">RC</span><span style="font-size: small;"> en se passant de transformateur si le circuit de commande ne consomme pas trop. Un niveau </span><span style="color: magenta; font-size: small;">0 </span><span style="font-size: small;">sur l'entrée</span><span style="color: magenta; font-size: small;"> C</span><span style="font-size: small;"> bloque le triac.</span></div><div class="MsoNormal"><span style="font-size: small;">La puissance fournie est maximale dans ce cas puisque le triac est amorcé juste après le passage par zéro de la tension alternative, mais on peut intervenir de différentes façons pour retarder chaque impulsion de commande en vue de faire varier l'intensité appliquée à la charge.</span></div><div class="MsoNormal"><span style="font-size: small;"> Un moyen simple pour obtenir ce résultat est un réseau </span><span style="color: magenta; font-size: small;">RC</span><span style="font-size: small;"> comme celui de la </span><span style="color: red; font-size: small;">figure 5</span><span style="font-size: small;">. Le décalage dépend des valeurs de ces deux composants et </span><span style="color: magenta; font-size: small;">R </span><span style="font-size: small;">peut être variable. Le diac placé sur la gâchette permet d'obtenir un déphasage encore plus important, celui-ci ne conduisant que lorsque la tension atteint </span><span style="color: magenta; font-size: small;">30V</span><span style="font-size: small;">.</span></div><div class="MsoNormal"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiebFM9nsWCwsqDVsaL2VJX3u2bk216WJkqFQb_h8znQDGS163jQTq9ivdbvpIT36mtQL917zKJnV3BjMXpAPGNT055I9eEsMFLl60hRw4Mp5-qH4uk_WqAqy9yXCUs0lTOJQbna_HrPqs/s1600/5.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiebFM9nsWCwsqDVsaL2VJX3u2bk216WJkqFQb_h8znQDGS163jQTq9ivdbvpIT36mtQL917zKJnV3BjMXpAPGNT055I9eEsMFLl60hRw4Mp5-qH4uk_WqAqy9yXCUs0lTOJQbna_HrPqs/s1600/5.gif" /></a></div><div class="MsoNormal" style="text-align: center;"><b><span style="font-size: x-small;"><span style="color: red;"> Figure 5</span></span></b></div><br /><div class="MsoNormal"><span style="font-size: small;"> II existe néanmoins d'autres moyens plus sophistiqués permettant d'obtenir des déphasages complets (180°) et des systèmes automatiques permettant de moduler l'intensité en fonction de divers phénomènes tels que la lumière ou la température.</span></div><div class="MsoNormal"><span style="font-size: small;"> La </span><span style="color: red; font-size: small;">figure 6a et 6b </span><span style="font-size: small;">indique la puissance appliquée à la charge en fonction du retard de l'impulsion de commande par rapport au zéro.</span></div><div class="MsoNormal"><br /></div><div class="separator" style="clear: both; text-align: center;"></div><br /><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhp9EDAYdrWQb-lSG3x3hX4BXjdZRu2dsKZKeIuipsrd3h-EGINpDHEnPPZClAXck2i9SF_QJv9rL9eWW1JOInuGa8Yhmm-T2gV-KN3KT6bcsPG8uoTcstn631fDLg0D1R4775NZutqEEI/s1600/6a.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="129" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhp9EDAYdrWQb-lSG3x3hX4BXjdZRu2dsKZKeIuipsrd3h-EGINpDHEnPPZClAXck2i9SF_QJv9rL9eWW1JOInuGa8Yhmm-T2gV-KN3KT6bcsPG8uoTcstn631fDLg0D1R4775NZutqEEI/s320/6a.gif" width="320" /></a></div><div class="MsoNormal" style="text-align: center;"><b><span style="font-size: x-small;"><span style="color: red;"> Figure 6a</span></span></b></div><br /><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiNVHJxOyJwvuUQJOB6Sne4-AZQyFsfV0rloWBY82lfZcqcFtcjd11o7XJ6qIlvezEoxi1rUZFPw5fArNEHkxUtE-7lGYj-tP_Vs5u2-ht5n3A7F9e5P4yH0i_kTsphxS0lOK98XymXL0A/s1600/6b.