The general solution of the equation dy = (l + i) cos x dx is y(x) = tan(C + sin x)
Chapter 6, Problem 6.1.31(choose chapter or problem)
The general solution of the equation dy = (l + i) cos x dx is y(x) = tan(C + sin x). With the initial condition y(O) = 0 the solution y(x) = tan(sin x) is well behaved. But with y(O) = 1 the solution y(x) = tan Un + sin x) has a vertical asymptote at x = sinl (n/4) 0.90334. Use Euler's method to verify this fact empirically.
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