<?xml version="1.0"?>
<rss version="2.0">
   <channel>
      <title>FISICA 2 by </title>
      <link>https://padlet.com/alelg2001/s75m242oc4qe</link>
      <description></description>
      <language>en-us</language>
      <pubDate>2018-05-03 21:29:00 UTC</pubDate>
      <lastBuildDate>2026-02-25 20:57:08 UTC</lastBuildDate>
      <webMaster>hello@padlet.com</webMaster>
      <image>
         <url></url>
      </image>
      <item>
         <title>HIDRODINAMICA</title>
         <author>alelg2001</author>
         <link>https://padlet.com/alelg2001/s75m242oc4qe/wish/257850799</link>
         <description><![CDATA[<div><strong>Es la parte de la hidraulica que estudia el comportamiento de los liquidos en movimiento.Para ello considera entre otras cosas la velocidad, la presion, el flujo y el gasto del liquido.<br><br><br>En el estudio de la hidrodinamica, el teorema de Bernoulli, que trata de la ley de la conservación&nbsp;de la energía, es de primordial importancia, pues señala que la suma de las energías cinética, potencial y de presión de un liquido en movimiento en un punto determinado es igual a la de otro punto cualquiera.<br></strong><br></div>]]></description>
         <enclosure url="" />
         <pubDate>2018-05-03 21:30:07 UTC</pubDate>
         <guid>https://padlet.com/alelg2001/s75m242oc4qe/wish/257850799</guid>
      </item>
      <item>
         <title>LEY DE LOS GASES</title>
         <author>alelg2001</author>
         <link>https://padlet.com/alelg2001/s75m242oc4qe/wish/257851164</link>
         <description><![CDATA[<div>LEY DE CHARLES: es una de las leyes de los gases. Relaciona el volumen y la temperatura de una cierta cantidad de gas ideal, mantenida a una presión constante, mediante una constante de proporcionalidad directa.<br>LEY DE GAY-LUSSAC: establece que la presión de un volumen fijo de un gas, es directamente proporcional a su temperatura.<br>LEY DE DALTON:En estableció que la presión total de una mezcla de gases es igual a la suma de las presiones que ejercería cada gas si estuviera sólo en el recipiente. La suma de las presiones parciales de cada gas es igual a la presión total de la mezcla de gases<figure class="attachment attachment--preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:152,&quot;url&quot;:&quot;data:image/jpeg;base64,/9j/4AAQSkZJRgABAQAAAQABAAD/2wCEAAkGBxATEhUTEhIVFRUWGRgYGBcXGCAXGhcZFxkaFhgZFxgeHyggGR4lHRoWITEhJSktLi4uFyAzODMtNygtLisBCgoKDg0OGxAQGy4mICUvLisvNS81LS8tLSs1LTIvLy8tMiswLy0vLzAtMC01LSstLS8tLy8tLS0tLy0tLS0tLf/AABEIAJgBSwMBEQACEQEDEQH/xAAbAAACAwEBAQAAAAAAAAAAAAAABQQGBwMCAf/EAEkQAAIBAgQCBQYMBAQFBAMAAAECAwARBAUSIQYxEyJBUXEyYXKBkbEHFCMzNEJzobKzwdFDUoLhNWKSwhUWJHSiRFNjgyVU0v/EABoBAQACAwEAAAAAAAAAAAAAAAAEBQEDBgL/xAA+EQACAQMABwUGBgEDAgcAAAAAAQIDBBEFEhMhMUFRYXGBscEUMjSRofAGFSIzUtHhQkNigvEWIyQ1U5LC/9oADAMBAAIRAxEAPwDcaAKAKAKAz7gA/wD5LNvtl/3UBoNAFAFAFAFAFAFAFAFAFAFAFAFAKc84hgwrQJLqviJBEmkX6xIA1b7DfnQDagCgCgCgCgCgCgCgCgCgCgCgCgFeY5/h4Z4MPIWEmILCMBSQdIubnkPXQDSgCgCgCgCgCgCgCgCgCgCgCgCgM++D/wDxLN/tl/3UBbs4zhcOYl6OSRpWKqsYBN1UsebAcgaA44XinBOiuZ0j1AkJKwRxZihBUnsZWHdsaA75xnkOG6PpCbyuqIqi5JZgt/MoLC5PeO+gPOeZ7FhQutXctqIWNdR0xrqdrXGwHr3FqAkzZlAkayvKiRtYqzMFB1C4sT5qAjrxBhDJJH0yBowjNdgBaS+ixJsez/UO+gJGFzPDyHTHNG5tqsrhjp5XsDyoCXQBQBQBQBQBQGffCn8/lX/eR+9aA0C9AfaAKAKAKAKAKAKAKAKAKAKAKAz7jf8AxjKfSl/DQGg0AUAUAUAUAUAUAUAUAUAUAUAUBn3wf/4lm/2y/wC6gLRn2QringLnqRMzMu41akKAAgi25vQHjEcL4dtAUyRKihFSJ9CgAk8h27negJWeZYZ41QMFtJE9yL7RyK5Hr02oBXnWS4rEMWDxxshmjQlSwMM0aqSQG8sMCR5hyoDtnGQSPDBDDKEWIaTqB6yiMxjrKQykbHYi/I7UArg4KkWymWMrpwYbqG5bCNfbe1mHsIFATcq4VMM8Uuteo2MJAWxb41Kki73+qFt5/NQFnoAoAoAoAoAoDPvhT+fyr/vI/etAT+McuefF4ZFjjcdFPfpdWgG8djdfrd3roD1DgMyhMMSSSvHGsSswMVm0gBydYMnf23oDhxw8JxEMZ1rIdLdL1ysCK4JKBQR0rkafC99tiBC4/wAQZbmLpGIhxCQaVbbGLIirbbZtjYnsDdl6Ab8dZtiIFjELOrskrgqgZWaMKQhJVtzc2ULdrHdbXoBVg8diziZlE0imXE4cWKAhInwiuWj1LYDXde66bi5NwGnCOY4x3jE7lxJAXN4wgV0lMe1h2rYkHt5WG1AW6gCgCgCgCgCgM+43/wAYyn0pfw0A54wzmaCTDpG5QS9LqIgbEN1FUraNOt2m5oCLFxlJGkK4mFVmdFZwZY4iCxIHybtqGwBt57dlAMeMMwxWHjE0LJoSxcMha92UXZtQ6ONV1EtYnltQEfjDPJ4XSOAoCYcRiCzrqBGHEfUG4tqMg37LUBOzjiFYII5jGW1i+nWq26us+URc9lgDQCuLjJi8n/Ts0d8KsVioZjiRcarttzHhY0BOyXikTyrEYJIy6ylSxUgmB1jkXqknYsLHt3oCw0AUAUAUAUBwx0zJG7qutlVmC3tqIBIF+y/KgMf+DLisy5niNMB/6x+kPW+aVAxN9utzA7OdAbPQBQBQBQBQBQBQBQBQBQBQBQBQGffCn8/lX/eR+9aA0GgCgCgPEcaqLKABcnYW3JuT4kkmgPdAFAFAFAFAFAFAFAFAZ9xv/jGU+lL+GgLzNgo2kjlZbvHq0G521gBtu24AoDq0ancgH1UBAzXIsNiCDNHqsCvlEBlJBKOARrUkA6TcbUBwxPDWHlBEwL3d3F2YWElgyCxvoIAuvI91ASsxyeCfR0iE6L6dLFLBhpZbqR1SNiORoCPHw3hVKkRnq9FbrNb5D5okXsSO+gO+FybDxsrolmTpQpudumYPJ29rKD6qAYUAUAUAUAUAGgMu+DXhnoM0zFyu0TGOPwlIm2/p6Mes0BqNAFAFAFAFAFAFAFAFAFAFAFAFAZd8KudYYYrAIZQGgxMcko36iXU6jtyt3UBpWBxkc0ayxMGRwGVhyIPIi9Ad6AKAKAKAKAKAKAKAKAKAKAKAz7jf/GMp9KX8NAaDQBQBQBQBQBQBQBQBQHwmgIc+bYdPKmjB7tQv7OdARH4nwY/i38Fb9qAjzcYYRQTd2t2BDc+FYbwsnulDaTUE0s9dyF+F45wOttMcoZyCx0DmAEu3W7AAPVWqNaMnhZLGtomtRpupOUcd/Hu3cegzHFuE/mYf0mtxVnaPibBn+LbxVh+lATMPmUD+RLG3mDAn2XoCXQBQBQBQBQBQBQHwkDnQEaXMYF8qaNfFwP1oCO2f4Qfx0Pgb+6gMW+GeOKXGQywuG6WMRnY7OjGxO3aHH+mgNeyzNsFFDHEsqgRoqDYjZQF7vNQE5M7wp5Tx+twPfQEqLFRt5Lq3gwPuoDrQBQBQBQBQBQBQHGbFRp5bqvpMB76AhyZ9hB/HQ+B1e69AcG4owY/iX/pb9qAovF+d4d81yyRWOmNpdRsdrjbbtoC8rxTg/wD3D/pb9qA7pxBhD/GUeN194FAS4cbE/kSI3osD7jQEigCgCgCgCgCgM+XGGSVvjnSsi8xHfo1PnHdb11kDvBzZV9Xov6wf91YA0hmwf1Gg9RWgFXFXEwwgjMcaS6ywNmta1u4HvrTVqOGMIstHWMLpyUpauDPMjz1sPiHxAiDlw40k2A1uH527LW9dQ4TcZa2Dp7u0p3FCNFzxjG/dyWDU8lzWOeBJXCIXBJUkG25HbbuqfCWtHJx11RVGtKmnnHM9zTYH65w58dJr2RxRjZcpOxCk90YIPqtYUBCyTFSriQkXSiHUoKy9zA2sOzkbW7t6AvFAFAFAFAFAVbizOZonVEOhDa7gXNzzAv3Dfz99Ac8Lg8BLYvimlP8A8kmn2A2IoBrBkeC+rGh9er9aAkrk+GH8CP8A0CgEnE/CcU8mDZIkAhxCyPZQLoEc2O241iOgHpyrD/8AsRf6B+1Ac3yTC9sMY9VvdQC/FZJl48rSnn6S3vNAJMbjkgKjC4uRyTbQeuvq7PUKAueWzs8SOw0swBIHYe2gJNAFAFAFAUfN80kbEtHK8iRAttFz0g2ux8/b48qAnYLD5UdwyMf/AJGIP32FANoMJgvqpAfUpoCUmFg7Ej9SigKLxpEgzfKQFUAtLtYb9UUBe3wsPakfrUUBGmweD+skA8QooBVjcNlX1jGPQY39imgFEWZNHKBhJJXjtcrJutrgG1+QuRvtuRQF+oAoAoAoAoCtcJ/OYj0l91APJ8vhfy4kY95UE+2gIcnDuEP8EDwJHuNAUv4QsBHhliMAKai2rcm9gLc71HuKkoYwXWh7OjcOe1WcY6ryKX8dl/nP3ftUb2ip1L38ms/4fV/2abwnkWHlwsUsiFnYEk6mF+sRyBtU6lJygmzlNIUYUriUILCQ9j4fwg5Qr67n317IZNgwkaeQir6Kge6gK/N9Obxw/uloCzUAUAUAUAUBV8/+l4b7UflvQDrEZPhn3aFCT22sfaN6AgycKYQ8lZfBz+pNAczwnD2SzDwYf/zQHz/lVf8A9if/AFf2oA/5UTtnnP8AUP2oD0OEsP2tK3i37AUBJh4bwi8ogfSJb3mgIfE2GRIogiKo6aPZQB391AN8q+aTwoCXQBQBQBQFZy/6fJ6L/iFAOsRlWHfdokJ79Iv7edAQpOF8Gf4VvBmH60BxbhHC9mseDfuDQFQ4ly1IcwwGHQnRiDIH1WLdUXGk22oC3