[*][/*][*][b][center]Ecuaciones lineales[/center][/b][/*][*][/*][left][/left][b]Objetivo de aprendizaje:[/b][br]Desarrollar la capacidad de resolver ecuaciones lineales en una variable de manera precisa y eficiente. Utilizar GeoGebra como herramienta para resolver, verificar y reforzar el aprendizaje de ecuaciones lineales. Aplicar las ecuaciones lineales para modelar y resolver problemas de la vida real.[br][br][br][b]Ecuación[/b]: Una ecuación en matemática es una igualdad establecida entre dos expresiones, las cuales deben ser iguales en ambos lados. Por ejemplo. 8 + 6= 14. Una ecuación es una igualdad algebraica en la cual aparecen letras (incógnitas) con valor desconocido. por ejemplo. 2x + 2 = 6.[br][br]Las ecuaciones sirven para resolver diferentes problemas matemáticos, geométricos, químicos, físicos o de cualquier otro índole, que tienen aplicaciones tanto en la vida cotidiana como en la investigación y desarrollo de proyectos científicos. Las ecuaciones pueden tener una o más incógnitas, y también puede darse el caso de que no tengan solución o de que sea posible más de una solución. Se considera que la x es la “incógnita” de la ecuación, por lo que el objetivo es determinar el valor de x hace que la ecuación sea cierta. [br][br]Los valores de la incógnita que hacen que la ecuación sea verdadera se llaman soluciones o raíces de la ecuación, y el proceso para determinar las soluciones se llama resolución de una ecuación. Ejemplo. X = 2 en la ecuación dada 4x + 9 = 17. [br][br]Solución de la ecuación: ya que al sustituir 2 en x se cumple que: x = 2 4 (2) + 9 = 17 17 = 17 lo cual confirma la igualdad. Ecuaciones Lineales Las ecuaciones lineales son expresiones algebraicas elevadas a la potencia 1, es decir, no hay exponentes ni raíces cuadradas de las variables. Ejemplos. 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woC1Z/IP8M7t9jjRa/sGemBrfAMI5eXzMK6W7oXlMcQzxH5aWOiZ+AZm3MRuchr6HhS5c+X7W4Rlk4IEFpycZkJhfHPk4IKKzshvejF1LVb6E44haH9x2DbeRDWGDILUyAHmYWBoMbQenkuqAnnCxwp/ROiyt/AtopfYN/9jzHi7mP3VNXD5ndEKnLeMlXWhss5wHMWq/pELoqruGGb+BbOwRi4h3bCPbRrRtgL1/ABeEdigYH98Izshm1kD9yD+yDNirsL7sEo2EbPQlForY2v1/CSrQ65tOq6VRXRV5sRkdKEjWmP8adTleiaFOnYxlbNUT2jV5wFIqK2Q4P1lgFL09rvpQbenn6yCSwmB1Ep2fACtqIzbLcFbX+yVheJtcuFyeXue6qPXPa8VLg66llp2H1GLq4tixdkcYSYXJz3VDw6Uv/P4KM52BisZdUYOfE1OnclYeDYWdjqmuFoeQxj3EFmFo4lnNTnXJqAWFMHyIkLgsCVoHYgD1sevIHtle8ituRtFAvvoUImAnFFAcgIk9meQ20xcTb4kzRyCWVXvPBJTyE7myA7m+cIT+GVGiEZUiEP7IZ74hi80kN4nW2QnS1zxG+C7OoAVD5y8bdnxRrMgm3JCsPO6slbmFzF3OuLkYvNHYRaxee34N2UZmxIa8cXaZXonRLp2JqQ1mktQq4Fy7gS6JrvPy7yDG2nis8yDtut85BuZELKT8d0eR4Ur4sl141DPXt/9+HobIa9IBXeotNw5GdCGngmqKQ9WFsTW6QgS0BoycWK5WPbAvkvwNbehdFzVzGy8zD6I/dg/MwF2Ns6oEp8r6C1ZwDjsYfhjE7AxIHjkMf5ijknlb/KgSJi18RD7vZexLbbbyCq7NeIrvglYks+QfekcPsrPpYRJ+TLblqdD15Ixsvw9kezRWS2tzDkIPJRLbSNu9XYkN6G36bWoHUucgkl5Sn4z4MFj/FuSiszDf9+phoGp2YW0h8hVTHvmA9kCcgeGV7JB9nj5YHOVxi8koflsZyXFrUiKl4bbPdzIRWmw3UjHZa7V+BzmFlNaDLA5tjCaca2MItNy7bWGtgKkyHdyIL9RjbcU6O6bgU9J+jXyhBicgUOLQospWWY2HEA1s17YNifDFsLbazUZly8OpbuFxjbeQQOIlf8bHLxyJxWugDEodvSgOhbG/F1QyQOVv4N28veQ1TpGmRUfQW3oi0cUx58/X2BPnlF4MWgHRqXBLnOQoV/r18oodWdyMU27qY/xW9PVaN1rve5GLnoD+/DaffczuuPsTalGWtPNiPu2hN4tI5Gs92ZnIKzmQmXw4Nvz95CalIJMo9XIPNEGTKTS3k4cW9ZIev4A6QevofL35TDx/pZKsP8loUOvZge2BvusPmWXJgO863zkE2jLBfOVT9dmDhYQoW9+yXlpkDOz4Ct9Ap7RSUwLj8J0LWXQGjJJdqTDs6eTozGkIt9H4wx++CubuRRqDfx8RGIgr3jOcbiDsM+g1ys19XJJSoboAcu3xROVPwZu+9twLQ8hKrBQmy79T6iq9YgsvSXuNOTKQpFvb7ETKQlNN2ywMXvnkEuWucKPbSmrhucYtuftF3x849cJC9eY4tXxj+/a8batDZ8cLwWVxsGRDyucEsll9PiwcFdF7H9H5cQ+69CxH6Zi9gvv0fsl1cR++X1ZYWYf+dg6/9ewNH4a/C6tIZdQguJ0Yg0yNXbBHfOGbaVaZpc8kPdXG/EPJ+P3H7PtCK7YH1wHWpOBjw5qbA9ui+Ipb05oP2Z9YbgihBacgnxUMVMN25jeuteTO9MxGB8MrzjNInnNfbqLzISuXoxuvMQI5fhwAnIYxq5qLHF55u10S5go3x+Vxo25/0CNYM5/LmKDWfqorGpbA0iK95E3N216LO0snu064N6Mz4HCR1+SHJp8qqn7U8nKhm5fpNWq7/m7/9alEYuviWM0Ge047fpDXgvtR1/yazGmJVmoUwwOrn8ijU/yBxsrG1HVVkbaso7UPOwAzXlnagp6+LHZYTqsk5UPmhHU31nwPYnUfCFENAHyJYxWIovw1uQCXt+KpxPabcFt4e51jDB6OSieZq9OBvIy4Q1LxOuIb6vMIjWLK7obF4SISUXFYnPpFRMXi2EfesBSFGHMBV3Ap6hMa4gtIAslIFg6XuO4biDcEUlwLjvOHyjgSOXeNFRczDwi3g8WYYtxR+wTbs+H30xnec1aG3HztLPsL3sHWy59yayarbApfAdH0zRXl5eQeDZ/f+Q66OMZ8yt/mSc70JRxXID/8GDlub6o0Gsp029SVW4XPdCXBXv2wnpsZQLyUePFHpQ2f15L/KggHqRuW9+VA5H/hl481NhLcsBJKeYq2suDO6ZJLi7m+HMz4CUnwEzjWASf93EP8ot/OjlIqTk0ghAB0PpPVg274UrLhGm7fthunkvMIoO88M6TEQnwkXrXHGH4OjhrnQdmlNDVNro6sLB+18gsmQdus0N7BrRzyuW+e/3nMf2kl8hrjwCkbffRHH3GZ6Q3Q6h5PTcfhhyaR0I3xVfjfWZnVh3sh732vlmaFYarXoB+jkl+fD3bx4jIvE+9uU0w8YWj8Vr8iIeH7sW02tuPCmMxJrFzlV4ZUHlpKLXTpgX10+ChaCZcJoSecxDsBadB+jV/fwzkAYDOw/6nyLKUGUfbOUFcBdkYLogDdLzloA8A07mrf/yEXJyqTLvMZy9vRiJPQx7bCKscXsxtisRlvsP4bEY4XNa4O0dgOFKIYZ2HYEt9iCcsYmYik3EePZFuPueY7K+AfbnmqA4zK4BnKncgk3F/4UrTw/rkqBRycsc7iRSCWl1XyG69APElL+JXbcj8GiwKCgfrhyc5vylupVJlA+kXngnL0Hu3wXPWDZUxR60wy1kEDZtff8kPj9RhvWZbYhIa8am7DJ0TQY6NfwKaldUJN1sw9sJ9xFzsQEGB18HEkagjqWVVJPXzJpp1FxumKnVuidsAXBqsRLoqxceONoaYMvJgjfvFKYf5kF18w6OP4WT1tnXCmdeBhx5qbDU3wK87sUf95IIKbmorLwP4mtKYznFmNi8H1JUAlzRh2DafgjGgydhSDqFF1EJ6E/5Bq6WdkwkpcJCuzTiDsEWlQjD1nh0RidguqEJ014TOs1VeDB4EUkP/4bIu29jS9mbyGyIQqexEg7vpGCLDw7ZjL7pR0hp+ie23n8LkdVvILL8Ley8/Sny2lLRZiiHwf0cMr2SwARLpaV3u1YmZdZ4igce49eQhrbAY0gBFLN/chwisJ5eLJDW9k9gQ2IRPkh5gnUZvYhIacUXZxtxufEFW7syudwYcXpR0WPCtovNWLf/JvtKr9FFpaLPOZOjWij3awdBQmHi801xtJ7pZC9B2nIzYc/NhK2mBLLNxHbQK143pL6nsBSdhzUnDZaH+VBc02I8W105hJRcVFTureGqpbidGMm5gcHoI5jaGo/pbfEwb9qL8Z3HYLxTBp+b27zmyjr070iEY1M8prbFw3D2Ajw9NGp5kNeYgZicCGwtfgvbSt9BzP33sOtOBKJvv4sduR+grP0yy4OeeK8nFzsK3kFcybvYeTcC0fciEHNvHaJLIxBV/B6icyJwvjwebrFbnpd45eTibS3DabyO6aEE2A3fAYo1pMTiIFOMr4ibXB5cqX2BLRda8PvkCqw7Xoe3jjbiV4kV2Hi8Cn9IrWNzsg+PlOMf39Si5NmYsKD4O038IzWrq1SrDiFgCQrcbGu2DNUnwdb5mH1d13Q9FaaibFjLrsN09zKM1zNgupENS/MDqC7ePvQ5CPr8w2oipOQK7Fj8njmFeQSN+Tcxdf4yLEVlkIaF55Cl4aaG9fEzGC/mw15TC1l1iS9dqBi3PUe3qR7d1iZ025rRa2nEi+kn6LY8Rqe5HlNOmqPxiZ7BOY5Ocy16Lc3om36CPstTduy1NKHXUofO6So8t7ZApn+IR59E83nDisDqq0LxjkH29MEnjeiL2yEHZSv73aU2n4qOcRNut7zA1w+6cbS4E/sKnuHwjXZcquxAy8AkHNqnw+iLJCrfMck9aKtUxlUGiZuVnE7El7/ocxBiWze3nBwGuHub4W4og7PyFuz1t+B8VgN5ijprtrwsLFPhjV6FrlBDaMklykzE4P889uyya1NXrtTa1NYPpkMUhyIFej4WAM9jGQpDowBNosVknn/5cBnpBfzzD38NWLsHxAkFRJ8lnHsB6xEzoC2D+OF/zYaXldRwZXV9FaDLQfuheYCFgyWwVn718ctKl88c8VcDISUXFVZ7nYR1DnRRVCTwczDc38OHOO0eW3LRKswYRt4kOtXmCnSDcnD7XyMRGfqVjkw8UiCNwnQM8ERRPEon1nb0Mq6QEoHdAz/yZy8/p8WhVVdXCFFkWiIKWiYSfOLfL+S7UlgXwDoU4cpdjQL+UBAmvJ9g4ppGNKFHNJ+icY3Ga+1lW56Ut5WmGauJkJKLV443p15RXQmF0s9gHt/iKz5fKYRFSkSfR9O/fagZiSxbSkhrW/5PXmpXdeVj2uUvBi8KxSVhax4zii/GHlHk5YMSBSgsK6uu/qEDyzZogUfvOOjjLsylLYTKP/aia1JQFiuq4qsEVk2uE4EdDf/FO2veprSK7OOvOLFrYge3rpqi3WfIKNQILbkWxNzNyyo569pcMQPB784VZ65rfiye8+uDH1Ndfpz4AckVRhg/LYTJFUYYq4QwucIIY5UQJlcYYawS/g916edhP0aZjwAAAABJRU5ErkJggg==[/img][br]Donde a y b son números reales y x es la variable. Fórmula general de una ecuación lineal. 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[/img][br][br][br]

[b]INSTRUCCIONES:[/b][br][br][list][*]Encuentra el valor que contiene dentro del jarrón.[/*][*]Comprueba tu resultado.[/*][/list][br]En esta actividad, los estudiantes deberán averiguar cuánto dinero guarda el jarrón resolviendo la incógnita. ¿Quién se anima a descubrirlo primero?