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiNVHJxOyJwvuUQJOB6Sne4-AZQyFsfV0rloWBY82lfZcqcFtcjd11o7XJ6qIlvezEoxi1rUZFPw5fArNEHkxUtE-7lGYj-tP_Vs5u2-ht5n3A7F9e5P4yH0i_kTsphxS0lOK98XymXL0A/s1600/6b.gif" /></a></div><div style="text-align: center;"><b><span style="font-size: x-small;"><span style="color: red;"> Figure 6b</span></span></b></div><br /><div class="MsoNormal"><span style="font-size: small;"> L'inconvénient majeur de ce type de montage est sa facilité à produire des parasites et notamment sur les récepteurs </span><span style="color: magenta; font-size: small;">PO/GO</span><span style="font-size: small;">. Ceux-ci peuvent être en partie éliminés par l'adjonction d'un circuit comportant un réseau </span><span style="color: magenta; font-size: small;">LC </span><span style="font-size: small;">comme celui de la</span><span style="color: red; font-size: small;"> figure 7</span><span style="font-size: small;">, où les deux condensateurs (facultatifs) sont prévus obligatoirement pour l'alternatif en classe (X2) et la self calibrée en fonction de l'intensité demandée.</span></div><div class="MsoNormal"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjY-RYnYAh7AnDr7K_Jkd1mAY8XFSQAAfN-TuUsl65ovxB4LlCzv8_IV_STXZnJbMAx9MU8pJ6at6yQ0_8iTdpid1z_DhVj5yyaP8PPJqwcxB5GI0PLM0mSSVYyqincSSwgBAh053Riu3c/s1600/7.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="125" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjY-RYnYAh7AnDr7K_Jkd1mAY8XFSQAAfN-TuUsl65ovxB4LlCzv8_IV_STXZnJbMAx9MU8pJ6at6yQ0_8iTdpid1z_DhVj5yyaP8PPJqwcxB5GI0PLM0mSSVYyqincSSwgBAh053Riu3c/s320/7.gif" width="320" /></a></div><div class="MsoNormal" style="text-align: center;"><b><span style="font-size: x-small;"><span style="color: red;"> Figure 7</span></span></b></div><br /><div class="MsoNormal"><span style="font-size: small;"> Cette disposition convient pour les circuits « gradateurs » , mais si l'on souhaite seulement utiliser le triac en commutateur il est préférable de faire appel à des circuits spécialisés dans la commande par zéro de l'onde secteur. On peut citer par exemple l'opto-triac </span><span style="color: magenta; font-size: small;">MOC 3041</span><span style="font-size: small;"> disposant d'un « zéro crossing » prévu pour cette application et dont le brochage est indiqué</span><span style="color: red; font-size: small;"> figure 8</span><span style="font-size: small;">.</span></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh3liSJKmcUCrdBar_lypxE6xXF8Q9ztClNKq5D19JP7_CrBgyAk5OBhQWsrTRprUyUL-3v3yIbW21jJdJNzRNR_SlW7vGPGDAaQthr9yOUdALE5dZSz56mrixdaXRyQ5xaQTfVu8Tri3A/s1600/8.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh3liSJKmcUCrdBar_lypxE6xXF8Q9ztClNKq5D19JP7_CrBgyAk5OBhQWsrTRprUyUL-3v3yIbW21jJdJNzRNR_SlW7vGPGDAaQthr9yOUdALE5dZSz56mrixdaXRyQ5xaQTfVu8Tri3A/s1600/8.gif" /></a></div><div class="MsoNormal" style="text-align: center;"><b><span style="font-size: x-small;"><span style="color: red;"> Figure 8</span></span></b></div><br /><div class="MsoNormal"><span style="font-size: small;"> De plus, l'isolement d'un optotriac, de quelques</span><span style="color: magenta; font-size: small;"> 7 500 V</span><span style="font-size: small;">, ainsi que l'intensité de commande d'une dizaine de milliampères apportent une sécurité et un confort d'utilisation hautement appréciables pour commuter des charges de plusieurs ampères sous une tension de </span><span style="color: magenta; font-size: small;">230 V</span><span style="font-size: small;"> ou plus.