Lwhhe3pD4t+wFAd04WwY/hk+LMf1oCXDlGGTyYUv36QT7TQCbiMf9RH9i/52HoCz0AUAUAUAUBQ8LxHh8G0xm1XZhpVRcmwF9+Q5jma3UqMqr/SeJzUeJFxPwpr/DwpPndwPuAPvqWrB85Gl3HREF/hQxHZBEPFmP7V79gj1Zj2h9BJnvFU2MCiVUXQSRpuOfO9ye6q/SFm0o7NN8Tovw9eU4OptZKPDGXjr1FGod4qs9kr/wAH8mdN+Y2n/wAsfmix5Vx7icPGsKJEyoLAkG+5vuQfPV5a2KdGOtlM4fStypXk3Bprdv8ABDKL4UpvrYaM+Dkfoa3Owj/Ir/aH0GOE+FGAn5WCRPOrB/2Na5WEuTPSuFzQwwWPjnxPSxG6MYLGxB26UEEHkb1CnBweqzemmsouFeTIUAUAUAUBWM/+l4b7UflvQFnoAoAoAoAoAoAoBFxd83F9tH+tAMsq+aTwoCXQBQBQBQFZy76fJ6L/AIhQFmoAoAoDAvhK4nxkWaarpfCMTBdOyRFPX363PzUBuuXs5ijMnllF1W2Gqw1WHjegJFAFAVjiP6Sn2L/nQUBZ6AKAKAKAKAxPimNnxDBTbSAR2eVcHf8ApFWujqetGTXYVOkb2NvOKktzyI2w0o5rf1A1YOnJcjRHSFvLhNeO7zPBjbtj+4151WblXpPhJfNHm3+T3/vWMM97SHVHy3+X30wxrx6o+hT/ACfi/es4Zh1YL/UvmexE/ZH9x/Ws6jPDuaK4yXzR0jwsp7NPsHur0qUnyI89JW8f9We4u3AiyL1V0nS8fMkc+kbsB7SapL6LjXa7vIudHVqda3VSWVnPTr3mhYfETMzArGArAGzE81Vrjq+eoe8nzhSjFNN710XXHUnVkjhQBQBQFYz/AOl4b7UflvQFnoDjjYWdGVXMZIsHW1184vtWGsrBspTUJqTWUuT5me8J47Fz41oZMVKVi1N9XrdHIq6W25EE3tUSlKTqarfA6TSNG3o2iqQprMsLnuym8rfyNIqYcuUv4Qcbi8OElhxDIrEJ0YRSAbMxbUQTvYC3mqNXlKO9MvdDUbe4zTqU8tb85fYsYQ84UMxw6SSzGVpAHuVC6QQOqNI38fPW2llxy2V+kNmq8oU46qW7nv7d44rYQhFxd83F9tH+tAMsq+aTwoCXQBQBQBQFZy76fJ6L/iFAWagCgCgMP+FTKtedYdbbYgQDxIkKN/4haA3AUAUAUBWOI/pKfYv+dBQFnoAoAoAoAoDGs7+lSeinvervRPuy8Dl/xD78O5kWrc50KAL0MBegJmVZbJiJOjjtexJubAAWBJ9o9tR7i4jQjrSJdnZzuqmpDvPGZYCSCQxyAah3G4IO4Ir1QrxrQ1omLu1nbVNnP7RGrcRizcDeW32kXueua0h8RLw8jt9D/Bw8fNl+wflzemPy0qCi5qe5Du9WS6yaQoAoAoCsZ/8AS8N9qPy3oCz0Bn/wseTB4v7hUS64I6T8Pe9U8DOqhnTmz8DfQYPA/iNWVD3EcLpb4uf3yMhx8zF3BZiNbbEk9pquk3k7WlGKgsLkh5wDM/x6Eamt19rm3zbdlbaDeuiv0vCPsk3jfu80bBVicSIuLvm4vto/1oBllXzSeFAS6AKAKAKArOXfT5PRf8QoCzUAUAUBSuLcpMmaZXLbZGm1f0prX/yAoC60AUAUBWOI/pKfYv8AnQUBZ6AKAKAKAKAxvN0JxbgC5IQADtJLWq50XJRhNvgczp6Ep1acYrLefM+5jlc0BAlQrq3HI3tz3B8KsaNzTrZ1HwKa6sa1tjaLieMsljWVGlXUgYFhzuPDt8KzcRnKk4w4mLKpTp14yqL9KY24vx+FmdDh1GwIZgui/KwsQOW+/nqJo+jVpp65YaZubeu47Le1xfoIKsilJuT4uaOVWg+cPVAtfVqt1beNvZUa6p0503tOC3kywrVqVZbHe3ux1OvEEWJEpbEgh2F+y1uW1ttu6vFnKi4atLgvmbdJwuVV1rhb3wxw7hlkvC4nw7TGXSRqsLXHV/mPZf8AvUa50hKlV1EtyJtloeFe32kpPLzjou89cDeW32kXueq/SH778PIudDrFpHx82X7B+XN6Y/LSoKLmp7kO71ZLrJpCgCgCgKxn/wBLwv2o/LegLPQFA+FjyYPF/cKiXXBHSfh73qngZzUM6Y2bgZh8Rh3HI/iNWVD9tHDaW+Ln98jH8Z84/pN7zVc+J21P3I9y8h3wB9Ph/r/LattD9xEDS/wc/DzRslWJw4i4u+bi+2j/AFoBllXzSeFAS6AKAKAKArOXfT5PRf8AEKAsGLxKRI0kjBUUXJPICsNpLLPdOnKpJQgsti3D8T4J2VEnVmYgAC+5Ow7K8KrBvCZKno65hFylBpIcVsIQhxHEmX6xqnTXGWHbsd1YcvGtbrQXMnLRl00moPeOsPMrqHU3VgCD3g8jXtPO9EOcHCTjLiiDmOe4WBtE0qoxF7G/Llfl5jXmVSMeLJFGyr1o61OLaO2W5nDOC0LhwDYkdhtesxkpcDxXt6tBpVFjIk4j+kp9i/50FejQWegCgCgCgCgMezKdkxrOuzKIyPEFjVxo2mqlOcXwZzmmq0qNelUjxWRpNjp8xmiiOhLarWvblck3NzsNhW5UoWMHU4t7iM7ippWpGj7qW98xfn+UNhpejLBrgMCNtjcbjs3BqTaXO3i3jGCBpGx9kmo5ynwFtSyAWjIMzwUeFkSZLyHV9W5e46tm+rb1W51T3dvcTrqUOHLsOk0de2lO1cKnHflY4/fAruBxTRSJIvlIQRfcevxqzq0lVg4S5lFb3EqFVVIchlnuZ4jFaZHjIROqCqnTc87sdr8tqi2tGlbycFLMmT7+5uLyCqODUF34+YrSdwpUMwVuYBIB8R21LlShKSk0soroXFWEXCMmk+KLFwN5bfaRe5657SHxEvDyOy0P8HDx82X7B+XN6Y/LSoKLmp7kO71ZLrJpCgCgCgKRx/j2gaKVQCyOCAeV9DDf21spQU5qL5nmTwmyjY3jDMJD9JKjuSyfoD99W0balH/SQ3Vm+Yrnxs8m8jvJ3amLW8N61XNjSrpJ7sdME/R+lKtk5OCTzjjnl3HHW/8AKfYai/k9H+T+n9Fn/wCKLn+Efr/ZzcMTyPsNWVClGjBQT4FFeXMrqtKrJYb6d2Dp0jfyn7/2qreh6bedd/Qv4/ieqkls182elmkG6hlPYQSCPA1toaMp0qinrZx3Ee80/UuaMqTglnmm+uSdh+IMcnk4qUeYyXHsJNT3RpvjFFEpyXMfZZxXicQ0cM7K/wAorBgNJFr87WB9lQLuhCmlKJIozlJ4ZqGVMOiTwqCb8EwGgCgCgCgKzl30+T0X/EKAl8ScRQ4TQJUZg97aQDytzuR31qqVVDiT7GwqXWdRpY6mccK57FhsTJM6MyuGChQLi7hhzPcKh0qijJtnUaQsqlxQjTi0msce7Bphz6P4p8b0to06tO2q19Pfb76m7Ramucp7FP2n2fKznHYZlnmeQzY2PEIjKi9HdSACdLFjsDbe9Qp1FKakjrLWzqUrWVGT3vP1RpPDfEcWL19Gjr0em+oAeVe1rE9xqZTqqfA5a9sKlpq67Tznh2FJ454mgxCdEiOHSTdmAsQupTYg351Gr1YyWEX2itH1beW0k1hrt54Y34L4qg04fCBH1206rDTdQWJ537O6tlGtHCiQtKaNq61S4bWOPPPEZcR/SU+xf86CpRz5Z6AKAKAKAKAxrO/pUnop73q70T7svA5f8Q+/DuZwgmZGDIxVhuCDYirScIzjqyWUUNOpOlNTg8NHrFYmSRi8jFmPaTesU6UKcdWCwjNevUry16jyzlWw1BQBQFjXicDBnDdFvpKar7WPbb+b9d6qno+TuNprbs57S+WmIK02Or+rGr2cMZK5VqUJZuBvLb7SL3PXNaQ+Il4eR2+h/g4ePmxhxVmcuDmbEJrZZNUGgEkdM0SNhzbkCWBS/wDmFQUXNRfph3erJEM2YwSRYdVeSJBErSGHpC1wvSMZTiFJ3Lb6Nu423yaTnxnnE6YiBFWdYlkhZmSNmExd9PR6h2AC5X6xZe40BM4MzuJ1eF8SjT9PigI2lBk0rNJpAQnVYKBbbkO6gLTQGf8Awn8o/tEqTaLNaPeQ9IScbabXHBRpMvjPYR4H9710TorkctT0vWjukkzkcrXsY+sX/WvOwfUkR0yucPqef+F/5/u/vWNjI2fnNP8Ai/ofP+Gn+f7v702MjP5xS/i/p/Z9/wCGH+f7v702MjH5xS/i/oMYOEJ3hM4BMYvvYXsOZAvcgb+yo0q1ONTZt7/oToVqtSjto093fvfciEuWJ2lj7BUtUOrKqWmZf6YrxGGVYdBNEAosXF+2+x53qDpKnGNFd5M0Ne1qty25cnw3c0adDgYejg+STdhfqjfqvz2qhaR19KvValmT4dX1Q7iiVRZVCjuAsPYK9EaUnJ5k8nuh5CgCgKzl30+T0X/EKARfCx/6f+v/AG1DuuR0v4e/3PD1M9qIdKaa3+B//UPx1N/2DlF/7v8A9XoZlUI6s0P4Jv8A1H/1f76l2vM5r8Rf7f8A1ehRcy+el+0f8RqLL3mdDQ/aj3LyGnA/0/D+k34GrZQ/cRE0r8HU7l5o0HiP6Sn2L/nQVZHCFnoAoAoAoAoDH8fIq40s66lHRll7wGYkeyrbR8ZSo1IxeGc9pepCncUZVFlLORnxfmuGnMfQLuoOptOnY2svntv7akaPt6tJyc9y6EPTF5b3CiqW9rn2dCBDkOIaA4gKOjAJ57kDmQO4WPsqRK+pRqbN8foRKeiq86G2WMccc8EjhN8IJW+NBSNPV1jUt773Hfbl661aQVZxWzz244m7Q8rZTlt8dmeHbx3EDOGhM0hhFo9XV8O23cL3t5qk2qqKktpxId+6LuJOj7v07cE3/lqf4t8Zuum2rTc6tH83K3nt3eyo/wCYQ22yxzxntJf5PV9n2+Vwzjsxn59n1FESamC3tcgXPIXNrmptSWrFy6IrKNPaVIwzjLSLBxTw4mFSNlkLajpINr3te4t2fuKr7K9nXm4yXbuLjSmi6drTU4N8cbzpwN5bfaRe56rdIfES8PIu9D/Bw8fNl9wqgvNcA9def2aVBRc1Pch3erJlZNJ8ZQeYvQHhYEBuFUHvsL+2gOlAZ/8ACfyj+0SpNn+/HvIWkvhancR8G+X/ABFg4Xp7N2dfVvp0n+Xl5ud6saquvad2cZ8MFNQlYew/qxrYeeGtns59wgwOClmbREhdrXsO7vJOwqzq1oUlmbwUVva1biWrTWRpw4uHjxDLjEAABFnW4D3HlDwvY8vuqFeOpVpKVF5XZxLPRkKNC4lC6ST5Z4ffRkrBZhgosc8gT5GxCdW4Vur1gvdswHjWqdC4qWyi+OfHBIpXVnSvpTXu4xnlnnj+/RkfFYT47iZDhI7LsTeyjuv5rm+3962UqvslFKtx+Zor0PzC5lK2Swkst7t/35Hj/jmKgifCEKANSm4663vcA3t29x5+FelZ0a8lWTe/f9+p5ekrm1g7aSWVuzz++h7yvheSbDtOHUeVpU9um4Nz2bg1ivpBUqupjhxM2mh5V6G11sN8F/Ypyz5+H0x7jWNKftLvPWgPiJd3qjUYfm8P6Y/C9c+ztKPCXd6oYriYyAwdSGNlOoWJ7ge07Gsmk60BxGLi3+UTqmzdYdUnYA9xoDtQFXwkqrjpGZgqhXuSbAdYcyaylncgVj4SM2w85hEMqSaderQdQF9Ntxt2Got7TnDV1lg6T8OyT2mH09Sk1BOmyW1uLYP+H/EtEnSaAuqy6L6tXPVe1vNVr7NL2TaZWMepyCqr851f+X/5yVKqo6/JaOCuJ4MF0vSrI3SaLaADbTqve7D+YVZaPt5VdbV5YOW/EtRQ2ef+XoV3Fyh5HYcmZmF+dmJIv7ar5rEmu06Sg/8Ayo9y8hlwjiEjxkLyMqIGN2Y2AujDcnluRWy3i5VEkiJpZpWdTPReaNDz2ZXnjZGDKYXsVNwfloORFWTTTwzhS1VgBQBQBQBQGNZ39Kk9FPe9Xeifdl4HL/iH34dzOMuHdQCyMobcEggHwvzqzhVhNtRaeCiqW9Wmk5xaT6oYQ5/iFgOHDDQQRy6wB5gHuNz7ajSsaUqu0fH6E2npWvChsVjHDPPArqaVp2wuFkkbTGjO3Oyi5sO2tdSrCmszeDdQt6leWrTWWSpMzxKxnDM7BAbFCLEf5Tte3mrRG2oSntort7O8lVL26p03bSeEt3bjp3EPoH069Lab21WOm/dflW/aw1tTKz0Ins9XU2mq9XryPkkrNbUxNthck2HcL8hWY04Q91JGKlapUxrybx1eSx8DeW32kXueud0h8RLw8js9