Secuenciadidacticaestudiantes

Showing 36,041-36,060 of 41,708 items.

#	ID	Actividad	Estudiante	Fecha de actualización	Solución

36041	46118	3338	9365	2021-10-01 21:46:15	<p>profesora Yanneth, envio dos archivos de la actividad de sociales porque no me dejo en uno solo.</p><p><a href="/web/uploads/9365/d413be9c2e-descubrimiento-de-america1.pdf">d413be9c2e-descubrimiento-de-america1.pdf</a></p><p><a href="/web/uploads/9365/d413be9c2e-descubrimiento-de-america1.pdf"></a><a href="/web/uploads/9365/4681c54b99-descubrimiento-dde-america2.pdf">4681c54b99-descubrimiento-dde-america2.pdf</a></p>
36042	46119	11255	14053	2021-10-01 22:30:45	<p>Taller de química 29/09/21</p><p><a href="/web/uploads/14053/6a37f95223-21.pdf">6a37f95223-21.pdf</a> </p>
36043	46120	11254	13989	2021-10-01 22:39:19	<p><a href="/web/uploads/13989/866c0a2cc6-camscanner-10-01-2021-2238.pdf">866c0a2cc6-camscanner-10-01-2021-2238.pdf</a></p>
36044	46121	11251	9740	2021-10-01 23:38:51	<p><a href="/web/uploads/9740/17b2bb51b5-tarea-del-universo-6-1.pdf">17b2bb51b5-tarea-del-universo-6-1.pdf</a></p><p><a href="/web/uploads/9740/17b2bb51b5-tarea-del-universo-6-1.pdf"></a><a href="/web/uploads/9740/110939aa84-socialesosleidy-saaraim-figueredo-bermudez.pdf">110939aa84-socialesosleidy-saaraim-figueredo-bermudez.pdf</a></p>
36045	46122	10589	14058	2021-10-01 23:42:41	<p><img src="/web/uploads/14058/1fe30b1729-16331497956825339997295023529578.jpg" style=""></p><p><img src="/web/uploads/14058/d3abc9cf6c-16331499151925765706471992559060.jpg"></p>
36046	46123	3226	9747	2021-10-02 00:18:27	<p><a href="http://sinapsis.club/web/uploads/9747/390dc39c1e-documento-1-14.pdf">http://sinapsis.club/web/uploads/9747/390dc39c1e-d...</a></p>
36047	46124	9532	9357	2021-10-02 09:06:45	<p><a href="/web/uploads/9357/ac0a294112-formato-de-documentos-tema.pdf">ac0a294112-formato-de-documentos-tema.pdf</a></p>
36048	46125	10594	9357	2021-10-02 09:12:32	<p><a href="/web/uploads/9357/e171f159df-documentos-fuentes.pdf">e171f159df-documentos-fuentes.pdf</a></p>
36049	46126	10618	9335	2021-10-02 09:40:41	<p><a href="/web/uploads/9335/1998016dc1-dominio-y-conduccion-del-balon-en-el-futsala.pdf">KAREN TATIANA MOSCOSO HERNANDEZ</a></p>
36050	46127	11053	9389	2021-10-02 09:50:53	<p><a href="/web/uploads/9389/91b9ea1545-trabajo-de-naturales-8-1.pdf">91b9ea1545-trabajo-de-naturales-8-1.pdf</a></p>
36051	46128	7348	9716	2021-10-02 10:10:23	<p><strong></strong><a href="/web/uploads/9716/62122becd1-ingles.pdf">62122becd1-ingles.pdf</a><span style="background-color: initial;"></span></p>
36052	46129	10712	16305	2021-10-02 10:46:38	<p><a href="/web/uploads/16305/f0b76803d0-img-20211002-wa0009.jpg">Momenclatura</a><a href="/web/uploads/16305/8b75b47f8b-img-20211002-wa0009.jpg">8b75b47f8b-img-20211002-wa0009.jpg</a><span style="background-color: initial;"></span></p>
36053	46130	11255	16312	2021-10-02 10:55:42	<p><strong><span style="color: rgb(0, 0, 0);"></span>1. MÉTODO DEL tanteo O INSPECCIÓN</strong><br></p><p>Este método es utilizado para ecuaciones sencillas y consiste en colocar coeficientes a la izquierda de cada sustancia, hasta tener igual número de átomos tanto en reactantes como en productos.</p><p>EJEMPLO:</p><p>N2 + H2 ? NH3</p><p>Para balancearlos hay que colocar un coeficiente 3 al H2 y un coeficiente 2 al producto NH3:</p><p>N2 + 3H2 ? 2NH3</p><p>LAECUACIÓNHA QUEDADO EQUILIBRADA. EL NÚMERO DE ÁTOMOS DE CADA ELEMENTO ES EL MISMO EN REACTIVOS Y PRODUCTOS.</p><p><strong>2.- MÉTODO algebraico.<br></strong></p><p>Para realizar este método de balanceo, se sugiere seguir los siguientes pasos:</p><p>1. Se asigna una literal a cada especie química de la reacción. (A, b, c, d, e, f, g… .etc.)</p><p>2. Se establece una ecuación matemática para cada elemento participante en la reacción, utilizando las literales antes asignadas.</p><p>3. A la literal que más veces aparecen en las ecuaciones se le asigna el valor de 1o a vecesse puede asignar el valor de: 2</p><p>4.- Se resuelven algebraicamente los valores de las demás literales.</p><p>5.- Si los resultados obtenidos son fracciones se multiplican todas por el mínimo común denominador, obteniendo de esta manera resultados enteros.</p><p>6.- Los valores así obtenidos corresponden a los coeficientes estequiométricos de cada especie química, por tanto se anotan en la reacción original.</p><p>7.- Comprueba ahora que la reacción encuentre se balanceada.</p><p>Por ejemplo:</p><p>Al + MnO2 ----------- Mn + Al2O3</p><p>Asignando literales.</p><p>Al + MnO2 --------- Mn + Al2O3</p><p>a B C D</p><p>Estableciendo una ecuación matemática para cada elemento:</p><p>Al: a = 2d (especies en las que aparece y el número de átomos que hay)</p><p>Mn: b = c</p><p>O: 2b = 3d</p><p>Como la literal b aparece en dos ecuaciones le asignamos el valor de 1 y procedemos a resolver algebraicamente los otros valores:</p><p>b = 1 por lo tanto si: b = c entonces c = 1</p><p>Si 2b = 3d entonces: 2 = 3d y por lo tantod = 2/3</p><p>Si a = 2d entonces: a = 2 (2/3) por lo tantoa = 4/3</p><p>Como tenemos fracciones, multiplicamos por el mínimo común denominador:</p><p>A = 4/3 x 3 = 4</p><p>B = 1 x 3 = 3</p><p>C = 1 x 3 = 3</p><p>D = 2/3 x 3 = 2</p><p>Por lo que los coeficientes estequiométricos, ya los obtuvimos, entonces procedemos a anotarlos en la reacción original:</p><p>4 Al + 3 MnO2 --------- 3 Mn + 2 Al 2O3</p><p>Si comprobamos la igualdad de átomos:</p><p>Al: 4 contra 4:</p><p>Mn: 3 contra 3;</p><p>O: 6 contra 6</p><p>Ejemplo 2</p><p>Para balancear de modo algebraico seguiremos los siguientes pasos:</p><p>1. Identificar reactivos y productos.