1. Comencemos a utilizar Geogebra para representar algunos elementos simples en el plano cartesiano. Debajo de las consignas, tenés el plano cartesiano para poder ir resolviendo cada inciso.[br][br]a) Emplea el comando puntos [img]data:image/png;base64,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[/img] y representa los siguientes en el plano:[br][list][*] A (2; 1)[/*][*] B (-3; 3)[/*][*] C (5; -2)[/*][*] D (-1; -4)[/*][/list][br]b) Traza las siguientes rectas utilizando el comando de rectas [img]data:image/png;base64,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[/img]:[br][br][list][*]Una recta que pase por A y por B[/*][*]Una recta que pase por C y por D[/*][/list][br][br]c) Observa el registro que ha realizado automáticamente Geogebra en el lateral izquierdo. Verás las coordenadas de los puntos que has ingresado, puedes corroborar si lo has hecho bien. En el caso de las rectas puedes observar sus fórmulas.[br][br][br][center][img]data:image/png;base64,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[/img][/center][br]d) Explora qué ocurre si seleccionas el primer botón de la izquierda [img]data:image/png;base64,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[/img]. [br]Mueve los puntos, ¿qué ocurre con sus coordenadas? ¿qué ocurre con las fórmulas de las rectas?[br][br]e) Explora las posibilidades de estilo que ofrece Geogebra. Para ello utiliza el botón derecho del mouse sobre cada objeto y elige la opción [b]Propiedades[/b]. Dentro de este menú verás varias opciones. [br][br][center][/center][center][img]data:image/png;base64,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[/img][/center][br][br]Realiza las siguientes pruebas:[br] El punto A debe verse de color rojo.[br] El punto C debe verse de color violeta.[br] El punto D debe verse como una cruz y no como un círculo.[br] El punto B debe tener un tamaño de 9 puntos.[br] La recta que pasa por C y D debe ser naranja.[br] [br]

Resolvé el ejercicio 1 en este espacio

2. Geogebra nos permite graficar funciones. Resuelve las siguientes actividades en el plano cartesiano que se encuentra al final de las consignas.[br][br]a) En la Barra de Entrada que se encuentra a la izquierda, ingresa las siguientes funciones:[br][br][img]data:image/png;base64,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[/img][br][br][br][list][*]f(x) = x + 3[/*][*]g(x) = x - 5[/*][*]h(x) = - 3x + 2[/*][*]p(x) = -x - 3[/*][/list][br]b) Explora... ¿puedes mover las rectas utilizando el cursor [img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAC4AAAA0CAYAAAD19ArKAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAMsSURBVGhD7ZnPS2pBFMe/aU9a5aZFtKmNIBEShUFRFNl/IAb9WgQVFGIRLSqwVbuklQRBmGAuKgqCfrgIN2E/3FXQD2jhSmjRXnrpe51x5iXv1kZnbhp+QLxzjng/Hs6dO9ep+PMOShADfy85Km5vb0uy4hWpVKrcKnpSFtebsrjefDmrxOMGnJ0ZkUgY8PbGgzpTWQk0NGTQ1ZVGW1uGR7N8Kr63V4nTUyMfFQd9fWk4nR8V1IhTpTc3f7Hj4WGgowOoqmJD3UmlgPNzYGsrOx4d/f2v8poep/YgSLq39/ukCTo3OZALIdwIjTj1NEGVLhaEi3AjNOLiQvzOSv+PcMmdJDTipUJZXG+kia+vr+Pu7o6P1CNNfGVlBZOTk7i8vOQRtUgTN5vNWFpagsfjweHhIY+qQ4o4PW/Ty+FwYGNjA2trawgGgzyrBinimUwGBkP2q2w2G5OPRqPw+XwspgIp4ul0Gkbjx+24rq6OySeTSczPz/OoXJSIEyaTCaurq6iursb4+DheXl54Rg7KxAWLi4uw2+0YGxvD4+MjjxaO9B7/jImJifcV3jCTj8ViPFoYyisucDqdWF5extzcHA4ODng0f3QTpx6vra3F1NQU+wFer5dn8kO5+MXFxftzYwP6+/vZDerq6go9PT1obm7mn8gPaT2eK/7w8IDj42N2XFNTw8QjkQi2t7fh9/vZ8oBapxCkVVxcnE9PT5iensbCwgLu7+9hsVjQ2dmJcDjM8rKQ2iqJRAIzMzNs9pidnUUoFGL5wcHB4hV/fX1l0kNDQ3C5XBgZGUE8HmdVb2xsREtLi1R5KeLPz8+4ublhfTswMMBi1DokL6pOP6joxNvb29nFR6K55FadFl9WqxU7Ozs8WxhSxImmpiZ+9IHKqksT/4rcqre2tqK+vh77+/s8mz/KxXOrfnJywhZatNwtFOXiBIlfX18jEAiw1aLb7eaZ/NFFnKp+dHSE3d1ddHd382hh6CKugrK43mjEafuCoD/ViwXhItwIjTjtuRC0E1AsCBfhRmjEaaOIoO2LaPR7K0/nJgexlSLciJ+zeSUoye3CUqA8j+sL8BeT5lw0J7yi9gAAAABJRU5ErkJggg==[/img]? ¿Por qué?

Resolvé el ejercicio 2 en este espacio