</span></div><div class="MsoNormal"><span style="font-size: small;"> Ne pas oublier en effet que les montages à triacs, avec ou sans transformateur d'alimentation, s'ils ne sont pas équipés d'optotriacs ou de dispositifs similaires, sont reliés directement à la tension secteur et qu'il convient d'être très prudent avec ce genre de circuit.</span></div><div class="MsoNormal"><span style="font-size: small;"> La</span><span style="color: red; font-size: small;"> figure 9</span><span style="font-size: small;"> représente une interface universelle permettant de commander des dispositifs divers reliés au secteur à l'aide, par exemple, d'un ordinateur.</span></div><div class="MsoNormal"><br /></div><div class="separator" style="clear: both; text-align: center;"></div><br /><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhoW9EyJoyLk247ZkzzJyI11CO_SPrCeMyfTh-KKzBPlzdVbzyud-BPEbhwJFLAtXiXTg4vwUb3gYq2oGqTRf-aon_dgXNWB3tRHFqJ1AswQOWzDurjj17289XU0niOS1kZ4YQKKNVSeJo/s1600/9.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="164" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhoW9EyJoyLk247ZkzzJyI11CO_SPrCeMyfTh-KKzBPlzdVbzyud-BPEbhwJFLAtXiXTg4vwUb3gYq2oGqTRf-aon_dgXNWB3tRHFqJ1AswQOWzDurjj17289XU0niOS1kZ4YQKKNVSeJo/s320/9.gif" width="320" /></a></div><div class="MsoNormal" style="text-align: center;"><b><span style="font-size: x-small;"><span style="color: red;"> Figure 9</span></span></b></div><br /><div class="MsoNormal"><b><span style="font-size: x-small;"> La commande s'effectue en appliquant un niveau positif sur la LED, l'opto-triac commande à son tour un triac que l'on aura choisi en fonction de la charge à commuter. On pourra équiper cette interface de l'antiparasitage de la </span><span style="color: red; font-size: x-small;">figure 7</span><span style="font-size: x-small;">.</span></b></div><div class="MsoNormal"><b><span style="font-size: x-small;"> Dans certains cas et notamment dans le cas où la charge est fortement inductive, il peut être nécessaire de rajouter un circuit de protection. La</span><span style="color: red; font-size: x-small;"> figure 10</span><span style="font-size: x-small;"> indique un moyen efficace pour protéger le triac.</span></b></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiw5x_iYhIql-93MpWG4K_5-x5-XF_YH2P1jOLnG2k0URikqwP7Xof2Wpb5ax9aVWmPAWXACXl1M6IGyhtfvieVhBQ2lEWGM2D6dylC4NDINQWGcS1I6ZgHnOxWEt0wrEkbXIUumImQUmo/s1600/10.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="297" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiw5x_iYhIql-93MpWG4K_5-x5-XF_YH2P1jOLnG2k0URikqwP7Xof2Wpb5ax9aVWmPAWXACXl1M6IGyhtfvieVhBQ2lEWGM2D6dylC4NDINQWGcS1I6ZgHnOxWEt0wrEkbXIUumImQUmo/s320/10.gif" width="320" /></a></div><div class="MsoNormal" style="text-align: center;"><b><span style="font-size: x-small;"><span style="color: red;"> Figure 10</span></span></b></div><br /><div class="MsoNormal"><span style="font-size: small;"> Enfin, il ne faudra pas oublier d'équiper chaque triac de son dissipateur si la puissance mise en jeu le nécessite, généralement on commence à placer un radiateur à partir d'une puissance de </span><span style="color: magenta; font-size: small;">100 W </span><span style="font-size: small;">pour les modèles classiques</span><span style="color: magenta; font-size: small;"> 6/8 A</span><span style="font-size: small;">. Sachez cependant qu'il existe des triacs prévus pour une intensité de </span><span style="color: magenta; font-size: small;">40A</span><span style="font-size: small;">.</span></div><div class="MsoNormal"><span style="font-size: small;"> Pour terminer cet article, la </span><span style="color: red; font-size: small;">figure 11 </span><span style="font-size: small;">vous indique un schéma très simple mais néanmoins suffisant, vous permettant de lever le doute sur le fonctionnement de chacun de vos triacs.