[justify][size=85]La profesora de Pedro le planteó la siguiente pregunta: en este applet puedes mover los puntos A, B y D para cambiar el tamaño y la posición del rombo ABCD. En primer lugar, con la ayuda de la herramienta "distancia y longitud' mide los 4 lados del rombo, seleccionando los velices A y D, luego D y C, C y B, y B y A. ¿Cuál es su distancia?[/size][size=85][br]Ahora mueve uno de los vértices del rombo. ¿Qué observas? ¿Se está produciendo algún cambio en relación a la medida de sus lados? [/size][/justify][br][br]
[size=150][color=#000000][/color][size=85][justify][/justify]Ahora, selecciona la herramienta de "segmento" y construye las diagonales del rombo. ¿Cuántas diagonales tiene? ¿Sabes cómo se llaman?A continuación, mide la distancia de estas y comenta que es lo que observas. ¿Miden lo mismo la una que la otra? [br]Por último, mueve un vértice del rombo y observa que ocurre con las diagonales. ¿Ves alguna diferencia entre ellas? Además, a pesar de mover uno de los vértices del rombo, que les ocurre a sus diagonales, ¿de qué manera se cruzan? ¿siempre es así?[/size][/size]
[size=85]Ayudándote de la herramienta "ángulo", calcula los ángulos internos de A, B, C y D. Para ello, para conseguir el ángulo de A se debe dar a la herramienta ángulo y seleccionar los vértices B, A y D. Así sucesivamente. ¿Cuánto miden estos ángulos? ¿qué observas tras esta medición? ¿coinciden unos con otros? [/size]
[size=85][b]Pregunta 1: [/b][br][i]La profesora de Pedro le planteó la siguiente pregunta: en este applet puedes mover los puntos A, B y D para cambiar el tamaño y la posición del rombo ABCD. En primer lugar, con la ayuda de la herramienta "distancia y longitud' mide los 4 lados del rombo, seleccionando los velices A y D, luego D y C, C y B, y B y A. ¿Cuál es su distancia? [/i][br][list][*]Primero seleccionarían el vértice A del rombo marcando la herramienta de la flecha y lo moverían. Igual con el vértice B y D, comprobando así que al moverse los vértices el rombo puede cambiar de tamaño y posición. 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4s4T4u5eCEKDYVzmLl6wIZbm42Z4lkAT2+gEWiF3p8XILit6IVeV185kqoeNaMCzY4UYjRc70oPztDowgTDPudpSXMDPdFwz5n6Um0MeAmB9cfPp2xaFvA2mJBwynOUg3Gw6U2OGyJ6Zw1d4ScZSTME99qJpYffH0nce8NbkJUF5OTEzY+Pn7eO+a8Fb4amW+Dm4+GqascVg8nH7EX5S0rKuQy9upLL1tHT7cFwhFrRS9rNoNqTCUs1tFoUZwzNpe3QD5uDU0dli35bWZk1DZsWW+tsZgjrKdOxBFnwPIwYAEuQsTnliZXyCxQct5+VEScYShxAkKYwqUDMHwrWiM4VrRsMgchD1lLe9ja24J27NCsnR5K2arVDRZugGDjvLbmgCVnixDkrBViYcvPmcWiBTuT8VlXJAhhRycgXbT0XMGZydvQHrIkRLQEkc9n3HdpU/Cbm/AdeeBLHfgSiEImZ0/+7bj17Izaxm6kEDY4hOwXIPSpPPKE+M4OJGzdtpizTrQERW7E9WPlHw4QywfPwH2QF9kIcSMZHh52fkKR72sgXJHCNyjyhUzz0bupawB6ovPXSPoDQUvOzFhzOG8jMynLQbRm8hGbO33Cim2NVpwctXfPpW1Vp98SiSKEGl5zNm/h5gZrRkOgtzo1lbVIOGgTEL+xsymb42sr4XEXswVLQGzT/oBNDKetFE/bmXM5y0E4A4WChSDeFMaxMxmbpHBCzvl6P74YgctI6CkP4rypeM6acM7cVMbG4THzXb3Tk4iXL3+AqOcgyCmka+Zc1kYHU87