[size=150]La trayectoria del transbordador espacial durante los primeros 5 minutos del lanzamiento del STS-30 se puede representar mediante una ecuación para su altitud:[br][br][center][img]data:image/png;base64,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[/img][/center]y una ecuación para su distancia de alcance hacia el este:[br][br][center][img]data:image/png;base64,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[/img][/center]donde las distancias se proporcionan en unidades de pies, comúnmente utilizadas por los ingenieros de la NASA para describir trayectorias cerca de la Tierra. Los siguientes problemas usarán estas [i][color=#0b5394][b]ecuaciones paramétricas de movimiento[/b][/color][/i] para determinar el tiempo en que se alcanza la aceleración más alta[/size]

[size=200][color=#0000ff][b]Problema 1[/b][/color][/size]

[size=150]Usa las ecuaciones paramétricas de [i][color=#1e84cc][b]h(T)[/b][/color][/i] y [i][color=#1e84cc][b]R(T)[/b][/color][/i] para determinar la ecuación de rapidez [i][color=#1e84cc][b]S[/b][/color][/i] del transbordador, a lo largo de su trayectoria, donde:[/size][br][center][img]data:image/png;base64,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[/img][/center]

[size=200][b][color=#0000ff]Problema 2[/color][/b][/size]

[size=150]Determine la fórmula para la magnitud de la aceleración del transbordador, usando las segundas derivadas de las ecuaciones paramétricas.[/size]

[size=200][color=#0000ff][b]Problema 3[/b][/color][/size]

[size=150]A partir de la respuesta obtenida en la pregunta de arriba, hallar el momento en el cual la aceleración sea un valor extremo, y más específicamente, un máximo a lo largo de la trayectoria modelada.[/size]