D/Bw8fNl+wflzemPy0qCi5qe5Du9WS6yaQoAoAoDP/hP5R/aJUmz/fj3kLSXwtTuKhXUZRwai2spDjh3MJ8OXljiLpaz7HSO3dgOrUG8pUquISlh8i10ZXr26lUhByjz8O0Ew2Jx80jqovzO9lA5AXPmH3U2lKypqDGyr6TqyqRSXl2Im8MfFInlTGKusbDWuoCxIYDY78t/ZUe9daqoyo51ezqTNGK3oOdO4SUk+fTsz9shYTN5MLLI0Asjk6VkU2KXJQ8wdge+t7t43NOKm/1LjjBFV5Usq03Sj+mT3Jpr5cP+x1GS4rExvizpNyzEE2Zrc9Itawtbc9lefa6NvJUUnu5np6PubyDuW1l78ff0IOCnxXRukRlMfNwgJFu29uX61vrQt9dSqYz2kW2qXuycKOdXnj78jhlvz8Ppj3Go+lP2l3kzQHxEu71RqMPzeH9MfheufZ2lHhLu9UVnCZJiPjbQBCuGgabEQv5KtJiFsqg2NtDvOeRtdTWTSPOGsvxkRc4l9QIGn5dpt977GJLdnfQFOmwTPHiHjwU0JvCscQgYXjjxKyM7N/EkPWa3YPXQGjZbjxMpYRypY2tLGYydgbgNzG/OgMx+EO5lKgXJZjbzKd/eKnWCbqPuIt3VhTitZ4y8FLYW5qR67e8VZ4NEZc0ebjvPvpgzrPqG3efZ/esmM8wsP5j7P71jHYZ1n1DbvPs/vQw3niF17z7v1pgzrPqelF+Sk+u/uFMGHPC3stfB7spZShuFY2Ftg0kA7T3qfaKrdIRanF9hJsalOspKMlufb6JmpnMG1BegluQSPI5CwP1/OKrs9hYbBY1tdfX+icpuL2t5u6vRofE+0MBQBQGNZ19Kk9FPe1XWi1mE0czp6WrVpy6Z8xzxHxOMTEkYi02Ookm+9iLL5t62WlhKjU12zRpHS0Lmjs4xfV59CuVaFEWfHtl3xJej09PZeXl6tterzc/NytVNRV17T+rOOfTHYdLcuw9i/RjON3DWz28+8W8O50cLIXCBwwsRe3bcWNjU28tdvFb8NFZo3SHskm2sp/Mi5rjmnleVgAWPIdlgAB59hW23oqjTUMke9unc1nUawOF4nHxI4boutpKar7WPbbnq/XeoL0fJ3G0zuzntLVaYgrTY6v6savZwxkrlWpQFm4G8tvtIvc9c1pD4iXh5Hb6H+Dh4+bL9g/Lm9MflpUFFzU9yHd6sl1k0hQBQBQGf/Cfyj+0SpNn+/HvIWkvhanccOG8+w0GHkjkjLMxJ2AOsEWAJPL+9WV5Z1qtbWjw8ik0bpK3oW7hNb9/Lj98N5yybijoMO0PRBidWk32638wtvXqvo+VWpr63TJ4tNMwoUdnqb1nHTf1IGS5nicMGeJbo1lJZSVuOW4tvv39tb7mhRryUZS/UvmRLK6ubWEqkI5i+qeMkKTFM0hkfrMW1G/Im9yPDsqQqKVLZx3bsEN3MpV9tPe8p/wCC05rjzmXRwwRFWS7sXIAAtpsCL7XI9g2qqo0nZN1Kj47klzOguK60nFUqC4b23y5donmx2MwyvhS2kbgjY7NudLcwDe/rqXChQuGqyX32ldUuruyi7Ztf4fRnfh/ikYSN1aMMCbg6tO9rWO242FeLyxdaampY5G7RmlFb03ScG+ax6iHA4+Lp4yZEHygJ3AA2PsFYv4N0VGO/GPI96IclcyqVFjKfYuJrEB+Tw/pj8L1QM7Cjwl3eqJi4+MzGAH5RUEhFvqklRv4g171Hq63LgR9Za2rzJVeT0FAFAZZxot8Wo5X6QX7ustWGjpatST6RZT6ahr0oRzjMkvMl8RcNx4ZYm6UsGcK9wOViSy+YAH2ipVve1KzlHVWcNog3ejaVqoTU2lrJPfy8CTm/DGFl0DArGzWu/WDDSRsSTexJ9u/dUehdunJ7ZPHdz+hYXVrKpBezSw+94x9Rbw7kOCkklgxI0zICdIsoVQQpYtax3PLzXrdd15RUZ0vdfn0NOj6c5a8K8nrJ47lu3/UUYHLsO06xsVCF9OuwHVva+/K+3tqbVzGhrqO/GcffQq6FxUnd7J1Hq5azu39PmMuLciwuHkRYbHUpJU2Yrbkb27f0qPo+pKsnrrhzJemJSt3HZzazxXqdZOE9OEGJ1JfSH06B5J/zd+/d5qxG9i6+z1d2cCpZV/ZdrtXnGccsCvCZfPKrGONmC89I5fv4Cp1SvRpNKTSKala3NzFyim0u3+yVwv8APP8AZD86OqrSvvx7i/8Aw/8AtT715GoSfPp6En4o6qeZ0sf2pd68mV2DiqUlIii9MJZ1mUdkeHBYsoJ5sGhtc2+UrJpHGS54uILBY5E0gHr6d792lj3UAnm4oxCjEFoVQxT4eJVY3OmZkBLEG2qzE2HLbnQFtoDFs6nU4qSxvsg27+sfcR7as9H3EaSkmm2+hRaXsp3EoyTSSzlt4G3CWSpincOxUIAbDmbkjtHIW+8VIuL+rBLEMZ6kSz0Rb1G81NbH8f7FmY4URSyR6tQRioI7bHxrbTq3dWKlFRSfeaK1to6hNwnKTa6YOCC5AAYk7C1tyeVtqzL2xLLlFLxPMPy2UlGMJtvu/slZhlk0FumjdNXK5U39YuPVzrVRrXFbOpOO7sf9Em5trO3w6lKaz2p+TIm3n+79q3YvVzj9SJraMf8Apmvl/Y94RnwiSOcSAQVGksupQb77b78t7dhqNdRvJxWV/wDUn2E9G05Nxe//AJegozSSMyyGJSI9R0jlt4fpW+lXr04JVKbfasMiV7S1r1HKjVis8nlfUc8CYpDKyXGrXEbdtrOL/eKqbyoqlVyXYdFo6hKhbxpyxnfw4cTRMH5c3pj8tKiIs6nuQ7vVkusmkKAKAKAz74UGAEf2ie6pFrJRrRb4ZIl9CU7ecYrLaKng0Mjqi83ZVF9hdiBv29tXctIUkm45fctxy1PQ1w2lNqOer3/JDjiTh5sLoPSBw999JBBFuy52353rTS0jUqvEaeX3km40NRoJSnVwu1c/BkmLicDBHC9F1irJq7LNfrW56t/bvUR2tw6u11eeeKLBX9lG32DqZ3avB9MdDrwe2GRZXxEZZdgHMZdRzuuwNjyrN3O4nJRe59EzGj6VnSpynDLXVp8PkKMLmjQTPJhzpBLBVZdQ0FrhT1u63srdVpXNWmoThnHPO8i0K9jQqyqUqjWeWq8eR6w2rF