Without actually solving the given differential equation, find the minimum radius of convergence R of power series solutions about the ordinary point x = 0. About the ordinary point x = 1. (x^2 - 2x + 37)y'' + xy' - 4y = 0 R = [ ] (x = 0) R = [ ] (x = 1)
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The singular points are the values of x that make the coefficient of y'' or y' or y become infinite or undefined. The given differential equation is 2x + 37)y" + xy' - 4y = 0. The coefficient of y'' is (2x + 37), the coefficient of y' is x, and the coefficient Show more…
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