Question: If f(x, t) does not depend on x, then we have x' = f(t), so that x(t) = (0 to t) f(u)du. Show that, in

If f(x, t) does not depend on x, then we have x' = f(t), so that x(t) = ∫(0 to t) f(u)du. Show that, in this case, the RK4 algorithm reduces to Simpson's rule.

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