4pRLJYyNZmta1hsBvYcgBXpVa1tSwqeEuecmJULa9uE3Wy3yw14LJx+ELKI8KUVXLK2liGtdbNbew3B/Q16tbydVYkvFcDNxoynb1NanLGVwfHvXYJcJj8KJIyUBUML/J3uLHa1t/Ctl43OmlB4ffg86Mp1KVZurvWO/eafmOdiEYWGKJpp26yxKQvVUMLsx2Ub7eFUlOjrrWk8JczpttqZjGOW18llb2Q8qzaQ47FSywPC8eFTVGxB8lnbqsNmBHb41IqU0qUYp5y/wCiNCbdSTaxhL1HWL4lCYBcb0ZIZYm0atx0rKttVuzV3dlaY0M1XTz1+htdXFPXx0PWd8QmKVYIIGxE7Lr6NWCBUvbU7tsu/KsU6OtHWk8IVKuq9WKyzm3FSJhzNNDLEwfouhZbu8m1ljts977EbbGs+ztz1YtPnns7TG3SjrSTXLHb2FFxWIOJzBI8RE2HuHaxdWJB3AuNlJK2376k0v8A06dWEk/9Pj6kK5p+1tUqiax+rw3/AC3nLLuIMOJkmWGSaFIg0iuwboCSAbXAD6RY2AHleapNSnN03B4Tb4pY1t3PBFpKnGuppuSUeDedXfxWRzm+az4fHFMFEC8yKei0izczrPWAT++/OocIupS/XuSfH0wTpYp126fGSWVjv35FeVYUPjp/+JKYm+Ls5LMBY9ILMpU2YWv5tiLbVJlVlCjHZPnhY9ckZW1OdSe3zvWXl+G7GN2DrheIliwQWTAOYZAwGINrMxvpa1rgct79m1eJUqlSpra611y6HuDo0aOz1HqPm+feTs5xcOFCYPDxLiJJk1FnKqOtdVZWtcm4Nhfa1eIKdWTrTljHQ9TjSoU1QhHWz15/f0FWAxk2H+Tx8chVb6YLmzsSAlludVyTYcri9bqrdWWvSSWeMua693eR6FONFbKrJvC3RfB793f3ciwZFnUyYk4T4qMM0qmSNWYSBWC3OrQeopABse3xqNWpa0Npra2Nz+2TqMtSWzUdXO9d/gVvI8Wkc8vSsFIjN7kc1mjLWtztYnas3lSFaUFS6YNGjaFW3jUdbG95zyLlhOKJJJ4XOCnWGQMscmzEhmSztGOsi8tz33rTO3jHP61lcv8AJYwuJOD/AEPVbW/58iHisfCmLxM+GwMmJYKIsTIGVUAUDUqq3ltYLcDnpFZjbLCc5JZ4GuVw8tRjnHEnYniPA4WPDzRwoseJv10UIQqqXFwBdjfq6e81iFrOTlHmhO4jFRlyYhx+cLL00ZwGKE0/Rz6BIFPRxW0S6rfJ2KDq2O/jWz2RcddY4ePQ8e1PhqPPHwLDkmATEwRzrisYokXVYzbjsI5d96jVKbpzcXyJFOanFSXMV5r8HV2L4Wfo7/Udda+Aa9wPEGvVG4qUXmDNNzaUrmKjVWcCOfhPNozdIo5PPHLoP/lapv5nKSxOCf34lb+Rwg80qko/fgLnyvMl8rL5f6WVvdety0sv4fX/AARJfh58qn0/yeIvjsbK4wOJDKQw+TJ3U3HZSek6U4uMovf3CloOtSqKcZrKeeDGOfZ/jsVpD4DEKFvssTbk9tzUa1uaNBuWG2+7+yff2VxdxUW4pLfze/5CtcPjTywGJP8ARb31Melofxf0K1fh6pzmvkyRHk2aN5OXyf1Oi+8ivD0t0h9f8GyP4d61Pp/kZYXgrM38oQQjzsXI9Si331plpSq+CS+pJp6At4+9Jv6Fn4e4EjgcSzSmaQbiw0KDyuADcn1+qq+pOVSTlLiXdulQpqnT3RX3zLPHgIwbgEG9/KO5G2++/IVrwbnWm1hvyJNZNQUAUAUBU+M+EGxbLJHLodRbSwujWJI9E7nfesp4eTElrJopeJ4bzSI/RRIB9aKRfuUkN91WsdKPGrOCZQVNArW1qdRp9u/65REzLFY1iDiMPiyVFhdGaw8RXujfW9P3YNGu50TeVsa9RSx4egtfNEXykkX0kIqR+Z0O35EJ6Cuuz5j7A/CLBHhWw+i5IZQ1iBZ73uttyLnxqtqyoTrbTWeOPB5LyhC6pW2y1FlLC3rHj97yvLnUJ5Fj4Kas/wAzodX8ii/I7vovmSIsUzeRBiH9GJj+leHpOj0Z7joK5znKXi/6PeY4HGvGX+J4jSpDFmW2wPdzNead/Tk9SMcfJEr8orQbqVJ5fDm39ehzwLQzMvTYqOEXGyxSyPf1IBf11HulcV1vgl4rzyTdHU7Wzbak5Z70vki/5hkuJwuIingWTERrGsTBdHSroJKsA2z31G/bUOGrOls5Sw08roW0qjp1XOMMprDW/rnPE+ZXh8bPiMTJLh3iWXDGJDIVuSCbagvknrHa3IdtbJOnCnGKllp5ZozKdSUtXVTWEQMd8dky5MCMvnDosKs5KafknQkrZrtfT2d9bY7NVnV11jf15mmWu6ShqvkO8SuJwmNnxC4Z8THiBHvGRrjMa6dOkkXU87itKcKlKMXLDWePM2tTp1HJLKf0Oeapj5o8PiWwgEkE/SDDiQMzRadNy3kh9ybfrtWYbKLlDW3NYz2/0YntJJS1d6fDsKxmvDGLxOKM8WGkgSXUD0xViGILElQSUUnbt3PYK2QqRo08Rkm857OmN5prUPaJ/ri8Yxx39U9wpPCOaLh9IwhIYb2ddQ37UJufVUn8wjtNRpavUgvRTyqyk9bp6HTCrmeHxK4kYOfUF0m6l9QPPcc68O5t60dnJaqNkLK6t3tIy1nnO/u4P/BF4gx+LxM7yzYWdbxdEAIW2FyR2d5PbWylXt7eGrF5Ndxa3N1KMpJLDz2buRKzXifET4GPBnByIFEas4RjcR2tZdOx2FR4OhCbra+eznvJdRXFSGyUMdud338yBCzM4LYCaVR2GJxe43BIAI8QamO8o1YvEtV/fzKulo25t5J+8ua5f2vkdnwmZSrGowuJ+SYmMkEFEuSF1mx2vsajxuqEZOPXi+XyJ87S4liaaWE8LmsvqNcjybN1Zugw5g1bO8jgFvE+UTz3FZuLig48E8cOP14Hi2s7mMm3NrPHcvpxOsHAOMmGIEp0OlhFYDRKeezXvbs3Hb5iKjO4zUhVk0+xLgTaVrGnRnRhHjvy3nL9O0s+BxeOd4l+JzxkdWR3lQRolxq6OwOvkLC1aJUKSzLaZ6dSdG8qNKOyS69PM5YQ47BLNho8G8+uSR4ZVZQp6U3+VueqQT6/Nzrc1Tq4m5Y3JNd3Qip1KetFRzvbXidY+HZYhlcWnpFw7MZGHJWKE337NR29VYdaMtpLhnh8zOya1F04/ImyYVznGvS2g4EprsdOrp76dXK9t7V4Ul7NjnrehnVe3z/x9TjwlgcRDhY4njZShkFj3dI+nt7RY+us3E4yqOSfTyFCEowUX97z/9k=&quot;,&quot;width&quot;:331}" data-trix-content-type="image"><img src="data:image/jpeg;base64,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" width="331" height="152"><figcaption class="attachment__caption"></figcaption></figure><br><br></div>]]></description>
