[b] [color=#980000] Deslizadores[/color][/b][br][br]Creamos el deslizador “[b]pasos[/b]” como un número entero entre 5 y 30 para poder determinar más tarde la cantidad de pasos que necesitaremos para nuestra construcciónUn segundo deslizador[b] t entre 0 y pasos+1[/b] que será el número que incrementa y del que obtendremos la secuencia de números entre 0 y 1[br][br]Dos listas. La primera contiene los números entre 0 y 1[b][br]sl=Secuencia(Máximo(0, Mínimo(1, t - s)), s, 1, pasos)[/b][br][br]La segunda lista contiene 50 números que marcará las velocidades en cada tramo, en principio los podemos hacer todos 1 aunque ponemos unos marcadores cada 10 para controlarlos. [b][br]vl={1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1.1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 2.1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 3.1}[/b][br][br]Volvemos al deslizador t y en Propiedades/Deslizador/Velocidad colocamos esta fórmula [b]vl(floor(t + 1))[/b] para que cuando t esté entre n y n+1 el deslizador tome la velocidad marcada en vl(n+1). en Repite seleccionamos [b]Incrementando (una sola vez)[/b][br][br]Conforme avancemos en el proceso iremos colocando los números adecuados en cada paso para que acelere o se ralentice la animación.[b][br][br] [color=#980000] Colocamos la imagen en la Vista gráfica[/color][br][br][/b]Tomamos dos puntos [b]A1[/b] y [b]A2=A1+(6,0)[/b] que serán la base de rectángulo[br][br]Descarga la imagen [color=#0000ff][url=http://jmora7.com/1/imag1.jpg]aquí[/url][/color][br][br]Colocamos la imagen[b] imag1 [/b]de forma que la posición de los dos puntos de la base sean A1 y A2.[br]Nos interesa colocar un punto en el vértice superior izquierdo, hay que hacer algunos cálculos. Miramos las propiedades del archivo imag1. En Detalles vemos que las dimensiones son 396x492. Esto quiere decir que tenemos que multiplicar la base (6) por  492 y dividir por 396[br][br][img]data:image/png;base64,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[/img][br][br]Calculamos    [b]h = 6 * 492 / 396[/b]  y hacemos [b]A3=A1+(0,h)[/b][br][br]Vamos a poner tres imágenes [b]imagen1[/b], [b]imagen2[/b] e[b] imagen3 [/b]de forma que las tres tengan la Posición con Esquina 1 en A1, Esquina 2 en A2 y Esquina4 en A3. En color ponemos la opacidad en 50% para las tres y desactiva las dos últimas para que por ahora solo se vea por ahora [b]imagen1[/b].[br][br]Descarga el archivo Hueso2.ggb [color=#0000ff][url=http://jmora7.com/1/Hueso2.ggb]aquí[/url][/color]