</p><p>2. Al elemento que aparece la mayor cantidad de veces se le asigna el coeficiente 2.</p><p>3. Se asignan literales para cada componente.</p><p>4. Se resuelve sumando los valores de las literales de cada uno de los lados.</p><p>5. Colocar el respectivo coeficiente a cada compuesto.</p><p><img 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QQQQAABBBD4iADB4EcasoVq6CDoqUBCj0p2Uoz3jN1ljz6qchgDXaYzwfEkh34JJr1nFrsTt3smg0GnnPNzkieyaaELUgYEEEAAAQQQQACBAgGCwQIsFj0W0EGHCYSOFy2ba49a+cFR4HufOYKXX4gTt4iuZT4TDOaXLGfJVDCo5tc3yykZyyCAAAIIIIAAAgg8KUAw+KT+1/LWAVDgds2CWyxPk+jRrf6mkcFRiuyhsuUNpHp59flMMPjbkcFUsHi6TVgRAQQQQAABBBBAoGkBgsGmm+d9hdu9TVSq5/nufgbt5mcGC16A4wZWZ4PBuu3ulimQ9hJIrwOqvwjeA8VgEgIIIIAAAggggMBvBQgGf+v9L3JzXqByamSsjCn7eb6yZNeli35SQgdW3vN+twfDa1H3H9bbVTt5+LyhvdwP2mxfUKYggAACCCCAAAII/FqAYPDX4uSHAAIIIIAAAggggAACCDQgQDDYQCNQBAQQQAABBBBAAAEEEEDg1wIEg78WJz8EEEAAAQQQQAABBBBAoAEBgsEGGoEiIIAAAggggAACCCCAAAK/FiAY/LU4+SGAAAIIIIAAAggggAACDQgQDDbQCBQBAQQQQAABBBBAAAEEEPi1AMHgr8XJDwEEEEAAAQQQQAABBBBoQIBgsIFGoAgIIIAAAggggAACCCCAwK8FCAZ/LU5+CCCAAAIIIIAAAggggEADAgSDDTQCRUAAAQQQQAABBBBAAAEEfi1AMPhr8U/nN8mh72TXLf/FqGs7CmtaP8jptQZb/ZaqvbAmWx26rpdDaWNMg+zPrPdCKYqMAAIIIIAAAgh8XYBg8Ost/ED9VPDXe1HGNPSye28EJaUcpVBB7qvrIOU0iDUA1EF6UXC+GBAMPrBVkSUCCCCAAAIIIFBfgGCwvum/TzEWDPoB4h1QdrBTL/15NO0X5a9X5oyU9CifkPP4bcbyahFGBjOhWAwBBBBAAAEEEGhfgGCw/TZ6XQmfDAb1CF5/4vbHI+UlaBLmdteM0UE96ubdLnuUxSPzVL2yRgbtW0vVLb+VfR+pPJkigAACCCCAAAIIEAzSB6oLOIGQCYi6/a2j1TM2CergrZNiLH0gziTg/p1vcRVyVENoa9ruMs43O8jSyxeOvq2J+UGY9exlRkC6JhP7MIrd7byhRXV7mvxGQTAYQmIaAggggAACCCDwQgGCwRc2WutFvnVkUAcjVlBkBZvri2usaTVu7VTBoJ1OqH7BNlnLejYYDKZaaeIoRdaooHpO0BoJ1MGt9b1SaUgGAQQQQAABBBBA4PcCBIO/N/98jqFgyQ+obkVYApa6I4Pbk3Wh+rn1sV82oz6fDQbvGxkcRWaZtKUaZV1qSDDoNjXfEEAAAQQQQACBFwsQDL648VoteihYUtN+8yZONeJVeeTKCYC8kbJAI7hvTr0SDAYSrzBJlc8O7oT35lc3iyUgNaOIjoW7JN8QQAABBBBAAAEE3iVAMPiu9mq8tN5I1hJx6EDQ3LppgoqbanLP20TVL0uoZ+Xm21PXQCpWh2U0zSyv/95c71hR/OlOW+j6ZATOdn36XvZ6vcyRRb8AfEcAAQQQQAABBBBoRoBgsJmmoCAIIIAAAggggAACCCCAwO8ECAZ/Z01OCCCAAAIIIIAAAggggEAzAgSDzTQFBUEAAQQQQAABBBBAAAEEfidAMPg7a3JCAAEEEEAAAQQQQAABBJoRIBhspikoCAIIIIAAAggggAACCCDwOwGCwd9ZkxMCCCCAAAIIIIAAAggg0IwAwWAzTUFBEEAAAQQQQAABBBBAAIHfCRAM/s6anBBAAAEEEEAAAQQQQACBZgQIBptpCgqCAAIIIIAAAggggAACCPxOgGDwd9bkhAACCCCAAAIIIIAAAgg0I0Aw2ExTUBAEEEAAAQQQQAABBBBA4HcCBIO/s/4/OY1Cdl23/u+H6eV1n+TQm/r08l3VOVH2aZB912I9T9SlxZ7XrG+LWJQJAQQQQAABBO4UIBi8U/cfpj0Nvew6Ice17qMUXSffHBBOg1gDwFF0susH+Zbwtrzsc3t1DQaD5XVZO2FDH9r1bQiJoiCAAAIIIIDAjwQIBn8E/S+yiY146JHC+0ea7GDhNm9dRzvYvS2nJeFJDqJS8Jlb9lg73l3VkvRz61KSZnTZim2g8niDb9SCGQgggAACCCDwJQGCwS+15sN12Y8KmgL9anRwlKK/OehUJ/IZI4N6BNHcKiu2cVIjkv+3YiCSWfY1WBnV7aLz7bHNjezm1kVB27ctZ7Tdvm1qtIF9i6syvbmf7ivBFAQQQAABBBBAYCdAMLgjYcJZAR0MBk+25xPhnwQUetSlk2K86UbOUaRvebUDFV2eKyOJNQKRpUVzyq4WXQzX22FX09Ke4QdA5rnLTnaXAuQ5wMvqT47/fFGiPOvrbaAvDpiMfzRSXtpaLI8AAggggAAC/0+AYPD/tfltNb59ZNAe4TGjbgd/s4KFIg018lhwy+Za3tJg8CCIKsnfqVtB2XUA5Y5cqWCmvqdTwIIv+XVRffJcuWu2gQpCLc+Ab0HlWRQBBBBAAAEEEKgmQDBYjZKEzIiSGQBZRX558rvkdcfI4Chyg7rlJSEaQn3OXW8Vsz5cH5VSieWX3YwMWsGLXv9MMHgQUO06iVXlxMeSuugLFBfymotysQ10n1Sj1UvFfrk9JCyZjQACCCCAAAL/W4Bg8H+3f/Xaz8/K2cHPHBidG50pLd59zwyqoMI+mRcHvy/hBiDPB4MlZdfifrCiv9ttWtou9ZavUZejtguX9GIwKJeg2Izq+r7hTJmKAAIIIIAAAgjcLkAweDvx/8tAB0PW7ZtrEHUzxV1vE3VeBqPr5Y6a7aqlT/at5+PUOiYQ2C2cmnAtECkuuy6OP6LXRiB4ri7eC2ROjdJea4OZdHsZT9f3y4t52nBN9UDmI4AAAggggMB3BQgGv9u21AwBBBBAAAEEEEAAAQQQiAoQDEZpmIEAAggggAACCCCAAAIIfFeAYPC7bUvNEEAAAQQQQAABBBBAAIGoAMFglIYZCCCAAAIIIIAAAggggMB3BQgGv9u21AwBBBBAAAEEEEAAAQQQiAoQDEZpmIEAAggggAACCCCAAAIIfFeAYPC7bUvNEEAAAQQQQAABBBBAAIGoAMFglIYZCCCAAAIIIIAAAggggMB3BQgGv9u21AwBBBBAAAEEEEAAAQQQiAoQDEZpmIEAAggggAACCCCAAAIIfFeAYPC7bUvNEEAAAQQQQAABBBBAAIGoAMFglIYZCCCAAAIIIIAAAggggMB3BQgGv9u21AwBBBBAAAEEEEAAAQQQiAoQDEZpmIEAAggggAACCCCAAAIIfFeAYPC7bUvNEEAAAQQQQAABBBBAAIGoAMFglIYZCCCAAAIIIIAAAggggMB3BQgGv9u21AwBBBBAAAEEEEAAAQQQiAoQDEZpmIEAAggggAACCCCAAAIIfFeAYPC7bUvNEEAAAQQQQAABBBBAAIGoAMFglIYZCCCAAAIIIIAAAggggMB3BQgGv9u21AwBBBBAAAEEEEAAAQQQiAoQDEZpGp8xCtl3ney6TvZikFPjxaV4rQqMUiz9SPUl9V+MrZaVcv0PgUkO/dwXu66Xw6mdm+nXZ9evKb3Vh22rput/TmvrU+e3kaf8TpR9GmR/el9wVz1P1OOuolxJt0nbKxVi3TMCBINn1J5eR2+85mRp+ctZxtOt8s78x1Hasd8ohPP9nZWi1G8WmAaxBoCj6GTXn7zYpfaTZ9etBrgEpeyfq4mSkJTVtpEHMMvL3tKFnQ2svB7buu18atO2HZ//UxKCwRe2tb0TUp/1iM7jJz0vhKTInsAkB0aZPRO+PiqgL3ydu0AxDb3szw0rVqryPHLwbBkqVYVk2hW4sI2cq1TF40Ru2fVyLYzyR8Ry6xFZvWxyRX+Vceu2ZTgsfVKAYDAJpza8fg649C2Z9jhKcuUfLDBf2eGE4wfUV7MYl8Bd3Y7ZYvA+DVJknjzrERtzeymjHld7BuvHBNSJSu62Mo1SLLeXilHtF88FkbGiFE9fThCFGt1U20rJdmLVpR8GKZq7Ra5YgxXuEsjcRurtsysGI5llXwOWUd0uOm9PTZ3z5NZD9YHL5wE1/O1bXJVnw4H2XdsN6ToCBIMOR+CL3nDnDWXemZ45wfA3vOXkoPQEIVA8vZPMPVkKrc+03wgsJ4bzpYQ5gC85N5wLeWM/0hcIt9vzDlHsA59Tr8O1mIlAuYB6NjrnAoXZT4/zA4aT+l6+gamtwHpe0dpPn9hXq5HJTt12rTZ6vZ1kPo+r6tz3cjB10em0dhGyvClZ4yaBnG2k6j67RjCyWOSUXS26bD/rRdSS7Wllr7dtr0maD0X1MOeQF84DLt7Bo89lzf7R7DtPPZttAPj7dgGCwawWnOSors7qq85tXUFR5WIbzmrERxd6/pa1VPVPHOD1QUSdMJuDWyoP5iNQIqBG+jL2b/rEUMgldtIZqO3NnOuU5FhzWX+bVydg6cB2GdG0duot1KWmC2nVFMjcRkyWp/fZB4FUzjZq8nf+FpRdb+PuuVfe9uRkeNOX/Hr4+4T8AtX0V/sYyzJgm18ulvyKAMFgsiXVhj5f0Z1HBq2NKLmuWeBgQ75wxjKN4xYIToMcuHhswJv7qw4C50Yq7Krc04/mHEYpsvvifEVzrs9y8moXk88IVBDIfZnR7gRLXaU/fYGi3jbmb/M5J6+7uphAt4InSXxPIHcbkbLmPvvEhcMAfX7Zzcige+6Vsz252dbbtu10S+rh7xPsdPI/X/TX+xTrLgWCwXz6Dy9JMJhoXL3x6tftj8vtQ+4OKbH6bbNNuczPATA6cxt1nYT9HW7B83l1CpBIZRTZIynuAY1gMCHL7BMCqo+t1yYS24o6KZyfdZ3v4BjUS7XWlU9kXmsVZ5tX20n62LHVRcppHOQgGqlLLRPSqSZQso3U3WdfDEZ0bJe/fWswZ1syweHzd6SUtEGsHrnP6W8d56r/EhSbEV3fdsuIT/9IgGAw1djLbRW9GOWoRnfUS2RynmFJpXthvt6xLw9Rr8Gg2bAvpMuqNwust+i0d2tlydXN9fkNuw/S/27uPP8neRUQrfs13ccSQZQeCVQvZZqfeVX7R/Xbq03cKGFt81nxaawu1m2j/6cnUNOYQPE2ok/4ve3q9D77WjBSXHaN4I/qPR8InquH9wKZU3cwXPOfObcX8XR9v7yU53nTWH9n+v0CBIP3G5MDAggggAACCCCAAAIIINCcAMFgc01CgRBAAAEEEEAAAQQQQACB+wUIBu83JgcEEEAAAQQQQAABBBBAoDkBgsHmmoQCIYAAAggggAACCCCAAAL3CxAM3m9MDggggAACCCCAAAIIIIBAcwIEg801CQVCAAEEEEAAAQQQQAABBO4XIBi835gcEEAAAQQQQAABBBBAAIHmBAgGm2sSCoQAAggggAACCCCAAAII3C9AMHi/MTkggAACCCCAAAIIIIAAAs0JEAw21yQUCAEEEECgWYFpkuM0RYo3ydCsaRyj60yhFSKpMxkBBBBAAIHaAgSDtUVJD4FXCYxSdJ3srP9izK2AWlfI8OKTHHqTbi+H2LnzmtUoRT/I5GLr8nxA4PcC4zDIMdpJJzkM+61hGtU6kxxFL8Pb1iiH9AYSrKzabvn3HwVK969SymmQfZezL/6l54l6/LJ4uXk9avsRw1xrlrtFgCPJLawkisBLBNSIhVXUUcSCO2sh/VEFgvETi2kQawA4ik52OYGePqDm5u+Xh+/fFjAXLeJ97vb6j0KKYZJjLBoctz4fLIta397YrIXU9hKZZS21fTQXb7YpfPpPAuX71wa2n0ADldcjkMjjk561/Ybh44347wtAMPjvuwAACBiBSQ4ib3ROBXixE1uT2vq3JMgbheyyE15z4MN/EFD9KOeiwk0WamRPD+CNQvaBkbx1fiT/MTBqaBadhtiooVli+8to4GbBJzPil3Ex4dHRq4yWKjlOZCR3vEj+se44nWVuKxebVvgAACAASURBVLY/NcySYaGXCBAMvqShKOYHBFSgY27HfPCkNio5DXrkIzrfzFAHnJLyFy2vbnl5cPTH1JG/zQmogCkUhP2qoFuwN0oRuGCxzd+XSD0zGL27VJ/P5wWDBIJ7238/JXf/qgOFXg6jul10voX/ye1p12659VArXj6W1ggG7dszlWcDx61MQ323jjkXCezLdm3DhM8LEAx+vompYBMC+kBsrt7Ot5WU74P9g495Jq+rMppm325yZKZOyotG7yIjKbE8ikYdY4kw/f0Ck3qOdO7jYlTbjNl+HqracrFkfhnMvgyx7UdN74WQQgg5RG4xja1rcjEXkcx3/iKwCuTuX/UxyLplf/ledhy68RhUVA+zL7hwLM28C2Z19j7ogMrg6eC0gWAwx9AOGJ3zEq+CfP1XAgSD/6q5qexTAk+PaqTrnX+ltKwu5S+GKUs/XTOWeKGAOblagqdJfTcnXkXVufHkdVeOsy+CCb94xiTPaKCR4O9eoGD/qk/83YBFBTRtjA7m1+P88eFgX1Byp4tuBBWEWpYB231b2VMOynJqP6fSzjecq2DuVDKBtV0+Pv83AYLB/9bi1PcRAXUAO3cyaxf3jgOIST9865uZa/8tORjnv5Bmy6Ek/W0tPn1GwFyttu6rVH3i9DnST2HCPy1xVITYT0swGnikxjwlULR/DQQs5cHgPcegknpUO5ZeGRnUltZz8wHbX/fQfMN5NHU+H2ngjotfQ5FfUIBgMMjCRAQqC/gHi9zn8yoXI5rcwZsO/XVyD8bOCXxBfblN1Bf/X99Vv3FGK9StT6dvEb3n5PXuFjGjgUe/T3h3GUi/bYHi/WvgGHR+u6pnU6Me6i2/Zf/y74QJp7vsV8yIom8bXum2qSWGatntwjTB4G2N8rKECQZf1mAU98UC9kPvp09u76l//lXF5e115iAYKY5+nsI8oK7/WrfURNaZJ6uDbO6yhwkx86UC+mKAPrmbpPpdv2E4e4voOwG2QDD1+4TvrB+lvi5wbv/qXxh5/vbAc/XwXiBz6lh6NRg0b3Fdntvv++WlPL83LTbUgav1vgF1fE4cz6/3WFJoXYBgsPUWonwINCigT9hLfhgttw6nnw3LzYDlmhfQI4HqBGX+3T51JbsXQ9Hv8DVfx0ABo7eFFozaB5JlEgIIIIAAAocCBIOHPMxEAIGwgPcAfXihsqn6iuXvr6yWFZKlEagvYEYDQykf/T5haHmmIYAAAgggUCJAMFiixbIIIGAJqNuOagVvPLtgwfLxHwkcBYKp3yf8R0xUFQEEEEDgJgGCwZtgSRYBBBBAAIGYQPS20GWFnN8njKXNdAQQQAABBHIFCAZzpVgOAQQQQAABBBBAAAEEEPiQAMHghxqTqiCAAAIIIIAAAggggAACuQIEg7lSLIcAAggggAACCCCAAAIIfEiAYPBDjUlVEEAAAQQQQAABBBBAAIFcAYLBXCmWQwABBBBAAAEEEEAAAQQ+JEAw+KHGpCoIIIAAAggggAACCCCAQK4AwWCuFMshgAACCCCAAAIIIIAAAh8SIBj8UGNSFQTKBNSPxvfS/N5ZP0zR1UfRyaP50RWZgQACCCDwzwTUsaVbji29PDi0tOsyDbLvnir7B/zabVlKFhAgGAygMAmB/yQwDXNAGA32RqEP6tH5/wmLuv5W4NETMr+q2wmaGP15fEcAASMwDWINANWFxK4fZPxSo1mrpb+jFJ0KZp8JBt/v11JbUpYcAYLBHCWWQeDDAsfB4CjFcoWXYPDDnaDJqj17QuaSLGUhCnRZ+IZASkBf0BHy/usnkxxExaCzlQtRP/NLNSTzvyxAMPjl1qVubQlMwxpYdf0vDo551Y8Hg8vBlZHBPEiWqi/QxAnZPCLIxZD6zUuK/0BAbcM5I4PLcUY/tpCz/I6uRjC4jf7Pj088MzLoVC3XT0qpR2H1iGYnOy5cOYx8ORYgGDz2YS4ClQTmkQV9QqlPcM88g+cfqMwzGdd2/LFgcL1VhWCwUh8gmTwBv58/fEKmt1chhbrdTZ1ocZKV14wshYASGEX6efNlG5tHD+djZflmdj0Y1MGUyVgf9x7e9+T6qeXsoNHxpBsikBYgGEwbsQQC1wWWgMocZ64nWDGFULCnRjHNU/+h+RWzJykEbIHrJ2R+MHntoom+WCKEHNWZqj7J6mST27GNyGcEmhBQjxmkb91U29i5kfeDbT0jX5dIBaFW8Ke3deu7u3Dg20FZTu8w8vycwizH665r5+4jp3x8aVKAYLDJZqFQnxOoElDdcbCZr9yqEQ/7YGxGC+dbZbaTaXuZz7URFWpA4OoJWf0q+CeqKlhlO6jvTIrfExjVRZSMas0XXHKWPErs4sigf6GnOBg8Ktu5ebl+c+rziOp854L6nGd/rmSs9TUBgsGvtSj1aVNgOdDoq3XqtWrTKIexjferqdtB/WDQQawSyDop8gWBsECVE7K6F038E1WCwXDTMRUBW0BtN+uAmH2nib2Q+ewHXqnlzXrO34vBoFz2G2ZE0S+Tk9f9X4r89E0LvXULO8Hg/S30rRwIBr/VntSmYYFJPTuxPNzd13zr2ek6L1cSzQPn6q85ENppEgzaGny+VaCtEzJdVeekUG0zJbeO3YpF4v9VwOmT7SHoW73t40rONrPe3qjuRDkzqnU1GNxuA9d3xPT9crw+U5ZrbXLKT/eJ7S6euQ7pW3SvlZS1vyJAMPiVlqQeCCCAwBcE7JOaB0/IHErrRHUd7XAW4AsCvxIwF/G4KPErcfJB4OsCBINfb2HqhwACCCCAAALfEWh8ZPA70NQEgf8hQDD4P9qZWiKAAAIIIIDAFwRMMDgO26MH5u3PX6gfdUAAgZ8KEAz+lJvMEEAAAQQQQACBCwLmVmrzjPfyvewW5rovWrpQG1ZFAIGHBQgGH24AskcAAQQQQAABBLIFzMig9ULqFt5y6/8UEd+9F7o4L9V5fl52f2PBzwsQDH6+iakgAggggAACCHxGoEowyMjgZ/oDFUHgogDB4EVAVkcAAQQQQAABBH4m4AeD+vvvfwLhZ/UlIwQQuFWAYPBWXhJHAAEEEEAAAQRqCvijegSCNXVJC4H/JkAw+N9anPoigAACCCCAAAIIIIAAAlJKgkG6AQIIIIAAAggggMA/F7BHXHvJr3X88+7wj6pPMPiPGpuqIoAAAggggAACCOwFpkGsAaB6O2tnfrpjvyhTEPiUAMHgp5qTyiCAAAIIIIAAAghcEuClPJf4WPldAgSD72ovSosAAggggAACCCBwp4AKBhkZvFOYtBsSIBhsqDEoCgIIIIAAAggggMDDAqOQPQ8NPtwIZP8rAYLBX0mTDwIIIIAAAggggEDjAqMUjAo23kYUr6YAwWBNTdJCAAEEEEAAAQQQeK3AKPjdxtc2HgU/JUAweIqNlRBAAAEEEEAAAQS+JDANvRTjUqNpkIJbRb/UvNQlIkAwGIFhMgIIIIAAAggggMD/ENA/J9F1slv/81uD/6PlqSXBIH0AAQQQQAABBBBAAAEEEPiHAgSD/7DRqTICCCCAAAIIIIAAAgggQDBIH0AAAQQQQAABBBBAAAEE/qEAweA/bHSqjAACCCCAAAIIIIAAAggQDNIHEEAAAQQQQAABBBBAAIF/KEAw+A8bnSojgAACCCCAAAIIIIAAAgSD9AEEEEAAAQQQQAABBBBA4B8KEAz+w0anyggggAACCCDwNoFRiuU38Prmfgx9kkPfr7/RtyvfNMh+/f2++bf81h93f1szUF4EPiZAMPixBqU6CCCAAAIIIPBRgVHogGsXbDVS3WmYA0K/fGb69oPuQo6NlJliIPDfBQgG/3sPoP4IIIAAAggg8A6BVwaDkxzEIKd3CFNKBP6dAMHgv2tyKowAAggggAACrxQwwWAv5tsu+6GpETYzAuiODFq3t/a9FMNIYPjKzkehvypAMPjVlqVeCCCAAAIIIPAtARMMqmcGl+fw3MCrpLrqOb/5+b3t9s3l+8kH+oLB4FJmJ4+e20RLWoplEbhTgGDwTl3SRgABBBBAAAEEagkEgsHuZOBWq0hOOnb5nBnqyySnaZSDmJ8rbKnYu6IyAYF/JEAw+I8am6oigAACCCCAwIsF7GDLvKHzdFRVf2RQ2uU7YB5FJ08X+yBdZiGAQLkAwWC5GWsggAACCCCAAAK/F7CDreVzS0HVNOzfdjrfOmo9KziNUrRU6N+3Ijki0JQAwWBTzUFhEEAAAQQQQACBiMAopBgnOS63WvbNBFXbS2LWZwP75Q2i0yDF+myiCgp5r2ikdZmMwCMCBIOPsJMpAggggAACCCCAAAIIIPCsAMHgs/7kjgACCCCAAAIIIIAAAgg8IkAw+Ag7mSKAAAIIIIAAAggggAACzwoQDD7rT+4IIIAAAggggAACCCCAwCMCBIOPsJMpAggggAACCCCAAAIIIPCsAMHgs/7kjgACCCCAAAIIIIAAAgg8IkAw+Ag7mSKAAAIIIIAAAggggAACzwoQDD7rT+4IIIAAAggggAACCCCAwCMCBIOPsJMpAggggAACCCCAAAIIIPCsAMHgs/7kjgACCCCAAAIIIIAAAgg8IkAw+Ag7mSKAAAIIIIAAAggggAACzwoQDD7rT+4IIIAAAggggAACCCCAwCMCBIOPsJMpAggggAACCCCAAAIIIPCsAMHgs/7kjgACCCCAAAIIIIAAAgg8IkAw+Ag7mSKAAAIIIIAAAggggAACzwoQDD7rT+4IIIAAAggggAACCCCAwCMCBIOPsJMpAggggAACCCCAAAIIIPCsAMHgs/7kjgACCCCAAAIIIIAAAgg8IkAw+Ag7mSKAAAIIIIAAAggggAACzwoQDD7rT+4IIIAAAggggAACCCCAwCMCBIOPsJMpAggggAACCCCAAAIIIPCsAMHgs/7kjgACCCCAAAIIIIAAAgg8IkAw+Ag7mSKAAAIIIIAAAggggAACzwoQDD7rT+4IIIAAAggggAACCCCAwCMCBIOPsJMpAggggAACCCCAAAIIIPCsAMHgs/7kjgACCCCAAAIIIIAAAgg8IkAw+Ag7mSKAAAIIIIAAAggggAACzwoQDD7rT+4IIIAAAggggAACCCCAwCMCBIOPsJMpAggggAACCCCAAAIIIPCsAMHgs/7kjgACCCCAAAIIIIAAAgg8IkAw+Ag7mSKAAAIIIIAAAggggAACzwoQDD7rT+4IIIAAAggggAACCCCAwCMCBIOPsJMpAggggAACCCCAAAIIIPCsAMHgs/7kjgACCCCAAAIIIIAAAgg8IkAw+Ag7mSKAAAIIIIAAAggggAACzwoQDD7rT+4IIIAAAggggAACCCCAwCMCBIOPsJMpAggggAACCCCAAAIIIPCsAMHgs/7kjgACCCCAAAIIIIAAAgg8IkAw+Ag7mSKAAAIIIIAAAggggAACzwoQDD7rT+4IIIAAAggggAACCCCAwCMCBIOPsJMpAggggAACCCCAAAIIIPCsAMHgs/7kjgACCCCAAAIIIIAAAgg8IkAw+Ag7mSKAAAIIIIAAAggggAACzwoQDD7rT+4IIIAAAggggAACCCCAwCMCBIOPsJMpAggggAACCCCAAAIIIPCsAMHgs/7kjgACCCCAAAIIIIAAAgg8IkAw+Ag7mSKAAAIIIIAAAggggAACzwoQDD7rT+4IIIAAAggggAACCCCAwCMCBIOPsJMpAggggAACCCCAAAIIIPCsAMHgs/7kjgACCCCAAAIIIIAAAgg8IkAw+Ag7mSKAAAIIIIAAAggggAACzwoQDD7rT+4IIIAAAggggAACCCCAwCMCBIOPsJMpAggggAACCCCAAAIIIPCsAMHgs/7kjgACCCCAAAIIIIAAAgg8IkAw+Ag7mSKAAAIIIIAAAggggAACzwpYweAoRdfJruR/38u+76UQgxzG6dmanMl9muTvSm379nKomfE0ykH0st+1XS/FeAaGdRB4q8CN29lbSXS5C10O942FaV12S+WXmn+5AC9OAJsXN1666IfH/l+2/S/zSrNUWeJwH1glh5cl8sE2brYFfm99LRgMBR/D+MMA60xLTnJcA6fKQdlhcW5q3FEcBPC/rN9h5ZmJwI8EbtrOflT6+7LJccndN+akVbMmqfxS82uW5W1pYfO2Fssub/LY/8u2/2Ve2UInFszdB55I+vWrfKWN39AQv7eOBIN5QcSkrpyMgxS9N6LYC9nuQOHvkeeud0++o7Ds+6HxQPwNGyFlfLfAPdvZu01U6XNccpZ5QqLVcj1hUZondqVib1meY/8dLcX2ElfFJm5Te87vrS8Fg3b1VVDo3qYoZJt3KP4eeXa6J1/7gNBXvffUbl0+I/AWgXu2s7fUPl7OHJecZeI53Den1XLdV+N6KWNXz7KtlDj239EebC9xVWziNrXn/N66WjCoKSY3IDwOTpZRRXXLpj+y2HX6WcReDHKc6jxcNw39we2U8+ha9Pk6dV/+IKTQz0haI3HWbbLq2UlV3vizkxUb9/D2EFO+0OjusXmn6yB0HY7UbUttNo3axn7eVHmY2NRefu0T5lkHv+3VM6i7W40nOQ5C9wk7j65TfUcElg9smFXaMJBu7qQlf+Wyq4PVz4NWVh4lJwB2Wl20c1uJy+P+Yfp4rW3SzllWa5+K25mU0jb8dd+t29ZxF7uObt80+5LOe/Y4npZp01DZ57tI/P4/7+v1Nh/d6aTyS803pVINOu9L9L7c2n/P9Z73J2ofHi2KlVStPmv75+xP7SKkPxfYJLb/3OODLpPev8/7bPci8dyn1L5EvWvgnn1JxTauaTLDzHdTnT3vKTr2F7T95e2iIK+Eae5xxt7HmO1GvzvBP6dYzhOOtmt7G8zbB5otr+Ix88FtZtJ5z+8Aces/n9fOd/r9vo2NcvHfy/3ZyrHaucmcZnXrSuWrGwyqm5GSty0uJ/a7A/F24uF2xk52/RygWM1T/PHUxq6DnINyxeoQvF2zZENKVK/ogKDSOmHehYKyuVy2pRDCGxFevKzgw16+H0b9zOaujXeWczA5jZH0d8tHRqKrtmGiXYKzJ/1yn3R9O9mLUY7WRYs1+LDStbev0HxrUSeQOQ4GT/SPCtukLmv19qm4ne2Cwd/23bptHXext89YP7U256xbTt2yj3LYnaCF96tqG9gHYvGyz/09NV8tNT8LFKvffvp2Mcvepu7os7Z/zv50V57DCZk26mLbbp8abqPZKnZ8yN/frebqsZLDOuTOrNjGlY+Zp47BoX1s0bE/s+3F/gLN2ja7PhHbLjLzKu1nIYOlO9j7GHWhIl5mqx9H+pq9DcbScfeBNY+ZD24zBcfffhisl0zG+kFNl9zt3l6u4j6gwMbpM8Hzf3UIUoMmVl/cbVvbvCzrgvRyylc9GHQ3qv1O3tmATcARGP1TzyPOo0EbkLsx2h2g5HPOTkulNzknMGaUcn+iMi+ro32rofcn6rn5ltTFDb73ec5p+eamLm5OkzRXLJyOE0B323gO1o+eEd0tH2t3dYXDMjTlMOV17dUVOe8EZlfW2m3oiqW/eRu/GfV0KxJ2V6PjZmjVyshuy9B8a9HsYNBOU422zqM0XiHVFlF9m7yjfepuZ8/13bxt27S3U87ddqCWynHJWSYvLbdPqX246VemxPPftU/ZB8bdwTRVrtR8t5/FyjKPGtonlfvjV/3jgjv6rPd5VZ+5T9m4/UzfbREcscs7Pjj9UNdjvx9RLe8fL7tdm7v9JP2tZhvXNVFld7cHsy3sbdbtwToOBjdnL83wsSDV9jXNUnnVN3BNt0EDR1Ufs+xtOnxc3fpXuh612/Oxbca7k88Mujh+ZltdX7pozsfDwaDbJnX6+dY2qU81+7ObVvgc1JRn2Tda2+xue6xuXbl8UsrfBoP2Va3snb9d6dDB2TRI7t+8jT2UmtpR6531OMpxXG4dFeHbR3edIetkLJTr8TR749vnqY8Y1hWz8Aa8y8HruP7ByNl5dek2cZdPlcFun9SO2zuR8gu6q9gc0Jxvw0CCB5Oceuf0d8891J7J9rbK4+Qfs2lim9wKfW0bU+nY/SfV17Z8Y58cwy6Vnp339b5bt63tssXqkbNMnrFd9qwTfXWV0woI3e5qzwuVPTHf7uMZ+6tYX4hNv9pn3T6W3p/GyhGeXmITsg2k6u2n7LZy6zKfoKvRzmE5ZmqrQJKXJ9VsYyet6ybSTi/nOKAx0uc99jYWOlYk94V2uS5vFwX9rJKBXf/UPsZZ1u6wu46XqIda3narUJentpl8kwXJ2e4D20Vll13TpCbY+V/uz/vMruznq1vvi6djE1VGFZuUxyc3BINOpb0NxZlnHfjNCFDO38PtOAC0n5Sxsa8rLaNPVsSfU0a1zH7nXJLvWoDkB9t0n2d5sGQyPErX2XllNIizvNcnTH7b3zInJ+1gWWq24VbKnE9HhrH1U+uk5tvppm38q7Xmql/Z3yC7XZDDz7Xbp6z/HBZNXRW1bttNnXAkT768zJy0A4h12zrHJWcZVYn0cnbZA1XzJOav9jrubc2p/I7np5yDhTmcWLfP1i+fXfh7bOy28o87U+atgDWfG6xpeDatmIk9Pff8wV8utA3Z6fptsGxR1gWW/cn72XravWv7fNzP7LL6dcv97hvYaYbrv5Uuv67H9VAp2vnmlt1fzq/L77eZdD03ve3TVvd9f9rmlZ0/2Da+y5Zz+lN+G6fTmpeotZ+vb123fHNqdUcGnSsH+4CoRmdJbfTpZs5tGPvK3Ny59ctK1Eiguo1mib5H9bKB5cdJ7c64L2duvuka2EvYpvs8vZPZgi