         <enclosure url="" />
         <pubDate>2018-05-03 21:32:18 UTC</pubDate>
         <guid>https://padlet.com/alelg2001/s75m242oc4qe/wish/257851164</guid>
      </item>
      <item>
         <title>CARACTERÍSTICAS DE LOS GASES</title>
         <author>alelg2001</author>
         <link>https://padlet.com/alelg2001/s75m242oc4qe/wish/257851920</link>
         <description><![CDATA[<ul><li>Una de las características de los gases es que ellos ocupan todo el volumen del recipiente que los contiene.</li><li>Sus partículas se encuentran bastantes alejadas unas de otras, moviéndose continuamente de manera desordenada. A este movimiento veloz de los gases se lo llama agitación térmica, pues cuanto más aumenta la temperatura del sistema, más rápido las partículas se moverán.</li><li>La velocidad de las partículas del aire atmosférico en condiciones normales de presión y temperatura es de aproximadamente 1400 km/h.</li><li>Debido a este movimiento, las partículas de los gases están constantemente chocándose unas con otras y con las paredes del recipiente.</li><li>Estos choques contras las paredes del recipiente ejercen una determinada fuerza por unidad de área, que es la presión ejercida por el gas. Además de eso, estos choques ocurren de forma elástica, es decir que estos choques ocurren sin variación de energía cinética total.</li><li>Los gases poseen gran expansibilidad y compresibilidad, por lo tanto su volumen será exactamente el volumen del recipiente que los contiene. Cuando no están en un recipiente, estos no poseen forma definida ni volumen constante.</li><li>Los gases poseen masa. Cuando la masa de un gas es igual a la masa en estado líquido o sólido, este ocupa un volumen mucho mayor de que si estuviese en alguno de esos dos estados físicos.</li><li>Son menos densos que los sólidos y los líquidos.</li><li>Poseen gran dilatabilidad con variación de temperatura, o sea, se dilatan al recibir calor.</li><li>Un gas siempre se mezcla uniformemente con otros gases. Un ejemplo es el aire, que es una mezcla de varios gases, siendo los más principales el gas nitrógeno (N<sub>2</sub>) y el oxígeno (O<sub>2</sub>).</li><li>Las variables de estudio de los gases son la presión, el volumen y la temperatura.</li></ul><div><br></div>]]></description>
         <enclosure url="" />
         <pubDate>2018-05-03 21:36:41 UTC</pubDate>
         <guid>https://padlet.com/alelg2001/s75m242oc4qe/wish/257851920</guid>
      </item>
      <item>
         <title>LEY DEL GAS IDEAL</title>
         <author>alelg2001</author>
         <link>https://padlet.com/alelg2001/s75m242oc4qe/wish/257852306</link>