LFjp6IzY8lLbRUf5cY8His1kLFPEX4hqARz55ZtZiXY0WhNSfG85CYM3SMxnLJfKWw/UaVwZsYATXHEjaXBYdBuSDZUcPOwf/vBmetVheOPULFlv/LkQ1wHc/8B0P3vsY+EZDvm/ifW82lGdc3SzmGZPR4TMWawzZ2EzaOnvabCYdNv/EsNmKTrOJszZh7dbsT1hzc5tNzSbhTWasu7fbOlpaYMD4k3kZ50X7HN/1QxyD0ZCVcnlnKLq1LWT5ELzaqZw1+AoQUL8F4WFmIZB8S1Eg7LfJ0YwzPByN5eGtRqyU5wxQvgWzaGOTWefNS61RvgoQwgvJjsZClooXIdwBg+5baorLU/w2fSZtg6cztmlLzNZsjNrQEAQYaeKbmhhfCJsf/0zNFKwpFLdozwprgxt8+hRfVMEhcPctQ20Q/lgfymManvFIyuLpgjXAY48hDbkCPPEVEWvQUPWyQ56xqHau1DO+rBjzMH91h0/36N04T2bgaXBZS3DBbDBx7VlKjK+EOXjP0eYW43sPEnNxa8LnawuHoNl86BFfndBNQjin5kq2ek3UeYnDpchl0xYK6zWW4gISY1HtXKkYX9L6cQjowsQud7b1+c/wrnK4Edzvohppam11foiBnadrL8SEE7jgKX+IF4B09DTYpk2NlxViIiEWQixXlrSAnhDTFQ6h10mjGw4FLYSNnzn5B5qMnqk7Di6EEEKIq2NJMc4XCs6w6FJD0fS2KMwUa3rIQgghhLg6Fn1mzGfEnPkVCoY4EfWS8OxMNmtRvXz/usDq4XMx/tWMUSEuwHvCuy/0zFhUKx9qAlc2l4dH7D9v/PkzgPxtXm8ZwZYtW5xFy97rvLKcYITPEovrAztGXtkLIS7AETraHdkeUa18KDHm777yR+PZ0MlLL73k/GC9Jwif/OQn7d577z3/Czjcz2g8cRbXnkWqSQgBPDslRDVyTWZTz+dSDd4VCt0Q1xOWvzZt2t6/CbEcWNQzdtbuoZF7k7dGRkbs7Nmz572z3t5e5w0i3tAQf7jdXQerG0MIIYTw+FDD1NxFgZ0/VL0Ubti8RSIXv9pLCCGEqHc+1DA1BZjPf69kDbH7dig9KxZCCCGuliWfGfOtShRlesiLzeTlC0F4jKL9Yd7AJIQQQtQ7S6qo5x1zc4WXv3+bhyectwwFmj8uAI9YM6iXGbmk2cxQ+ctVkJ42S0zxrTHlHdeI2UGzVKb8ZblTQj0kUA/n8BEd4QzKNIVtSRA+O4dynyh/v8HEz/BlA+7nEuqdP1hyKYp5s7kxtJW0+z2fQl5Rv1eyei+HfMZ57nVuCxlcIz5b/lIhWC6JcdQt/oplzyV/QpGPizkpy93oKXM9H0Qan7lpbV8FSMLQvfifYIxg0Nr6UIOXeNkBDcqxn5l1by7vuAKmTuCcp8xW3+1+HzttNnTYrGu1+/1ynH3dbBQi0tDNX/Qv77wG7Psv+Gcj8tzsfv8gJEbNzrxt1rgK5bVIm40PmL35DbNxiErvtvJOiOGh75i9husGG8xa17o3hMfsUbM3/hphUFYF1EHzCoS7RvMmKMCsh8Mvox5uRvpQ5xmIT6y9HGAhCD9xzOwc6qkV6Rg5iXaC8E2XeR95Cu3j5EuIHx2whg6k/yo71mPvoGyQNv5YeilnNnDQrBNlfQRxd6zHsXI4D3YcTryAZLchva0QYrSxw9816/ko6qccZikm30OaDyBOpLd1kbaw/68Q914ch9C/+6TZW9/mS82x7zmkC/tH0A6OvmL23t+btWxCm8D1Wa9P/TriRZoySEDnGtRvP8oFeWlBvubX+41kDh2U4bdghHEfxZBfUZPoJxSXK/HjZk/+odlNn4FhgfHgK0nX/yq+32H2wu/DMKInvflh/D1ktg7C8iaM0c0PmfXvM9v9v0FsIOBv/yVEEzf6plshUoiPjyGaYvjbCQMAIS3AmK+8HYIAcSrCwKIx2c/9Sxh8GML934IwQ5gaVyLsKRjxJtfDyaMZ+WD0JmDsOpCWAsQgjbRwKXpwndmtv2A2/S7SgXTNQhz9OL4L6RzGviTCNcPY9NwFIUe6GEcBBqgX10hj/wNfMnv+/4Tx/TSOwahSTzthSGcmzR76TZwP4Xruq7gOLtaxE4KAPA4/AyGDoc1CSFPwcOYQpu+TMOa4XiPiDCG/hmO7Pod9byJf30ScEIMdny0LPs559T+bvfM9s4/gGpvuMzsFY37uiNm2n4PwIP0HX0O6EU8cnssupO3ED+G5oSyCECKDgI5g60ZZzcBr3ILyfONxs4f/rVk74v/Rv0Z+EWcQRv89dGB2oj5Poo5SIxAAxLnmU+gIoJ56NiDdt0Ek0DmYRachhxu4FSLWsgV9k12uiE3iOi0o4xDys2YH6hdpDiCPDUhjBmmLQqDPou4CEJd1H3e91xF0JgzHKVoNKMsM6jg3Y7b2QeQVHbG3nkC4KVzjMbQNtLE30FlJot42Ie8jKAN6wk0QrgzqKYyyavwI6mYP2iHSvfd51AOukUOca1EubyGNnQh3/x+g7rDv2T/GMVy7C9cZR97DSGsE3+/9PcT9KvL0oltu07geOwhBnJtE5zODdhLFX5ZBHOnu7UIa0GYLaKPr7kEZoPOxH3kfRKdkM8phcD/yjXpfhzbRhra+BtvQT9Cm0UGIo87bP4ZyRx00oNz+C9LvRwdy5xcQBvXQgjILI45x5KWANHfehDjQPs+g85VC3jeirbDT045OahadmSYcvx3tmSMag+gAD6JD0tWL8Cj3KO6RIET9HDodBXREelF3jYh/AOFaESaI+kxNYD/qOYv8TiHdmbMoE+Qvj2ulWQ/3Iy2IM4Y63/Eoroc4RU1wzdcZiyqiCca+FYIzA+PcDsGagPEowUgdheFohGHywVgN/Bg3MZUQN/