3tKF27nu5Jm12y7XPZ8mVOx2nXbsOtTjmfjgxj66fWSc230z22mZe007N3yiWfQ/3OLkf88x3tU9Z/4mWb5+QYbmmU5Z1K226blHEqrZwALm8ZVdt0Pe2y5+527HXc+qbyO56fttlaMP2pfp+tWz6/BvfYxNtqy1/dCqoe9RCRl6U4+5jIs1xbasefahqeTStmYk936lxwQdzdHmYLO93Q/NR2erae4ZY47md2WWsZ2GmG67+VNL+ux/VQKdr51qqLKenvtpl0PU2Z7L9b3e8JBlPtaJfF/5zfxv6aoe819/P1rf3HFVQ/vBaf1BwZ9ALB0FV0v7H8e5NDTVJ/Wl7DuGXN+f0+t/PsO3VevqX13TbOffCt03KGzvcbcDA/ry39kznXJv3of9nyZU5HabvzarRhUCs60ck/67YFu+7h9rTb+zgQd/tjbFmnjMGXd0Srd3mGm3et9rENM/v7QU3cMqb6elneqbTrtnVO2XKWUVjp5ZyyJ+8G0EOwzgtM3H1OKr/EfGcfeO02TLfN6vRZN81UHzvorMFZJTaZ20vi+BAsxjpxuXi6BIrOm8TdRl/XyPpQsY2d2wCTt4YvpTsw8du31nmPvY3tzzdUuUra/tp2kcrrDoN0/bee4+e/zfE/Jcz8u0V+csy8Z5ux/dT5QbJfOrfy7/cVvnEyPZ/+6veK+wC3Ltf38/daXy+for8wMmien1M/Ou8+oKseRA0f0rwT1PWFGqFuo9If9ZsYt7ecxdIt6UXuxh47/jidQR0Qgq8bD5VxGSLfJezmG3g3SEkl1mXtThY+IOyvZJmHYddE9IetLs7Vrl09ykcbHctAem45ypyO0nbmVWlDt6Tpb15/j7xEw7zufuvny0h0oJO4dVIBo78TV7c2qG3Su1Uj6u6V8YfbpFuXGtuYapGy/pNqQ6eMUUOTSlneqbSd+frW8yttnVM2d5l4dd3lAt10f/Vc9St9F4Wxmv/u9/Gd3F+4SOWXmu/18YPt0N92/H2q2yZ1+qyTZhzdhcv+lrKpeXzwnPv5pyNCR3d1ZTtlnV1FvaCX94U2VsnZx1V91f3CS3V2V/Er7WPtMvr9dLZLtX1Ns8K8Khik67/1oPxtzK1HeHP03C7VxU/rl9uMXVf1fK954cvmpj7p59B2t37vg8G7+rlbmqNvnuWFfYDTX6qcO9a1rl++aDDonUhm386wdKaj9ip+xfdSlmpvWPMaZa2bOlmxC+53rEKT3dVwO9/QhmTnnf85b4d44nW/ZkMKFMXpiC5aYOnS4LHM6bgstdswWL3ERGXfO6MeTrC99j/zsoWtn0UP8H6gZ6dhPqv+Z18pO2yn0tcx19om72ifsv6TaDz3mcFDQ5VSWd7HfXdJr1pb55TNXmbrh/rtm86+0V4uvC9z9ksicHHC9FPnrzp+hEKHVH6p+cqyvI+rn7nY/6vfZ9P9YF+K/CmZNruTPbv9Q59jx/pzPmHr/FrOS9ZqY5Va3WPmmf6njxMH5z3ONnZqu1nqWfTTEvNPIO1bJrOfFeZ1ZJCu/1bK/G3Mrofd7/fnh2O1ujy4zSwDLtFzEmv/rH/6av3puPB+/45+vrVizqda+4BzbbI67s7/1S5lHtxal7Fs/Wlp6/rli4wM2htB/LP+cVD9o99nfjxWvfVmOHiewPyguEo7pxMULKN/n2N/gq5GWfx/65Xr0EmZ/hF68wzhpKIe66Tf31jsnYw/z881/3vJDlFtqPpqbOQZjvnHXst+dH5/FX9f9vwdsVq3zCkn7XptuK9b/hRzJTzQ76zfUsprz1ha249m63JlB4OmFs9sk3Xbp6z/mJrH/ub0r23dsrzz0q7V1plly9o3ptPa92NVj/lHyJ0Dn9qH6rdNHv3Qeyq/1Pythcwo/NGPzuufVrFWCX2s2Wfz+kGoFDnTCmwqHR90qfSJT/xH5/UP2Kv93u7Ohpw6JZZZfgLnahvPuSzb38Vj5lbievvY/Ta25TJ/Kmj7y2YFealAu8K5X7r+m0fRNpa1DzRp16mLTu3RbWZ+O746B3T2z5350fn5JHwzT53DVnQx1CV/L/fnObOa+/m1+Kqd1cW3CtY1y2cFg2tR+YAAAg8JbDvb8DODDxWLbBEoEqAfF3GxMAIIIIAAAo8JEAw+Rk/GCOwFOInemzDlfQL04/e1GSVGAAEEEPifuLy6rAAAIABJREFUAgSD/7PdqXWjApxEN9owFKtIgH5cxMXCCCCAAAIIPCZAMPgYPRkjsBfgJHpvwpT3CdCP39dmlBgBBBBA4H8KEAz+z3an1ggggAACCCCAAAIIIPDPBQgG/3kHoPoIIIAAAggggAACCCDwPwUIBv9nu1NrBBBAAAEEEEAAAQQQ+OcCBIP/vANQfQQQQAABBBBAAAEEEPifAgSD/7Pdf1vr6egHpX9bFHJ7s0DJDxu/r572S1e6rpdinH/o9301ocTnBL7dv8+ZPLUWbbGXx2Rv0tAUzrPaaYwXtgXBYDvd52MlmeQoetl3nVQntgPntR9r3yeq8+GTkVHITm8rnex6IYkDn+hfT+f54f79NG1x/rTFngyTvcnTUzjPeroFtvzf3RYEg1tL8qmqAAeOqpwkJqX8ap/a6tWLUXLd5L929q0fcAHt6T5AW+xbAJO9ydNTaJOnW2DL/91tQTC4tSSfqgq8e8OoSkFilQToU5UgSaZJAfp3O81CW+zbApO9ydNTaJOnW2DL/91tsQ8Gp0mOg5CiN7f4qdv8zP9e9r2Qw5jzDNgkp3GQQt0q2Jv1rb8qfZGX1jT0axl6c7/hNMohlHbfSzH4V9fnOvX9ls5cp7k+++Xn5rWf4TH56jrt0umkSlunc3BZP5Te1pHcT3adOzG6M4Pfjr1V+XoxyHE6KKBJV9sKXaf5Nk+r3bqlrpG0nHKv/cZdP1yd4/J3Bf3FVKP638a2Dbs/adPYNtGVbLfV1ZYEj9s3r3/+fmdb29hOz+xTYuLOthTeaPSq9nJrmrG+YPZTTqbn9o9bEjXaVkq7HqY/q+PQdvyZ9z3mELDlrz4dl+Hp/ce0todbHzUCOO+XVR1K+vdxffO2J1ew6rdq+0rVtKMczDlJ6FxiOSYpR3VukvpXvS0qly9V/nPza/SX3/dPe5/wzL5Nadewk9Le95v9W/AcNuN4bbvY+0f7c/iQcVyXp/eT+X37uB7F+z+9f37xOe+F8htzKxic73e1O9Px59hzYMuJRSQQCKcZCuBMEd2ThH4Y9bNo4XTsoGMu3zSK5bk1e17os5B+yGVvvCrfIXIg8ssSu9XLTe/4oOVs7OGtegE64b0E9Juw+TTpANuvz+F39XyTWV3tNq3APbaeW50T5Vcv19gF/FYhqn9sc9uw+5Paice8nelee1Wn2iV4on2j/bPkZGRXkFMTahvb6a0nN5GSOduSu9E4a9jL/XL/qE6S1IXD0AUjp8/Zx4Jo27r7DiEi6e4cTpThl/uPaZQi97gxDFKsVhWPrwfmTkeq8qXWvnIOAnPtnP7WD+FbrWu3RUF6WeWr4u8ncmL7iPaXnP1vzfzcfcJv923KsW5d7H3/1eO1vc93+ta6/+iku6s8UZdf7if9bhv9fqIe0f48t7EKyGOGweneOdSzbXH9nN1QL8Hg5AU6kVEufbXPhnMDAZWo0+HXq55+4DNJc3XOwXZ7ryljIMAw5fPSVdFx4MBrRsTcpdWVBe+Ew8vfrYsKIE2+a9H0h2m5CuqcFAUOSHZ6tU4E7TS38rk1VYVcy2j5eNV1nfVLLPbpzGl5zoG65l7l9stv2soTLuov7rpXv7W7bbh284tHdqP2u222k6m+d1XMXt8to9l+9v0qp3/m9ik7/6uf3fJfN7bTS7WDc5DxN1arYs5y+mQg4nzr/jGSZ+a+R1VnVw+9D7IqGvhoe26jbH7/KjveBLI5N2ka3EB5OSnZlU5f1fXvxAkHg35957tR/BTz9vfnKnW0Vr19pToRt4/l5riwr6kqz9K+1rFtt21Vb4vK5TtivTCvbn9JB4N18wvsE9ZzMK8nVN63KfLadXHTu34smbtFuk1CdTHbk9u1HtpPuoU4/OYaVj7mvPCc1zlmXiz/HAzab7Lr9gHeYevYM510wgcze3H92dtJh855nAon30xpbxzpE18nbS9zp+MFAx6vNupKYfTKjLtz2R2s/KTsETavXOuitndO+WZw6yDrtrVjoerRC6mu0A/jKMdx1AGltwtei7L/YFtE+oJd/mS7Ljlk9Jd9WS5MccroehWl6qQT8fATTNS1pH86y8b6k5//1e92nSv0z8eDwUQdcoztZarsA3ZBVKpv2dvlhf1j9bb1T/wytjW7DA3uP+y2zrrV39neA+1o1zfRF7dN1w5aMky3Fcs/2eW7ch4RyVldMNIXjZbjkb51VCyPtFiBoLrA7G9b1dsiUMYr5Qskd32S3R5V+ou97/hN/3TPSQJ5Okp2+fZ9wFnU32/6x8Tqdu75X5doj/z+atc54mPXpcH9pN8u0e92PRJ+WxrH+z+3f73vnLdm+XUw6CTobxSbavLT2XTsju/vxFWmTrrJTpCxcVg1cdL26m6Xy5tlpeB+tNfxTwDseaF62ikdlcssZ6fnjLBaAWlqul+vKfO2L3VPtog8NziXL90OOXU0dbX/2vVOOdrrnfl8tox+XmfTOarr0bxa+fvplHy3y5fqh7H5bv9M96mS8uUsa9ch1ddy2rh2eqoOTr4/2j/a9Yi1XWq627ZePfyZgcZy6p2xvEnCLnuqTc065X/P9dWtbPsTu21e6DGHvGkFTMVVPtse8YyWu3e8QC/Vr9R8t13rt8Vc5lrliwtcmVO/vxw71s/P2yf8aN+mzO+oi52m2z/3rZy/LR23iUo5Py23HCXldde855tdnpx9QGiZ0P7v7ee8tcr/vmAw1JpO30tvHPbiRxuK3fmS2S6J2uv4G/zRPLtM6vNRucyydnqhjp8zzS+jSVvdxqtfJBR6SY8fbKrhabPi+jfdDjl1XJOzPtj1jpXfWvzSx7Nl9DM9m85RXY/m1crfT6fku12+nL4YWsZt33SfKilfzrJ2Hdyy7NfOaePa6alS5OS7lbbMMJa2XY9Qu+VM8z1jeW1ldz+VLm/Wtsvul8Esc/1vmbPJbyvbPcHgffUt7YemxrG/9hX9OdBVL69Td6roi5DL6OCoXma3/MCz3R/cetZvC/82VtXfz5cvZnBt+taX8i4UhLbZEsf6+ZX2qbJ2tvvL0YX7kEvONNfODTD9eX5LH5XNXTZd5/y0vJTF1m9S5XXXvOfbHf3LLunbz3mvlv99t4kmo7L0xuF0gIPbMZ3Ol7wqpc/KnGdE/KI66fkz7UJ5z0v4OyqzqL+R59/CaVIo/bsceJdA0XlL7K4+Ge1gD/u3evuCU8ZQ0Jtp6KSzP9ELpuLcNuY/EH7XwSVYklMT6/fPjD51qqTxlextNnVA9OsbStVOL7Zdz+t5J8O77WtLPSffbekyw1ja/vQa+x4/za3MkU83bFORnE5N9ts6aeQ8ZrDfR/g+yfROlfrCSk57XNhX7i5wRF4I4xTV3V78bfXetrhePqcqlb7U7y/H+476+T0XDN5RF7sP+v3Tb3I/f3/+9v24TfRyzna5369saVmfEuce1pI/++ib/Gb/9/Zz3vzyz8GgH3ysD+l67ayuwKmfi7Bu2/A7td3h9dWy4K2EqoDzT0M4V1giJzx+J/BK5X3N2DisNY7S9uui3gAl9JVIKwF14Aq9ACBQFycvfSvL/icwfF/tE0hrLoF7ANTlU2/ZDP58xGa+vejGPmD7ac0/QxHe4NL9wH++K1YF37i9B5s9l4a2DdvO3w7dHlp6UPXXPvvdszM/a3Cqf6oylG3bZ0ttr1fbuP4+oLRtywyd8jobce22La3H3Ep2+9Q63tjtf+2zba2eRzEvPHBT1c/B7W7PD5201Td3S3L1m1e+C/tKp9+pC4XBn7MKHdOW0Qynr6p61W2L+uW7ah9a32uPtf+FjuohS/v8wDf8Tf90nHdt6tfZbuNQ+dzlj9OubXfXxVu3zjGitveTbrvEv9VuEz+9t53z1i3/Egwq/tJXQndS/YTC/t+JV7+ag8Y+MT3leKP1V3I3jvBvUm3rHKVtb0AqSLGDYCeIdW6bVAf80M5W5Zn5mnE1CmlfzQk6mzqUt5sue/BNfV7ncuq13TLg1z3cD+x2sNdVAbUpu/pbv7/Yqdf5XG4cNqlbV6d/RvvcLHDUz+sYxVIpt4v3T7tPpQ/2sRKVTK9vXH8fUNa2ZYbHadds23PBYPP7j9BFz8h+Ve0ztv4W6991zUu2hbxly8sX21fabxP1jznJ76E7eaq2xblj5VruUPnygAuXKm+Pa/vfmvmV7hNq7tsUc926bNu2/0zrvkmP97v28nadf3me5fX/V/bnuY3P7GfC+6wn2sJrh8ixZd3vLPND5beCwaWDZfxYbN5vvC2jR5FnzuYfhSz/0fnjW6tUHewGiR1Qt43paKPbb7zmgXH75zXmK769fuvmFP59oy07vYMxP1y/jdCpjXj7YXC9eHYwaBKf5KhGbSPeJn0xqKsfZp3IX33QjP8Ap7rCrZ6PGFK/9ad/h8l/ZbraETrR4FKIev0lUqvrkxvbNvb9M17Fo34eX6vmnBr9s2zbrlH6e4zNyLq/bZzbB5S1bZlhXto12rb0xM9v3cb3H2qfqkb/dr8Han50ft4pb/0tdeyqY+4rVvteaV+53nVj3Y20ntgsx6H5GcJJdSDrMY0Dv4ptcUv5qjWCnVCN/lKy76iRX+k+oaR8JWnXqcu2bdcMBtUppbrA6B9L7j7P8oKQnwWDpk/XaROTmjIc1G/bBhzniyONn/NWKP8+GFx1+FCy8aKFAAIIIIAAAggggMC/EDAXYH4eDP4L3Z9WkmDwgJtg8ACHWQgggAACCCCAAAL/UEDdRjvfmpp6Z8E/xHldlQkGD5rMdHQ1TExnP4BiFgIIIIAAAggggMC/ENCPECwvVfwXFf54JQkGDxqYYPAAh1kIIIAAAggggAACCCDwagGCwVc3H4VHAAEEEEAAAQQQQAABBM4JEAyec2MtBBBAAAEEEEAAAQQQQODVAgSDr24+Co8AAggggAACCCCAAAIInBMgGDznxloIIIAAAggggAACCCCAwKsFCAazm6/sB02zk21ywf9U19wGeMrkqXxzXb6yXMvOLZdNtX/r5ftKH6UeCCCAAAII1BcgGMw2/U8nPP+prrkd4CmTp/LNdfnKci07t1w21f6tl+8rfZR6IIAAAgggUF+AYDDblBOebKpPLvhU+z+V7ycb8aBSLTu3XDZF2nr5DpqdWQgggAACCPxzAYLB7A7ACU821ScXfKr9n8r3k414UKmWnVsumyJtvXwHzc4sBBBAAAEE/rnAPhicRjkMQvZ9L7uus/73sheDHKdJk03DNr8f5mm2ZckPtttpdWK0kwl8nuQ0DlKIXva9Xb75syq3Xc5AArtJk6qzTm+r01x3k5ZapeSEp14ZbUdNs5bVr7vyEHIYJ7lvjV2VExPy67rZ+eXpdB8Sus+McljbqpeB7iLteob6k13gsv4ipVz6tFB9Yy2HW17Tb5Rf+F++SXj9/dTNrla/U3nU63v7Eh9MmSY5DkJqY2e/oZwL+2aV9trKWt25cvm2ksY+FfS9ymWrbqereNxHO70Pz9mXTdZ+pZNdP1TY98XagOkIIIAAAgh8U8AKBicdELkBoHvCbOb1YpTjz4PB+WSz351ohsuoy7oER9Gmm0YpIsGBqav52w+DFGve4YBGnYirE+KaZbSDJHWSZMpz+LcXMhVSR030jIyTzwI7t6xhO7ue1YLBs2UMnlRmmByjbnMLypXX71TS9fveVuCjT5McRWa/1NtPuP11DgUuTp8Kttd8EaDq9l27fEeszryMvle7bAXp3dpHu16KYYwEeQSDTjfhCwIIIIAAAicElmDQC4r65QDsDZKYq8TOiVjXydDJe+2Tezs9NdKgTxCWUUq73tMyQmGPAAUHG6fBDdoio2qmzm6AFz6hrV5GNR4pvGA3VE5dZ/eEPNQmttPx59TJpz1fXZEPXcWfpLFz+0vaLlX2vJFB90TRjBZ7XXphWMpqXRjYl8Guc7gOx6Ymq/r9TqXs9pMK20deZdyRmXW79Fbe9c/QxYrK7VV9+65cPo/o+Guq71UuW3W7uXZ+HzXbpFv3yH4juBN31+QbAggggAACCJQL6GDQObmOXWW30/ZOFvYnzu7JaWi+m5wVyIQO+qPYRsRyyqcTt0+Q9iefzolJKE+7gOqzU+dAMHBDGVW2TjkTdXeWzamTX8f1+/HJZ2k+k23TBey8el7uL2s93A/qQoG+WDCOchzn26GFWG5ttAJBFbzuy3Bs4uYU/1Zql+x3KivbN9FHtpIdbx/bcgef7Hy7/TZ2sGbWrCvtdYuzV+or5fOSSnwt73tXynaLndNXwvuAHYKzz+3kpV3aLnEmIIAAAggggIAS0MGgffDfnwSHoVLrpObbqTrBaOCIb6fljjJ5o2brbZz76W6y5SdXqrxbOfYnM9u8fd65ZXbLOAvZ6abaJuVomx9/PvI5mhdL1Q489nZqrXvqqZ5NUs+/lrfJ3vpMvX2Pc2lsNmm73L7mLxfqe37p/e/1+ptJuVZ73eM8P49Zqz+ZOuf8zalP23Zn+8rW90MXaHLsWAYBBBBAAAEEjgT+TTDontznnFzt2bYTk/1J+TavPPAwJ+ZuGef87XRD8+1Snj3hstNYcj14PvKM3RPBoJ3n3CbqBTt6JFC91GYZHRzVC3fUiKEe/N1GqPfWZ+rty55LY+sD+36nctjm1+17fun97/X6m0q5Znvd4VyzfL5k6nuqPjXLlsorXNatD4b76Nm+sqVLMBiWZyoCCCCAAALXBPa3iWbd7mWfMIQP0vZB/PgNod6JTGCIwj+RCD/3VQbhly+ZpnqhwjryuD/huaOMqkZ2OfcBiltnvwzu3JJvx3W1y3TctkueGbeI5aeZ7i8qV9ci5y2Dbrp762OTXF2/nlf73b6usZdt5JawYDmnXa/dJlq7vWo71y5fgbLaCxTse6739dp2uq5OX9nvP4Me3CYaZGEiAggggAACNQV0MLi/Km9eQOFlZV7OsgZFy4hL4LcCnJMn/QyWf5K6vF7cv4UvEAzuyre+4CZ0Kr29gGB76UvoRNU+wVIvQQnXWY0a7d8QGjqZcYOJLb0rZWwzGFQ/1bAFxrEXyMiiF8jU7S9eMKieUwz+5Eaoryyja7t+aNc51P7ethL9aqdTo9+pjO7pe9EqrDO8fA9eIKN/Dsba1v1g223/2u113bl++VbEjA92n9n3vfpls/O7bmcq6ASZ6phg/VSRWUb15eCLp3bb47YGnxBAAAEEEEDgvMASDKoEVNDTu2/Y9II+czujenuksN5y6Z/YzcXx3lAaTWvQz3WtaUcP+qWvsF9O6tXPLITiMV3l+fcF17xjZdQnLqM1Src/IZvrXL+M9glU2HnOWVfH+rmPrBG7bVXvk30yGKlrwavnXd9Iemr0wwoW3HWs2x/VC1LsUYaD/rL9tqG1/kEbO3nuXsSSYeIpRr+q34LL/DkG/TMu67YWs1M51e970fI7M8rzVXXa//MDy8I227WXIqnpfEP59giRKam+d0PZqtqZaoUurKXaeblIZ5Jw/nr1DvUBZ3m+IIAAAggggIAvYAWDZpYZsdsHhuZHzdWSeUFKLK3tR6h1rlkn91v5xoMfnTc/cC2GIR4EmqTM3+WHmtUPjzsBgfqxbOvq9Vbno5Nylegka5VxyzN8O66pgs71l8HgkrG5ih96SYvyND86v40kHtnV7y9H5dM/bq0vbKhnCKfEG2NTJ+R2S2R+rt7vdC+o1vcyazEvtoygH/3ofPz34rac6rXXlqYOCtXvf1bYvm8pn1XU8Me8vndL2W7qo3qkWKjjwD4YVO3Ui9DP1fg6BIO+CN8RQAABBBAoFQgEg3lJlAQpeSmy1GcFnGd/QrfsfrbmVAwBBBBAAAEEEEAAgWYFCAabbZp2CxZ8RilwK27wecvgLYLt1pWSIYAAAggggAACCCDwVQGCwa+27K31yny+z3s+Tz0rFogZby0piSOAAAIIIIAAAggggEBYgGAw7MLUDIH5GaX5Waztza3WM0Dq2Z9eyGEgCMzgZBEEEEAAAQQQQAABBH4qcDoY/GkpyQwBBBBAAAEEEEAAAQQQQKCqAMFgVU4SQwABBBBAAAEEEEAAAQTeIUAw+I52opQIIIAAAggggAACCCCAQFUBgsGqnCSGAAIIIIAAAggggAACCLxDgGDwHe1EKRFAAAEEEEAAAQQQQACBqgIEg1U5SQwBBBBAAAEEEEAAAQQQeIcAweA72olSIoAAAggggAACCCCAAAJVBQgGq3KSGAIIIIAAAggggAACCCDwDgGCwXe0E6VEAAEEEEAAAQQQQAABBKoKEAxW5SQxBBBAAAEEEEAAAQQQQOAdAgSD72gnSokAAggggAACCCCAAAIIVBUgGKzKSWIIIIAAAggggAACCCCAwDsECAbf0U6UEgEEEEAAAQQQQAABBBCoKkAwWJWTxBBAAAEEEEAAAQQQQACBdwgQDL6jnSglAggggAACCCCAAAIIIFBVgGCwKieJIYAAAggggAACCCCAAALvECAYfEc7UUoEEEAAAQQQQAABBBBAoKoAwWBVThJDAAEEEEAAAQQQQAABBN4hQDD4jnailAgggAACCCCAAAIIIIBAVQGCwaqcJIYAAggggAACCCCAAAIIvEOAYPAd7UQpEUAAAQQQQAABBBBAAIGqAgSDVTlJDAEEEEAAAQQQQAABBBB4hwDB4DvaiVIigAACCCCAAAIIIIAAAlUFCAarcpIYAggggAACCCCAAAIIIPAOAYLBd7QTpUQAAQQQQAABBBBAAAEEqgoQDFblJDEEEEAAAQQQQAABBBBA4B0CBIPvaCdKiQACCCCAAAIIIIAAAghUFSAYrMpJYggggAACCCCAAAIIIIDAOwQIBt/RTpQSAQQQQAABBBBAAAEEEKgqQDBYlZPEEEAAAQQQQAABBBBAAIF3CBAMvqOdKCUCCCCAAAIIIIAAAgggUFWAYLAqJ4khgAACCCCAAAIIIIAAAu8QIBh8RztRSgQQQAABBBBAAAEEEECgqgDBYFVOEkMAAQQQQAABBBBAAAEE3iFAMPiOdqKUCCCAAAIIIIAAAggggEBVAYLBqpwkhgACCCCAAAIIIIAAAgi8Q4Bg8B3tRCkRQAABBBBAAAEEEEAAgaoCBINVOUkMAQQQQAABBBBAAAEEEHiHAMHgO9qJUiKAAAIIIIAAAggggAACVQUIBqtykhgCCCCAAAIIIIAAAggg8A4BgsF3tBOlRAABBBBAAAEEEEAAAQSqChAMVuUkMQQQQAABBBBAAAEEEEDgHQIEg+9oJ0qJAAIIIIAAAggggAACCFQVCASDkxz6Tnad+t/LYTqX3zT0Sxqd7MQo5Sik+lP/n13eJS+psjN16GTXD/JkNfKKO4qtrl0n+7Noebn9ZCndfrsGG6XQ/ULZClm1OT9oWNpQYfM5FdWfd81RmkFg+eR2+q/bZdu3lNlv6+n96LIy+6RAB2QSAggggAACCDwqsAsGp0GsAaA+eTkRSM0nPVawsJxQlp1QlbmoPP0g7Ojkuiz1+NLzybRVVzkHTH5Z4im0N2cNELwGs/tGzVJ/0bDUJ2au05kG2Xf1g8HUdvq/22W58OFtAyXtyj6pRItlEUAAAQQQQOAJgV0w6BRCn4TagY4zN/xFrxMYUbxtZHAuRuzE69ag7KCuV0ZVw7ClUyc5iPMjojoQcE6Et1HBqqZNG8bN7wiM9+ZL3x4GOdQeGTxw181+MP/5vh1vl3nOtb4v5Tyyd7Wfs09KtRPzEUAAAQQQQOBpgXQwWDgyuB9N+E0Vnzjxite1hdHBayfEscBE6iBhPwp7tpXbNjyq1ShFH7jocbRKYl7QfLmIovq3E5sn0krNjrvPa8bnt9C3k7W7dCFk7uNCCnOr+Ul49kmpdmI+AggggAACCDwtcBwMjmJ362WqwOoE6PZn9AKF0Pmuz7NtzwtevbofyGqdpE+Yg8FynZGFNaNTH24KBnVZVEBQOGIcqUPbhpFCm8lLYCzGOk+kagsn8JjkMMxPZtYOBlPb6avbRY3sXR4VF3JU9Gsbm0bP/8s+Kd+KJRFAAAEEEEDgGYGDYFCNfJTfZhg/iSys4HISNr/IJj0SpU68/MBPlcWfVlIKXZeDF8LM80NB0dnRk3k9Vedz5fZeXGEHx4VtqevmBCau3ChC9XaXyflW1/Cqn1Vi78Upph/G/p5rLys/HXf088uWzORxcJ7fPWgOs0b2X+1+0CfqtktOsa62Xd2+b7dnaN+SVaNq+6R8m9+3W44EyyCAAAIIIIBAqwLRYPD0yb4+iQ7cPjcNUhS8ZXMax+0NoNZJcQwydMKmTozsk7rYuqHpWevGRg309IBBKCNr2jQMyxs61clf+fpWUiq0qDA6EntfqDrxrhMMRkdeThjW9XM1g9+WMt41MhgaWTrbn3flT22nlfv2Ln9vQt22q9v3Q/sWr/jBr6H1svYrXmpFNj9uN6+ofEUAAQQQQACBlwkEg0F1wrKOQhQGcar+80msHSycG2U0luOQHqEMnXjpcqwVMall/F1OqOZRILse+3WDdT09srelP4qGg8ETtw9vNdt/usPwut++nO6UHz0zuGSqjM50ZbfM7reguzVaGJxfoW+7pdh/u95214LB+QKF2f7OX5hRfn7wrk0vNGSOzVPttm9JpiCAAAIIIIBA6wK7YHA+kdieuTv75kA3neOA6hhplMPhiKJ3e9hyouXkb53gHuc1z7Wv3qt0/BM6Pw21vH374IVzvSXpUYrLiVw4IbZvkTTlCE3zIS58r2tYw++4MtXfJprwVf3QNMVxycrmOttJ4DnQuu2SU7YabXeh75siWu1R7l5/nzQXK9/m9+1m4PiLAAIIIIAAAm8S2AWDzRU+4xbR2mVWJ1LrCWDlUbCcsm63heUszTK+AH6+yHu+03bxtsImbsMcBBBAAAEEEDgn0HwwmHOL6LmqH6ylRgWW0UQnMDxYpdYsld88EpkaEa2V47fSwe+97UnbxdsOm7gNcxBAAAEEEEDgvEDjweBzAdF6+9zU//ZJAAAR3ElEQVQ6RHgeOXfNNc/lLaA/zDq3iE0vh1/TzXNYONouzoNN3IY5CCCAAAIIIHBNoPFg8FrlWBsBBBBAAAEEEEAAAQQQQCAsQDAYdmEqAggggAACCCCAAAIIIPBpAYLBTzcvlUMAAQQQQAABBBBAAAEEwgIEg2EXpiKAAAIIIIAAAggggAACnxYgGPx081I5BBBAAAEEEEAAAQQQQCAsQDAYdmEqAggggAACCCCAAAIIIPBpAYLBTzcvlUMAAQQQQAABBBBAAAEEwgIEg2EXpiKAAAIIIIAAAggggAACnxYgGPx081I5BBBAAAEEEEAAAQQQQCAsQDAYdmEqAggggAACCCCAAAIIIPBpAYLBTzcvlUMAAQQQQAABBBBAAAEEwgIEg2EXpiKAAAIIIIAAAggggAACnxYgGPx081I5BBBAAAEEEEAAAQQQQCAsQDAYdmEqAggggAACCCCAAAIIIPBpAYLBTzcvlUMAAQQQQAABBBBAAAEEwgIEg2EXpiKAAAIIIIAAAggggAACnxYgGPx081I5BBBAAAEEEEAAAQQQQCAsQDAYdmEqAggggAACCCCAAAIIIPBpAYLBTzcvlUMAAQQQQAABBBBAAAEEwgIEg2EXpiKAAAIIIIAAAggggAACnxYgGPx081I5BBBAAAEEEEAAAQQQQCAsQDAYdmEqAggggAACCCCAAAIIIPBpAYLBTzcvlUMAAQQQQAABBBBAAAEEwgIEg2EXpiKAAAIIIIAAAggggAACnxYgGPx081I5BBBAAAEEEEAAAQQQQCAsQDAYdmEqAggggAACCCCAAAIIIPBpAYLBTzcvlUMAAQQQQAABBBBAAAEEwgIEg2EXpiKAAAIIIIAAAggggAACnxYgGPx081I5BBBAAAEEEEAAAQQQQCAsQDAYdmEqAggggAACCCCAAAIIIPBpAYLBTzcvlUMAAQQQQAABBBBAAAEEwgIEg2EXpiKAAAIIIIAAAggggAACnxYgGPx081I5BBBAAAEEEEAAAQQQQCAsQDAYdmEqAggggAACCCCAAAIIIPBpAYLBTzcvlUMAAQQQQAABBBBAAAEEwgIEg2EXpiKAAAIIIIAAAggggAACnxYgGPx081I5BBBAAAEEEEAAAQQQQCAsQDAYdmEqAggggAACCCCAAAIIIPBpAYLBTzcvlUMAAQQQQAABBBBAAAEEwgIEg2EXpiKAAAIIIIAAAggggAACnxYgGPx081I5BBBAAAEEEEAAAQQQQCAsQDAYdmEqAggggAACCCCAAAIIIPBpgUQwOMlpHOQghOz7XvZdJzv/v5reCymGUU7Tp62cyikX4yFGZ9alL9Mo1nS7fpD/iPSSGysjgMATAhwjYuocI2IyTEcAAQQQaEkgGAxO0yhF3+8DPz8QDH3vhRzGD4cw0ygH4drUCQYnOXrpEgy2tKlQFgQQMAIcI4xE4C/HiAAKkxBAAAEEWhXwgsFAQNL1UgyDHKcpOPI3TZMcx0GK3h017OtESM24HZ38XK6qDr5dPz0Cy8hgM+1PQRBAQAlwjIj1A44RMRmmI4AAAgi0LOAEg6OwA5JeisIRPvu2GBXM9MPbRwin3Shg1ysXNXK6WV0JBu3bQnsxSPV9vRWXYLDlbYeyIfDvBDhG+E3OMcIX4TsCCCCAwLsE1mBwGird+qieMRxGOY5XnyEcpQjdhlo0Tchrj/MtZVABoPNM5CSHy8HgJEfLfA2cCQbftQVRWgT+iQDHiFBDc4wIqTANAQQQQOA9Aksw6AY3bTyr1kIwGGtI16t8ZNBev5fOACrBYAyd6Qgg8JiAvc/qJMeIVEO4XhwjUl7MRwABBBB4SmAJBt3Aax2leqpUzed74UA/DcdvCyUYbL71KSAC/0+AY0RZm3OMKPNiaQQQQACBpwQIBk/JnzvQ27dZRQNugsFTLcJKCCBwpwDBYJkux4gyL5ZGAAEEEHhKgNtET8mXHujt5fvjn94gGDzVIqyEAAJ3Ctj7MG4TTUu7XunbRO3lOUakfVkCAQQQQKCWwBIMSintIKTrZPrgFSuCfQW5/I2kW6p2OtubO9c3bWa9SObqC2S20rif7AN32soeESwrv1vv823ilp5vCCCAQLEAx4gCMo4RBVgsigACCCDwoMAWDOp40A4+TgRy/u/lffanETjQP9hnyRoBBB4SuPrTEpJjRLDluGAYZGEiAggggMAPBJxgMPqDwmKQ45j60Xn3pynaeNvcXYJlwWBRKeyr758NpotEWBgBBJoRiPzoPMcIr4U4RnggfEUAAQQQaFTACwbnUqofj7d/VL3s1sYTI4qN4sSLxYE+bsMcBBD4ugDHiFQLc4xICTEfAQQQQKANgWAwuBZtUj+MPkghetn33sifeWavV/OEFMMgx2ld8+MfONB/vIGpHgII5AhwjIgocYyIwDAZAQQQQKAxgeNgsLHCUhwEEEAAAQQQQAABBBBAAIE6AgSDdRxJBQEEEEAAAQQQQAABBBB4lQDB4Kuai8IigAACCCCAAAIIIIAAAnUECAbrOJIKAggggAACCCCAAAIIIPAqAYLBVzUXhUUAAQQQQAABBBBAAAEE6ggQDNZxJBUEEEAAAQQQQAABBBBA4FUCBIOvai4KiwACCCCAAAIIIIAAAgjUESAYrONIKggggAACCCCAAAIIIIDAqwQIBl/VXBQWAQQQQAABBBBAAAEEEKgjQDBYx5FUEEAAAQQQQAABBBBAAIFXCRAMvqq5KCwCCCCAAAIIIIAAAgggUEeAYLCOI6kggAACCCCAAAIIIIAAAq8SIBh8VXNRWAQQQAABBBBAAAEEEECgjgDBYB1HUkEAAQQQQAABBBBAAAEEXiVAMPiq5qKwCCCAAAIIIIAAAggggEAdASsYHKXoOtnp/70cphMZTIPs1zSEHE8k8ZZVpnGrqyit6DTJcRBS9L3lZew72avpYpDjdKYR3iJIORFA4F0CHCNK2otjRIkWyyKAAAIIPCVAMFgqP41yEP0SNM8BXH4wOO3WnYPvLRDcfe/FucC8tF4sjwACCBwKEAwe8piZHCOMBH8RQAABBF4gQDCY2UjTNOqRvF2w1nUyLxic5NBbQZ8K8sZJ7gf/JqmuKAt72e7kSG1m3VgMAQQQSAsQDB4ZcYw40mEeAggggECrAgSDhy0TGMnreylGFRhugV1WMDiKbTSxH2TODaCj2PLosjI5rAwzEUAAgQsCBIN7PI4RexOmIIAAAgi8SaDhYNA+8bCCovWZxJxpV59bXMqgAsBhtEbx3FG+u+K0abBuR70rkzf1VsqKAAIPCtj75JN3K1R9rtwuT87xILQMx4gHOxRZI4AAAgg0IEAweKoR7g8GJ3skkdtET7USKyGAQE0BO/giGDyW5Rhx7MNcBBBAAIFWBCLBYOgKaum0q1dcWyEKlePGA/3u5QMnT7pCxWYaAgggcFrADgZLjweh5TlGnGoKjhGn2FgJAQQQQCAsQDAYdklMvSEY3B3gO9mLMevZwkRhmY0AAghUECAYzEfkGJFvxZIIIIAAAk8KRILBk6NRn3seJNY09Q70+zeHLkFgzhtmYsVjOgIIIFBdwA4GOUYc83KMOPZhLgIIIIBAKwIEg6da4uqBfv7R+d55Gc7ykppT5WElBBBA4G4BgsF8YY4R+VYsiQACCCDwpEDDweCTLKm8zx/o1YthnCBw+b3BVI7MRwABBJ4VaC0YfFbjOHeOEcc+zEUAAQQQaEWAYPBUS5w70Ds/FdELOXIr6Cl9VkIAgScECAbz1TlG5FuxJAIIIIDAkwIEg6f0yw/0TiDo3B4aesteaNqX37x3qhFYCQEEfipAMJjPzTEi34olEUAAAQSeFCAYPKVfeqB3l+8IBk+psxICCDwpQDCYr+/u88WYWtNdnmNEyov5CCCAAAK1BKxgsFaSpIMAAggggAACCCCAAAIIINC6AMFg6y1E+RBAAAEEEEAAAQQQQACBGwQIBm9AJUkEEEAAAQQQQAABBBBAoHUBgsHWW4jyIYAAAggggAACCCCAAAI3CBAM3oBKkggggAACCCCAAAIIIIBA6wIEg623EOVDAAEEEEAAAQQQQAABBG4QIBi8AZUkEUAAAQQQQAABBBBAAIHWBQgGW28hyocAAggggAACCCCAAAII3CBAMHgDKkkigAACCCCAAAIIIIAAAq0LEAy23kKUDwEEEEAAAQQQQAABBBC4QYBg8AZUkkQAAQQQQAABBBBAAAEEWhcgGGy9hSgfAggggAACCCCAAAIIIHCDAMHgDagkiQACCCCAAAIIIIAAAgi0LkAw2HoLUT4EEEAAAQQQQAABBBBA4AYBgsEbUEkSAQQQQAABBBBAAAEEEGhdIBEMTnIaBzkIIfu+l33XyW73v9fzhBjkME5yar3GF8qnLIRQ9fUdFoNhkGMlgGkUm3c/fNr1QpOwKgIINCHAscJvhl8dLzhW+PJ8RwABBBAoEQgGg9M0StH3gcDPD4Ii33uhA8OSgrS8rHOw3QXDAYNLwdskR+HZX0qvZVnKhgACbxbgWLFvvd8dLzhW7PWZggACCCBQKuAFg4GDS9fLXgxyVKN+U2DYa1JXhEc5DNZIlgmYvhDEjMIKipXFGHCYr4oLe8TwTN11EF47uCztEiyPAAIIpAQ4VgSFfnW84FgR5GciAggggEC5gBUMTnKwg5mul+LEPY+7q6K9kGN5uRpZY5TCBLZdJ0WqItOw3drZldXbdlPBt/q+3pJ7JrBsRJBiIIDA1wQ4VoRb9DfHC44VYX2mIoAAAgicE1iDwWmwb03s5RAYBMzOQl21tIKoLhlFHaXspWWnm/25LDA7Kk1onhoxHdXI6BpMq0A6tGRomlp3s+8NPMFgCItpCCDwsADHimsNcP54wbHimjxrI4AAAgiEBJZg0A241oAktEbmtHonDG7Z1tGy7EBQ3XZZOxj0r4ybWzt7KYax4GUvdjpeAE4wmNnTWAwBBH4n4O6POVbkyNv7eXOsUH9Ljhd2GhwrctRZBgEEEEAgT2AOBp3bGzNuh8xJ+440c/L9yTLzCZF+w2roLas5L9CxfUK3gRIM/qQlyQQBBAoE7P1Wzq3zOUnfkWZOvj9b5uLxwvbhWPGzViMjBBBA4L8IEAxWa2n1Ehn3JTrqZTOhf/aoafTKOsFgiI5pCCDwpIAdmBAMXmiJvOMFx4oLxKyKAAIIIJAlcNttotIOZjrvtpasopmF3NuS2rhN1JQt9Ncur19v71afoxf02H6hq8GhrJmGAAII3Cpg7986Gb2YVVIGe1/3r44VCsn2tI8XHCtKuhDLIoAAAgicF1iCQSntK5DqWQbzHpNTSf+zF8i4RvZB3L3l1jW2nx0p+xwZcHSLwTcEEEDgBgF3P8ax4hpx+HjhGpcdH+wLphwrrrUOayOAAAL/QWANBqV0D0r64fajkauIjn+rZP2Xt0QyvmOyc0tU3kmP85MQXlDNAf6ORiJNBBD4rQDHiqB3xeMFx4qgMBMRQAABBG4QsIJBlXrqh4QDJVA/Oj9990fnR2FflU396Pz2ExHq6uylW6jsW6e4TTTQ8ZiEAALPCXCsCNk/crzgWBFqCqYhgAACCGQKeMHgspa6zbN3Axv71pPk55y3aWYWsIXFJvUbgiU/ZVGj/hzgW2h6yoAAAkcCHCt2Oj8/XnCs2LUBExBAAAEE8gXCwaC1/jSOchDqB9V760fVvdGyvpdCDHIYp4Lf2LMyecVH9fa3QQfJ24/Lbw7KRxmM01SnNhzg6ziSCgII/ESAY4XN/MPjBccKG57PCCCAAAKFAslgsDA9FkcAAQQQQAABBBBAAAEEEHiBAMHgCxqJIiKAAAIIIIAAAggggAACtQUIBmuLkh4CCCCAAAIIIIAAAggg8AIBgsEXNBJFRAABBBBAAAEEEEAAAQRqCxAM1hYlPQQQQAABBBBAAAEEEEDgBQIEgy9oJIqIAAIIIIAAAggggAACCNQWIBisLUp6CCCAAAIIIIAAAggggMALBAgGX9BIFBEBBBBAAAEEEEAAAQQQqC1AMFhblPQQQAABBBBAAAEEEEAAgRcIEAy+oJEoIgIIIIAAAggggAACCCBQW4BgsLYo6SGAAAIIIIAAAggggAACLxD4A5X7cZ+eoC7nAAAAAElFTkSuQmCC" alt="" style=""></p><p><br></p><p><strong>3. MÉTODO DE OXIDO REDUCCION<br></strong></p><p><strong></strong></p><p><img 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
36054	46131	9354	9379	2021-10-02 11:19:38	<p><a href="/web/uploads/9379/cdbb7e8d81-colinias-espanolas-heidy.pdf">cdbb7e8d81-colinias-espanolas-heidy.pdf</a></p>
36055	46132	11250	9557	2021-10-02 11:43:16	<p><a href="/web/uploads/9557/806d4e7c75-ciencias-naturales-1.docx">806d4e7c75-ciencias-naturales-1.docx</a>.</p>
36056	46133	11235	15970	2021-10-02 11:49:42	<p><a href="/web/uploads/15970/e054b109b6-camscanner-10-02-2021-1147.pdf">Biografía Emma Watson</a></p>
36057	46134	11296	9382	2021-10-02 13:10:28	<p><a href="/web/uploads/9382/00ebef6a26-caracteristicas-del-agua-y-del-suelo.pdf">00ebef6a26-caracteristicas-del-agua-y-del-suelo.pdf</a></p>
36058	46135	1769	9373	2021-10-02 14:40:05	<p><a href="/web/uploads/9373/c9200e5c1f-img20211002142308192-1-1.pdf">c9200e5c1f-img20211002142308192-1-1.pdf</a><br></p>
36059	46136	11053	9386	2021-10-02 15:03:14	<p>Natalia Baquero Pérez 8-1</p><p>Infografía sobre la Biodiversidad en Colombia: <a href="/web/uploads/9386/c4b2d473b6-infografia.pdf">c4b2d473b6-infografia.pdf</a></p><p>Evaluación: <a href="/web/uploads/9386/d6dbe9dff6-doc1.pdf">d6dbe9dff6-doc1.pdf</a><br></p>
36060	46137	9533	9384	2021-10-02 16:23:02	<p><a href="/web/uploads/9384/707e6e6489-camscanner-10-02-2021-1620.pdf">María Fernanda Andrade Correa tarea de Etica</a></p>