         <description><![CDATA[<div>Se define como gas ideal, aquel donde todas las colisiones entre átomos o moléculas son perfectamente elásticas, y en el que no hay fuerzas atractivas intermoleculares. Se puede visualizar como una colección de esferas perfectamente rígidas que chocan unas con otras pero sin interacción entre ellas. En tales gases toda la energía interna está en forma de energía cinética y cualquier cambio en la energía interna va acompañada de un cambio en la temperatura.<figure class="attachment attachment--preview" data-trix-attachment="{&quot;contentType&quot;:&quot;image&quot;,&quot;height&quot;:197,&quot;url&quot;:&quot;data:image/png;base64,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&quot;,&quot;width&quot;:255}" data-trix-content-type="image"><img src="data:image/png;base64,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" width="255" height="197"><figcaption class="attachment__caption"></figcaption></figure></div>]]></description>
         <enclosure url="" />
         <pubDate>2018-05-03 21:38:57 UTC</pubDate>
         <guid>https://padlet.com/alelg2001/s75m242oc4qe/wish/257852306</guid>
      </item>
      <item>
         <title>TEORÍA CINÉTICA DE LOS GASES</title>
         <author>alelg2001</author>
         <link>https://padlet.com/alelg2001/s75m242oc4qe/wish/257852708</link>
         <description><![CDATA[<div>1. Los gases estan constituidos por particulas que se mueven en linea recta o al azar. Un gas consiste en un conjunto de pequeñas partículas que se trasladan con movimiento rectilíneo y obedecen las&nbsp;<br>2.Las moléculas de un gas no ocupan volumen<br>3.Los choques entre las moléculas son perfectamente elásticos (esto quiere decir que no se gana ni se pierda energía durante el choque).<br>4.No existen fuerzas de atracción ni de repulsión entre las moléculas.<br>5.El promedio de energía cinética de una molécula es de 3kT/2 (siendo T la temperatura absoluta y k la constante).</div>]]></description>
         <enclosure url="" />
         <pubDate>2018-05-03 21:41:53 UTC</pubDate>
         <guid>https://padlet.com/alelg2001/s75m242oc4qe/wish/257852708</guid>
      </item>
      <item>
         <title>CARACTERISTICAS DE LOS GASES</title>
         <author>alelg2001</author>
         <link>https://padlet.com/alelg2001/s75m242oc4qe/wish/257853779</link>
         <description><![CDATA[<div>EXPANSIBILIDAD: Un gas no tiene forma ni volumen&nbsp; de finido, essta adquiere la forma del recipiente.<br>Es la tendencia que tienen los gases al aumentar de volumen por la fuerza de repulsion que hacen sus moleculas<br>COMPRENSIBILIDAD: consiste en disminuir su volumen. Las moleculas se juntan y disminuyen el espacio que ocupan.<br>DENSIDAD: Es la relacion que existe entre la masa&nbsp; de una sustancia y su volumen.<br>MISCIBILIDAD:&nbsp; las moleculas se mezclan uniformemente<br>PRESIÓN: Se define como la fuerza en unidad de area&nbsp;<br>VOLUMEN: Es el espacio que ocupan las moleculas en dicho recipiente&nbsp;<br>TEMPERATURA: determina la dirección de flujo del calor.<br><br></div>]]></description>
         <enclosure url="" />
         <pubDate>2018-05-03 21:47:13 UTC</pubDate>
         <guid>https://padlet.com/alelg2001/s75m242oc4qe/wish/257853779</guid>
      </item>
   </channel>
</rss>