</span><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg8OEhLV0mQOOfID8WHPAdL54Gfk9y7aRcv15BGuHQEOY6GsI4Dg9UyCu-0q6hnk8HmKIeAemkcrs413LNi2DQfuNm_qfy217oVxkPxaglpnNuIf8ee1jJC42dFLloKAALfPUNZ8tP8TAs/s1600/11.gif" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" height="114" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEg8OEhLV0mQOOfID8WHPAdL54Gfk9y7aRcv15BGuHQEOY6GsI4Dg9UyCu-0q6hnk8HmKIeAemkcrs413LNi2DQfuNm_qfy217oVxkPxaglpnNuIf8ee1jJC42dFLloKAALfPUNZ8tP8TAs/s320/11.gif" width="320" /></a></div><div class="MsoNormal" style="text-align: center;"><b><span style="font-size: x-small;"><span style="color: red;"> Figure 11</span></span></b></div><br /><br /><span style="font-size: small;"><span ;mso-ansi-language:fr;mso-fareast-language:fr;mso-bidi-language:="" ar-sa="" new="" roman="" style="font-family: 'Times New Roman';" times=""><span style="color: magenta;"> S1</span> permet de vérifier l'état de l'ampoule qui doit s'allumer, indiquant du même coup que le montage est bien sous tension.</span></span>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-3442961482921053297.post-89544612828931234542010-04-09T15:52:00.000+00:002011-05-18T16:54:51.647+01:00schema electrique : Va-et-vient<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhzDki77FlhYqjtmCcw8oQM-eKgPiN8seOqB8HbPlyIC3wPKZNB72cvUg48Z-JwytC9_h4VD1lM0xuIGvOosxuIiENBzLrzvmv-opIllgeAiLZKmIXiXPQx0mcS5GaDi4wuSoP3jmpC0HY/s1600/va_et_vient.jpg" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" height="200" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhzDki77FlhYqjtmCcw8oQM-eKgPiN8seOqB8HbPlyIC3wPKZNB72cvUg48Z-JwytC9_h4VD1lM0xuIGvOosxuIiENBzLrzvmv-opIllgeAiLZKmIXiXPQx0mcS5GaDi4wuSoP3jmpC0HY/s200/va_et_vient.jpg" width="137" /></a><span style="font-size: x-small;"><b></b></span>Va-et-vient : Allumer et éteindre une lampe avec Deux interrupteurs<br />éloignés l'un de l'autre. <br />Va-et-vient allume et éteint une lampe a travers deux interrumpteur<br />eloignés entre elle <br /><a name='more'></a><br /><script type="text/javascript"><!--google_ad_client = "pub-5960961930419712";/* 200x90, date de création 03/04/10 */google_ad_slot = "6474320149";google_ad_width = 200;google_ad_height = 90;//--></script><br /><script src="http://pagead2.googlesyndication.com/pagead/show_ads.js" type="text/javascript"></script>Unknownnoreply@blogger.com0tag:blogger.com,1999:blog-3442961482921053297.post-25777326323971699072010-04-09T15:34:00.000+00:002011-05-18T16:55:28.576+01:00Schema Electriques Interrupteur simple<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgjcE8Z_eZwwZV7aJFPCCsGwjg3jHlHhFHIwiXcawOctj_opChGqpBc8GgGAIt2pcnRV2ew1hyrcPWi0ZRPo8UiTFVpKGNwOIIbLpvmAc2-1KC1Tbry1LgIDKZ3TIpx9qDQpTZHrzXZzCo/s1600/Interrupteur_simple.jpg" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><img border="0" height="200" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgjcE8Z_eZwwZV7aJFPCCsGwjg3jHlHhFHIwiXcawOctj_opChGqpBc8GgGAIt2pcnRV2ew1hyrcPWi0ZRPo8UiTFVpKGNwOIIbLpvmAc2-1KC1Tbry1LgIDKZ3TIpx9qDQpTZHrzXZzCo/s200/Interrupteur_simple.jpg" width="137" /></a>Allumer et éteindre une lampe avec un seul interrupteur. <br />Voila une schema electrique pour allumer ou eteindre <br />une lampe a travers un seul interrumpteur electrique<br />simplifier <br /><script type="text/javascript"><!--google_ad_client = "pub-5960961930419712";/* 200x90, date de création 03/04/10 */google_ad_slot = "6474320149";google_ad_width = 200;google_ad_height = 90;//--></script><br /><script src="http://pagead2.googlesyndication.com/pagead/show_ads.js" type="text/javascript"></script>Unknownnoreply@blogger.com0