cQPKwQBKAIY5ybhsGCx3AW58Rh3JIwDiPwbOK4+XOIYxwGIw2jPA5DU4SRKuL8EgwlXzdIUZuG4eeQ6RiO98OYDMAAT+NcNrRZCEka8eVhkCYQTwpCEILROIvrU0gS8MSC8DoSMK5kDGI+C6M6AWFogEH6GbxQegDn8J3eCIcuu29xP5MErp2AYWT4Ar0dGMZJXKOIbRodhzlccxZhBmHghyH6FIN2GPUpxBOBwHEInp8T6HAwzePI9zS+83Mcwj6HNA5DYDPl4ckoxLwJ5csy8KH8kkj/HMLxtmGaiiiXSZRDGCIQxI3F4X12bMaRvoMQlNMonykcb4RRf+tr+AwRm0T5UAwp6g2I/w14aOPwfqaQphAMexxGOYLrTeNajIve0Sz2jSM/p5CvAWx5XHcFOjxOPaEMc0iP9354jpREkJZRdLKOokMyieMUD1Q9ut6ID9/pDZ9EPhlmJdLGNnMO6WT+plGGGZRTCGV6DmH97Kvj5DiEkfUxCqHLYR/bjB/t7Nh3cA3U+yTiYt3wl7USaB8nIXbdaKcjCJ/A+SyfKbSLAup7EtfwI730PqeRb290hyMCBYRlvjkcnUD4EXSe8NViqEe2qxL2O20R9TCEzlEGZZDExg7eOYjYLOoghbYQR5rCELMI7we0tylck/XD+CmYFPokws0izfxBHEMdPvS7ZtvpnaNtxbCxI5PG5sM129FhGYJHfQqdhQDiTOHeaYKQUiAjOHcAHUiWEYeWJ1AWWdQJOzdsX1PIZwJlmkMbT+Iv79UJpGUG13fShLAhxDmBvJ6B1z+EuHiv+JEGH9oCh6oH0PEeR5vhPcP7UCw7fPKMa4wsbvATP4UBgEhk6HnBSGRhTFZuh/HnkCOMVBc84mH0yHc8AmP5NLyrm13x3AivhSMjhyFiJdzoKRiCNESFni4Fex28xAYYrhLiiKInH0ePvBnimYEYdCKOMxCNYxDfXT8Pg4jzJo+hU4DjNJ5FNKMAIk/CCDZCVGh0CxQICAGbWC+8kjTiyUHgKThh7G+FsZ6EgWEL7IXoHodAbL4XBhhGtYC4qNn0aFoghDSEEXiJsxCBAD0NHJyAiO6Ap5aBwX8eQr4dXk0b0jOIvPuRpm4Y4wYaTBgwDqFylCgLQ+YYOXwpwdD1wWuagxHlczl+H4Eh7UIca7H/DNIxhfysZBrgNe2Hd+hHuWyFhx1AeHpeRZRDDwSNntSz/wYiifrogcfHfDEN9MIjm1EuSCMN/xp4pu3oGAwgPz7kI4HrMT2tyJszCoG0tsFoF3FsEl5dGH/be3A+6mIK9UXhb0dHrBMeEkcXaPhnkP5WeMZ+5KkDaafBZmcoiO9BnB9FOaRx7SDSE0VZMjw7TRTtFRtRLgjHjlkKQsH21IH6e/evEQ55uxWerQ/XfvGr7qOLDRCrMdS7H+cGcH2OmvDnORvgbc5ATNoQ3ziEpAkCk0Q99+5GW0R4evvNWxEOlX0aec9DUJtQZrNIfwP+BrB/5Z1u+0mgjfNd9xTtMM4LI80BXCMBYQuiTVHo6Jm3s5wgrmzLXfBMWXb8fW1nOBDh2M74fSXaLj1PlgGHBlP8i3hZFs3IL73MI9/H/fEJXBd5Po188D7IoK1mkB7msxVpZ0eUnYEMyrET7cqHOHxIxyTS1YAyG0d93Yp7jvMbxtAha8I+Pipi/YbQ8UKTsTzSEUO8Q+wIoiOy5SF8R/3wkR87V+yAhNAOC6iLCNLHESaOIrCueO8H0A6Zn0akWdQEH2qdsahi6D3kIXTOoAaqjl4Fa5BCSMPEYS1+pkEK46anN0jh4g3NYUzC8zmJhs/q/DAoMRiKcYoQRCcMQ0DV8iF+iinj4jXZQ6fnm4JBoODAZl10nM2I59DrY1jiNC0cY+Dz4fDZiQ/H/Eh7gQ2Ux2Gw6PExrY6BZXzYT++LfxmOHj+9USd+HGcHgM8DcxALDhlSNDmhkHllWpznw9iKTBOvy/Rww2fvL5/z8ri3j8PMTFcI6eA1vU5GAZaUowWNMIYt6AgxLA0l88PhcV5vEJ4aPfFGGNdiOV+8ro91hGuw08J88uU49NBYDk754Fyez/BO+ZU/s474mYaaYZ3vyJ+zj+XC0xGecTGNTBPTznCsG17bSUP5fOcrPvOc8+Xr1RXjZ15xPvdxSJ6jL23Iax7iNQJB7USngt488+3kCddw4ufG63r7mQ5ch22RbTCP9DnXwjGmwSlX/OW1nHJinvCHeXLKBOdzB9uB15acPLCeAONnEKftcx/COnWEuBiO353yLh9j/fCzV548xrQQptdJK+o9gDpnOlieTO/8turVIXHqkenCeQzPdsvnurzXKPA8x9nHazA/COSUOxPNtCP+WQgxJzl28Zm6l2aEZdxefTtp4Dk8XD7OazKv/C5qAomxuAyodsdY0aDgxqah8gz8UtAYOIa2bCCrBhoxGlgK0nXCMZS8BoWDxnMRaMQdwVkGhtLp1DEvFAa2FbaPZZK3isPypLCCqruXxLVGz4zrmdkTZv0vl78ACgknXw1h/3lgVGlc2QungXV62+VDC+Fw4cCb+ICwV2I8cvAi+VyLw25xeAAcYs3h+8gh17O+Uo4+C4Gj97UEvM5xeHBOupYQ4mzCfc45izQshJ4Oh3OH3nXTSo96KeilMS2Od7MEi3ks9Kj5DJBe2zmk9XT/BUM8H6Zl8CWzBEc9FgPXpdinkZ88PDA+qxw7Uj5GECeXGHFy1VJwiH4UHu7smPudz3nPwttPu0biIjxvnzBPBVz3NNoAJystBtsYl7RRtDkMvBQMx8li3K4Ueq1OO5p2isGB5ek8w8dGL/RK8eLK4XwvLnY2uI9zIZi+y8HwcyMox7NIxyLh2WlLTrpxLlpevPdwHy28l3jtNOqIbVbUHZdc2iSqFE4wojA4z5NgVGgznX0wAjSioxDiY6+ardjmGg4K7uDzMKYwXL1rXeNKUaTnw5ufho3PTOkNUeA4JMfnaxx2o4HgJC9OqGnqQBgcJ3zmmIHxPfYijPqQWWO7ey0KEpeIvPccrod0nIZo7HsC+5vMmaTCyTfUq1f+Pb634TPSxueunFTDjUPRTA9nD08OmLX1usLOZ4ccLuTzROaXYZjW1/ms7xakB/s5xE0hYLopznxOyM8ZpHUccR2DuK/Y4goGjTK3/reQ1mcgbOisFHFO52o3XqaF4sfrUCjPckIYPgeRhyyuwTje/FtcB+XtDXU7w644h8c5NEvBocHlxB4+/zvyOOqmwWwlh7Ep7Kw/pKHEDCFv+//crGU3zsH18dUZBmZ+ONTLvLz1VyjPUzh/DQQews3n2S18domwHO7l5J8xdLja1+H6OJePG1ivzlAv6nEGHYFBhOH1GlrwGfUzgbLlcLQP6aWoMU1sB7w2JzAxHxSHLNrOOz9C2FWoa9Qb15N7w9qOWKOMv/VvzTbfbPbS35it2uqWfQBp5/ksS7ZNzgx+8d+gLN4x23ofroN0MZwjWvjMumJ6nXaJNHDomLOTX/8PqEN0JEq4XjvyP4mOzVt/jWuhDtgg+rYjrYiDdec9Z2W9sY75mfWQhUD+7D8hnqPIB9pBFG2K1/z+/wJhRVmyGlpQFizLJMqdjzm4dpvPlx2RxD5+Znq/+1vu973fcGfXO+0F5cH7g3XFJXHvveHeA5xDEEJczCPLmOlzOhAoN7Zbp+2gbKaRvxe+gjoZR/ndivSwYkWto6VNy5VReCevwQBt/Ji7xpXGjcucTv0EBgo98f+RM6V/DEMAkZmGYT6Dm/6ffR3fsb0GA86JVb0wxEf3mN3837ozULcjriF4SD0w4u99G8cfcY0IJ0B1wmhxQg5nETfDSM3C2LTfhLghTr07YVRg5GjUOJPZj/D3/TMc74SBgZE79C0c74FBK0+sKcIYvYt03PUlpBfCePPn3evAppl/GIZwA+LaiPTDiG3/LNIC43//r5o98d/jL4zo7k+b/c0/NFsNwdr4a7gODNyTMF4FdAY2QgTiEPxjP0C6IKgdt8GII54SymTzfwMDBy9mAgZ8K+LgPTGMsuBkrwLEonMH4n7MFYE4BOsABJ6ToRoaIXhIew8Mff8ryCP20YsMo0y5fOsM6mIFxCmIfE8h/k/8JvKL63EpD9e0cmLQnf8H6gWeMWdCh5DR7n+E47+DssCxu3lNTkxCuXz6X8EQI2zDnUgbZ3QjnmaKJDpA/+C3XeHchzprQnnehzI4jjQOwnjTsy0gnRuwn3FNIh0BiBgnlI1wYhH+PvTPEQ7pP47yjCLOsxBCTpLrux1t5x+7ovizPzCLocNA73Ma5dmN8pxFXjmhrQXlfOsXIca4ZhFCs+EfIAy8cM5Q/vz/4845yEOsvvZ7Zl/4X82eh0DFUb6d6AwGN6Hd/REEHGX4m+j0cM33E8gPlyXdD/FOo95f/I+4HuqAy/YakY9R5CHH9oiy2IR2UML3vf8ZZX0X2swvYj+EfgxlsRf3wTDqi+1pHY5xWRM7BgmEn0LnqwedtATSxRnln/oXqHR8Hsb+rQ+j7lm27EQgj4+jc/DoP8E+XJui/c0vo2xwTwyjo7ka7ZHtqh9xr8A5u5C/dWin38bfx/7Q7Ee/j79/gvsH99xJ1Adn3n/0C2Zvfwd1hTTNoI2s/CTKEPfP27i32lEOkyh7rlufwH0Vx320/lOI95eRJ7QZdmRbcV9t+jjOW887XtQ4GqZerrDrxB45PR4u3XGG+yB8PbiB2+f1qyhCYzBUXCNJ6Cn24QZnZ5uTk3b+itmaXWZd2FZwDSWEmMtw2mAU6VG0whhz7eYGbI7HBAPfvhnGEMZxFYxMNwztChhFzvbleknOxo1wcg/SxeFvekH0yE/DSFGIurphnCDaK2HIBpEuerpj2E/xmKPnhfM2PYjrwGDSy6Ao0JvaD2+y66PIZ3mYeQeE4DjOWYX4POjFzUEk/BDWZnQeuCZ0Bh4Hl7/QG6F31QwPkp7OHETk2A/xF4aQ3j5fQMF0OhOrYEgJvcE0tlF0Zo7BOB6BUc7Rq8fNwxd8rICR56xh5tEZWkRaHQ8X59LLWQGvhhOdODOZb3Gip5mG5+UsmUKgDpTd3RBuCv7tEOf5Q7YUCHawOHmI+aCRn0b+WCcRxMPlQKREjw+iSXHjbHd6hE48iJ95plfb3I5rI64ReP30xpyheJwXQWdpM8qxF8LA9kCKKM82tAWOLjijLAjfjnpuQH1xtjiXM7FeUsgvf8eceWa74CzkcVyfy30CaHMv/juch3aBYLYdoldAXXVD9G9Dh6qIa59CfjiawPQefg7JRUAuWUqWr8mhYo6OtKCj1IPyyyPNhCMuHI05jjbDtfEeGZRLFhtHTegFc0SFnjg9bAotxa+Jwos67sLnEXTQXv73ZgchriNoAzSBEXRaXkNnj0vBmKcSzmPn04e0caY9J5iFINTrcS+kWDe4Vgbt6GWcE0ZZRtihQ5vgy0/WPuAky5LI92G03TTqYiPuG7YLpokbPXj+DeIe6MAxvqgljetxqROH+kdRX2+h0zpy0I1L1AXyjEVt8cz/DNGAd7Qb3sRSUJwnj5q9+l9ha2HwHoX34omOqF0o3M5abghbBzoJH4ZBjmqg48bHBx8WDk2zk/HuW2a/+AflnUK4aDa1EEIIUWE0TC2EEELUCBJjIYQQosJIjIUQQogKIzEWQgghKozEWAghhKgwEmMhhBCiwkiMhRBCiAojMRZCCCEqjMRYCCGEqDASYyGEEKLCSIyFEEKICiMxFkIIISqMxFgIIYSoMBJjIYQQosJIjIUQQogKIzEWQgghKozEWAghhKgwEmMhhBCiwkiMhRBCiAojMRZCCCEqjMRYCCGEqDC+Eih/FlXM3NycFYtF8/l85T1CCN4PkUjEQqFQeY8Q1cXw8LANDg5aNpt1vjc0NNiOHTussbHR+e4hMa4RpqamzO/3S4yFmEehULBoNOoYOCGqEYnxMiMej9vsbBAVG3IEeSlNhvNssVjBNm8uWT6fdzyGpQScnjbDBAIB53MwGFwyLJsJDR//utf3OectBsMwXoZhvAy3VFiSy+WcsDyPHY5LhWUauDGtQmQyGaeNS4xFtXKlYqxnxjXEwIDfWloCtnLl0ltvb8BOnnSrlYJ1uY3iRyiGix2fvxE2KAosDeDk5BzSNGLpdPZ9YT1xnS+w848nk1kcc6/pDTEyLL8vDDt/u1TnQgghahWJcQ2RSBgE12zNGrPVq82Ghl617u6M89nbeKzcAXPEyxva9rZk0md79rifecw7TgFcGJab5z17x+iV8i/DHzk8bs98/207OzBslEfvHC8sWbiP25kzY/ZHf/QyOg0zzndPjPl5YTpefPFFpwPgffeOi9qEHa50Ou2MhlwpbH+pVMppe0IsV2TVahQatdHRUTt48OD54Y/LQfu3d69Zf7/ZzEx55yWgEXzuuWP2la+8sqghXNcTtNs3Ry0QH7aZwWNWyKbLR5aG8UxOjtuDD/ahI3HxMM1CxsbG7JlnnrGjR486+RW1DTt2nPvAYTvWLdvv+Pi48whmfvtiuGQyaRMTE+fDnT171vn8QURciFpCYlyjUJz4zGElXOV9+/bZ9PT0ZQWLduzECde7fuut8s4loCdy+vRpa24u2EMPbVjUG+1sD9qGtU3WHItacuyMjR49YMOnTsK4woVfBKZv4KWfWlfQbw93xq2jEHcfci/C448/7hjlW265xTo7O+0v/uIvnOeDonbhyEY4HHbaEp+bxWIxZyY065XCy/bBOufKgdnZ2fPPgjlBi595LkdGhFiOSIxrFBquGbi39DLobVyKRCJtTz31EgR2xh55xGz3brOdO8sHF5DN5hDnWXjP/dbU1AQx3GB33LHKMaQLKULdi/mc+UMwsKGIDRw7ZX/2/71ir702Wg5xgaGhaXv7Ry9aBCLfPTVpYaTbx3H3RToQ9MhfeeUVeNCTjiHmsOaePXscb0nULmxD7ED29fWhk9fsfKYg8y/bM71e1j1HeijCbH883tLSYitWrLDW1lY9ohDLFrXsGqa7u9sRKhozbosJJof/nn76Rfud3+myJ5/8qa1aZTBqPLccYB7j49P253/+E/uzP3vX1qxZ43ikjHcpA8hh6VxyztKzk5ZLzdn6HTvsV/+Hh+y22+B6L+CHPxy25184YoNDZ2z83DnL3XqrFWBgS4ukmd7Pb/zGbzhCfPz4cUeUf+u3fssxzqK2YVuiN8z5DGyv/M76Xjiqw/3cGIZheY68YrGckRjXKDRUd955p+3atcsZ4lsKhrvllm32i794yu66a0t57+K0tMTs0Udvty98YYcjfJcyfkNDY/Z33x+wV9/JW3PfBuvevtu6N2yxm7b1WVfX+5eZPPbYBvvlX/+Htv2znzH/LbdYP7yg/+6f7rED74y/zxDTAN90003W29vrDL/Tk9oJV96b6CVqE9YzO4+sU24c0eHzYD4LZp2zfr0Z8zw2MjLitG0vPB+dCLFc0TrjGoGTXF59NWy7d4etre2CN8nq43A1h/A8z/iJJ/IQv4IjpjRu+XwBYeIQ2yYYugvrc3nu/Mlf9D64jxtFfCE0pIlEwvFYs9m8HXp3yFqaYrZj5yrzBy8WSobl8z/GxWd984WUQ5H5XN727T9n27b1IO3uUDTDcnjSywe/0yBzBGB+x4BhvTCidmB9sr15oso6ZDvzBJh/CdsNw7GdcGSH5xG2T7aP+Widsah29NKPZQbFeHAwZKdPcxILh/DKBxZQLJZwPG8f+1jReQZHA7YUNHoM4wp23hHNpUSOzcQzjjSg3AoFV7RDoYs9aIZlvIyL12D8i3nZ7CQwL4yXXCqsB6/P8PPFXdQObBvzTQ7byKXa3OXCSoxFtSMxXmZQjM0omksLlUcgUIIIu8ZsKUPn4YW50rAe1zreKw1LrjScWP5IjEW1IzFeZoyNTcBz5DNgiZAQFyhZLNbwPsMmRLUgMV5mHDuWsLm5MLzCy3vGQtQLLS1J5xWwFGQhqhGJ8TLjyJGUI8ZmEmMhPCjGfX0+ibGoWq5UjLW0qabQELWoPzifr6mpaB0dRYhv3iIRvRJTLD8kxkKIqiUY5I9EHLVDh560l1/+W9uz5+9sdHSwfFSI5YPEWAhRlXDCfDx+1rLZhO3a9Qu2c+ejtnXrx6ytraccQojlg8RYCFGVUIxbW1sc8eWvjBUKHeb3cx36mOnNqKKW4FLM+dtiSIyFEFUJl/KVSjF4xvwt4wPW3Z3CvlmbnEyafjNE1AqcsMUfOuHrfbl1dXWdf9vcfCTGQoiqhYs9stmMDQycsn37XnTe2tbZudURaiFqAb4+mD+6Q0Hm1tHRsehbBrW0qUZwlzbx1ZbqP4n6IRw2C4UoyHy1quctlw8CLW0S1Q5/+tV75a8Hfxp0oSDLsgshqhYuzUwkfJbL8ZnxxUIsxHJCYiyEEEJUGImxEEIIUWEkxkIIIUSFkRgLIYQQFUZiLIQQQlQYibEQQghRYSTGQgghRIWRGAshhBAVRmIshBBCVBiJsRBCCFFhJMZCCCFEhZEYCyGEEBVGYiyEEEJUGImxEEIIUWEkxkIIIUSFkRgLIYQQFUZiLIQQQlQYibEQQghRYSTGQgghRIWRGAshhBAVRmIshBBCVBiJsRA1RHBmwtqe/ZZ1PPVX1vbMNy124OXyESFELSMxFqKG8GXSFpydttSmnZbv6LHw8CmzfK58VAhRq0iMhaglfGbFSNQyqzdZrrvPfMWiswkhahuJsahuSiVrfu0ZKJAEx8OfSVr05CGLDBwxXy5jpWCofEQIUatIjEVVExk8Zi2v/tgiwyfLe+qbQqzVGaIOzM1Yvr3bZu5/DHexbmMhah3dxaKqadr7vE18+h9b88tPl/fUJxTftueesObXn7XU1tstecs9lr7pFst3riyHEELUMr4SKH8WVcyRIymbm4vgU/30n3yZlK36yr+wNDzBxv17bOh3/9SK0Vj5aO3BO42j7fk8PNyC+5dbJmOWSpml0xf+ese4hdJxu/vE39i9P/4Dy/asseFf/9cW/+jPlWOtb1paktbX57NYrKG8R4jqIplM4j7GjTyPWCxmgUCg/M1FYlwj1KMYx/b9zFGtzOZdFjn+jgWScZvlsOwNhOJJ4fQ23lPZrCuauMecjeKZy10QTy+cJ7LzN+/RN+863oscYfb53L/BoFk0ahZBNTdAW7jxs+Wy1vLm8/Yrz/6aRW9aYwO/91VLb9juRlTnSIxFtSMxXmbUmxiHRoas0NphpUDQSqGw+fI5ZytGG8shFoet2RNOT0gplJ5wJhKuKFIovXDe5omnF5afeQ8xTm4UTG+jgPJeonh6wtmIpFE8ud8TWm5eOG4M44XjMcK4vL/zNx5nuo4cLtlLP0zYL+16z7ZuLlry5judchESY1H9SIyXGfUkxq3Pf9vW/Mlv27Ev/it7c8c/sngq5HifFCYKrCeybN8UV2+jgFJQvRbtCdp8caMI4j5wBJF/KaKh0MVh54ssw3jhvOMeXrzzN2+/x/x9C7fLwXz295v9/d+b3Xab2cfvK1gQaSstuInrGYmxqHYkxsuMehFjfyphN/2TBy129G2bblplv/3A65Zr77GmJnM2CuNC8eRG8fSE0wvHYd+FeOG5ed/n//VYGGbh8esN78rRUbPHHzdbt87s059ePD/1jsRYVDsS42VGvYhx/6mSvfT/HrD/feCf2szv/rHNbr/XSv7ARcK4GAuP32jxvNbMzJh9/esUG7MvftHtgIj3IzEW1c6VivHytuyipjh3zuxvvuGzNY/dYqf/+meWvO0+C0YCjhDRK+TG9rvYRi95vqdcy/BZ9ZNPuvn43OckxELUAxJjURXQE/zGN8y2bTP76Ed9FopCYWtdVa8CztT+0Y/Mzp41+5VfcZ9tCyGWPxJjUXE4Oevv/s6so8Ps4YfdyVL1CGd9v/KK2cGDZl/6kllbW/mAEGLZIzEWFYWPUr73PVeIOEmJk6/qEc4OP3TI7LnnzH7pl8z6+soHhBB1gcRYVAwK8dNPu8+KP/tZs87OuhyZdpYwnTzpPif+zGfMtm4tHxBC1A0SY1ERKMSvvmp24oTZI4+Y9fTUpxBzLQOfD3/rW2Yf+YjZnXeWDwgh6gqJsbjhcEj23XfN9u41+/jHzTZscGdE1yOTk+5a4i1bzD71qfrskAghJMbiBuO9VeqnPzW76y539nS9Lt2Jx12PmBO1ODzNpVlCiPpEt7+4YXBIdnjY7Cc/cZ+L8hWPfHNWPcLXd373u+4owS//slk4XD4ghKhLJMbihjE2ZvbCC2bd3a5XXK8zp/lSj+efd8uDM6e1llgIITEWN4TpaVeI+Wz4vvvM2tvLB+oMvtTjtdfcZUyf/7zbMRFCCImxuO7MzrrPiPlyj/vvr18B4gzyAwfM3njDXVO9Zk35gBCi7pEYi+sKf9aQs6bHx83uucd9mUW9riU+csQdHWCH5OabNXNaCHEBibG4bvC3hekJDgy462fXr6/PJUycuHbqlPt2rVtucZ+Xa+a0EGI+MgniusDXWx4+bPbee2bbt7vraOt1CRNnkP/4x+7vEj/4oH6XWAjxfiTG4prD5Tp8veP+/e4LPXbsqN8lTKOj7lIu/gjGQw9pCZMQYnEkxuKawmejg4Nmb73lTtS69db6XcI0NeU+I+aQ9Cc+Ub/lIIS4PBJjcU3hjz5wtjDXzvLZaL0uYeLbtfbscV/uQSGu1x/BEEJcGRJjcc3gjGnOnCacsNXV5X6uN7iEi2uJ+az4gQfMentd71gIIZZCJkJcE2ZmzN58013KdMcd9buEiRPX3n7b7Phxs49+1Gzt2vr9EQwhxJUjMRYfGg7FcrLWxIS7dIcCVI+eIJ+X89eouJyL5cD3b9frDHIhxAdDYiw+FFxLTAHiWmL+AtPmzfUrQFzKxefl9f4jGEKID47EWFw1HJLlW6WOHTPbuNEV43pdusOXerz6qtnq1e4wvX78QQjxQZAYi6uCa4kpQPSKOUFp1676FaCzZ81eftldS7x7t1lzc/mAEEJcIRJj8YHh6x2Hhsz27XN/GJ9Dsi0t5YN1Bp+TcwkTRwQoxBRkLWESQnxQJMbiAzMy4r7Ug8+GOSRLAapH5uZcj5hLmbimeuVK3FC6o4QQV4FMh/hA0BPkEib+HCAFqF5/DjGVcp8RT066HRI+K9YSJiHE1SIxFlcM3yrFJUxcU3z77e5a4nr0BNkR4cgAZ5BzCdOmTVrCJIT4cEiMxRVBT/Cdd9xnxXzfNH+BqB49Qa4l5jpiLmPir1FxGVMkUj4ohBBXicRYXJZs1v0pRC5hogDV81piLuXiG7a4lGvnTi1hEkJcGyTG4pLQE+QSpoMH3eFY/hxivXqCLIfXXzdbtcqdQa5fYRJCXCskxmJJuITp9GlXgHp63OfEDQ3lg3UGf42KE7a4hIvlwCVdWsIkhLhWSIzFkswXoHvuMYvFygfqDM6Y/tnP3GfkXEvMX6OSEAshriUSY7Eo/DlE/gwgRee+++r3pR78EQx2SDiBjUuY+LYxLWESQlxrJMbifXAJEycpTU2Z3X9//b7UgxPXOETP111yaHr9egmxEOL6IDEWF8HfI6YQc7LSQw+5b5WqxyFZTlzj6z45g5xribdsMQsGyweFEOIaIzEW5/GWMPHHHx54wGzNGjSQOm0hXEvMTglnj1OM6/XXqIQQNwaJsXDgrzCdPOkOy/I1lzfdVL9DskePmu3da7Zhgzs8rZd6CCGuNxJj4SxhGh42e+EFV4Q5UalehZjl8Mor7nPyu+/WSz2EEDcGibGw0VGzp592f+yAz4nrVYj5IxhcwsQhaQ7Tt7aWDwghxHVGYlznTE+b/eQn7hriRx6pXyGenTV76SV3AtvHP661xEKIG4vEuI7hGtqf/tSc3+X97Gfr933T/D1iPivn7zR/7GPur1EJIcSNRGJcp/AlFhSgEyfMPve5+n3PMn8OkUuY+CtMfLsWn5kLIcSNRmJcJ/igOr5sxny5rOVTOWcJE2cMf/7zZt3d5UB1BmeQ82ch+dvEd97pTlzT0LQQohJIjOsAXz5nbc99y1b9x9+xnv/6xxb61tedGcM///PuWuJ6hC/14BImjg7QG6ZXLCEWQlQKiXGdUPIHLNO73hJd68wfCTnvm+bv8dYDXLpF8aUnzGHpTCZnJ07M2Wuv5Z13TbMs9HYtIUQlkRjXC36/zay4yY7kNljXzCnnrVLViieeFM5czn0zGLdMxp1sxY3PvDnzmZPQ+C5tzoaemXE3zhDne7X5a0tjY2ZDQ2bHj7tvFnv77ZJ9//tv21e/+ieI7x1nCVO9/iykEKJ68JVA+bOoYo4cSdncHF8FdRX9J6ha5MUfWWFoxBKhVlsdOGNjX/zN8sEPD1uQJ6De50ttS4Uj9F4pup7wekLsebXeX9fDXTzc/I3X4vAzN84Wj0TyNjHxAwj1n9vnPvdr9uCDv+BeuEw+n0M8aYT3WTgctUBALnM109KStL4+n8Vi6lGJ6iQJryFPgzWPWCwG23LxOlKJcY1wtWLsT85ZYXLG3jjUaJsazlrf+rBlVq6zYiB0kSguJpDevoXHFp7nCSGFkZ6sty0UT4aZ7+kuDOMJqCeeHDrmqyi9jS/j4EZRnb95x/g3Gn1/OMbDv957tim4OVw8ghP8/gs3RC6XseHhfjt9+qgjwps377KentXlo6IakRiLakdivMy4GjH2J+LW/tTXLfPDZ+1P+v5vu/9L650lTIsJovfXE0V+n39s/vf5AksxJhRPti1PCD0xpEDy73xx5Gfu947x7/zj3najX0By6tR7duZMvyPCyWQcQu23tWu3OF6yqE4kxqLakRgvM65GjBsOv2lbvvwIWkPCfnTnv7THb/r9814tvURunvB5Yjj/r7dd6X62rVrWrQMHXnFEePfuT6DjgZ6HldBRaJAYVzESY1HtSIyXGVcjxr500lZ/5bct0n/Y3vuf/oNN9u26SEi5SWcuMDh43M6dO23d3X02OztpjY0ttmHDNtw0em5crUiMRbUjMV5mXO0zY186ZeHRQcus3VLeI5aiVCrawMBRO3nyEDoqEdu0aQcM/fryUVGNSIxFtSMxXmZcrRgLsZyRGItq50rFWJZdCCGEqDASYyGEEKLCSIyFEEKICiMxFkIIISqMxFgIIYSoMBJjIYQQosJIjIUQQogKIzEWQgghKozEWAghhKgwEmMhhBCiwkiMhRBCiAojMRZCCCEqjMRYCCGEqDASYyGEEKLCSIyFEEKICiMxFkIIISqMxFgIIYSoMBJjIYQQosJIjIUQQogKIzEWQgghKozEWAghhKgwEmMhhBCiwkiMhRBCiAojMRZCCCEqjMRYCCGEqDASYyGEEKLCSIyFEEKICiMxFkIIISqMxFgIIYSoMBJjIYQQosJIjIUQQogKIzEWQgghKoyvBMqfRRVz9GjS4vEwPqn/JIRHa2vKenv9Fos1lPcIUV0kk0nLZDLO32AwaJFIxJqbmy0QCJRDuEiMa4T+/hlUJoXY5+4QYpkz3zL5lmj2sVjBVqyIWENDtLxHiOqCIjw8PGxPPfWUrVq1yu69917r6emRGAshhBA3CopxPp+3c+fOWXt7u+MZx2IxibEQQghxo0in01YoFMrfXKLRqMRYCCGEqDY0G0gIIYSoMBJjIYQQoqKY/f8p7rLT5EJfBAAAAABJRU5ErkJggg==[/img][br][list][*]Después, habría que medir los lados del rombo. Para ello seleccionaríamos el quinto icono y la opción “distancia y longitud”. Para averiguar la longitud de cada lado, una vez seleccionada la herramienta tenemos que pinchar en los dos vértices que une cada lado (primero el A con el B, luego el B con el C…). Al hacer esto la respuesta la daría automáticamente y esta sería el recuadro blanco que aparecería en cada lado con la distancia de cada uno de ellos. [img]data:image/png;base64,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[/img][/*][/list][i][br]Ahora mueve uno de los vértices del rombo. ¿Qué observas? ¿Se está produciendo algún cambio en relación a la medida de sus lados? [/i][br]Para mover los vértices tendríamos que seleccionar la herramienta de la flecha nuevamente. Al mover cualquiera de los vértices observaríamos que la distancia entre ellos no varía. [/size]
