[list][*]Escribimos en la barra de entrada:[list][*]vh=1[/*][*]vv=1[/*][/list][list][*]Creamos dos deslizadores h y v con valores entre 0 y 1 e incremento 0.001. En la opción velocidad escribimos vh para el deslizador h y vv para el deslizador v.[/*][*]Escribimos en la barra de entrada: s=false[/*][/list][/*][*]En la vista gráfica 2 añadimos un botón:[list][*]Nombre: cmdLimpiar[/*][*]Título: “Limpiar”[/*][*]Guión (script) :[list][*]VistaActiva(1)[/*][*]ZoomAleja(1)[/*][/list][/*][*]Creamos un botón para animar los deslizadores r y v:[list][*]Nombre: cmdAnima[/*][*]Titulo: Animar[/*][*]Guión (script)[list][*]Valor(s, Si(s, false, true))[/*][*]Rótulo(cmdAnima, Si(s, "Parar", "Animar"))[/*][*]IniciaAnimación[r,s][/*][*]IniciaAnimación[v,s][/*][/list][/*][/list][/*][*]Crean¡mos un botón para reiniciar la construcción:[list][*]ZoomAleja(1)[/*][*]VistaActiva(1)[/*][*]valor(r,0)[/*][*]valor(v,0)[/*][/list][/*][*]Creamos dos casillas de entrada para introducir los valores de vh y vv.[/*][/list][/*][*]En la vista gráfica 1:[list][*]Escribimos en la barra de entrada: A=(r,v).[/*][/list][/*][*]En la pestaña básico activamos el rastro.[/*][*]En la pestaña Estilo agrandamos el tamaño del punto hasta su valor máximo.[/*][*]En la ventana de las propiedades del punto A elegimos la pestaña avanzado.[list][*]Rojo: h[/*][*]Verde: v[/*][*]Azul: 0[br][/*][/list][/*][/list]
Observa la siguiente imagen:[br][br][img 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[/img][br][img]blob:https://www.geogebra.org/7ff8b44e-7166-45b5-a52a-45590fbc5e68[/img][center]¿Qué valores de r y v tiene?[/center]