[size=85][b]Pregunta 2: [/b][br][i]Ahora, selecciona la herramienta de “segmento” y construye las diagonales del rombo. ¿Cuántas diagonales tiene? ¿Sabes cómo se llaman? [/i][br]Tras leer el enunciado, tendremos que seleccionar la herramienta segmento, el tercer icono y tocar los puntos que queremos unir, en este caso A y C, B y D. Así obtendríamos dos diagonales, la diagonal mayor y la diagonal menor, las cuales son perpendiculares (siendo ese su nombre) y son bisectrices de sus ángulos, es decir, cortan los ángulos a la mitad. 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[/img][br][i]A continuación, mide la distancia de estas y comenta que es lo que observas. ¿Miden lo mismo la una que la otra? [/i][br]Para esta pregunta tendremos que volver a seleccionar el icono de “distancia y longitud” y pinchar en los dos vértices que delimitan las diagonales para conocer la longitud de cada una de ellas, al igual que hicimos con los lados anteriormente. 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[/img][br]Tras ello observamos que cada una tiene una longitud distinta y que una tiene mayor longitud que la otra. [br][br][i]Por último, mueve un vértice del rombo y observa que ocurre con las diagonales. ¿Ves alguna diferencia entre ellas? Además, a pesar de mover uno de los vértices del rombo, que les ocurre a sus diagonales, ¿de qué manera se cruzan? ¿siempre es así? [/i][br]Al mover un vértice del rombo (con la herramienta de la flecha) comprobarían como a medida que la forma del rombo cambia también lo hacen sus diagonales. Se comprobará que las diagonales nunca medirán igual, si no que una siempre será más larga que la otra (siempre habrá una diagonal mayor y otra menor, con lo cual la diferencia es su longitud, que nunca coincide). Debido a que siempre se cruzan entre ellas siempre son perpendiculares. [/size]
[size=85][b]Pregunta 3: [/b][br][i]Ayudándote de la herramienta “ángulo”, calcula los ángulos internos de A, B, C y D. Para ello, para conseguir el ángulo de A se debe dar a la herramienta ángulo y seleccionar los vértices B, A y D. Así sucesivamente. ¿Cuánto miden estes ángulos? ¿qué observas tras esta medición? ¿coinciden unos con otros?”. [/i][br]Para resolver la siguiente cuestión tenemos que seleccionar la herramienta de ángulos situada en el quinto icono. Para crear un ángulo, por ejemplo, el ángulo A debemos seleccionar los vértices B, A y D; para el ángulo B seleccionamos C, B y A; para el C seleccionamos D, C y B y por último para el D seleccionamos A, D y C. [br]Al hacer esto podremos observar cuánto miden los ángulos, comprobando que miden igual dos a dos, y que dos de ellos son obtusos (los que miden 133.8º) y los otros son ángulos agudos (los que miden 46,2º). [br] 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[/img][/size][br]