In a homogeneous second-order linear differential equation, two functions y1 and y2, and a pair of initial conditions are given. First verify that y1 and y2 are solutions of the differential equation. Then find a particularsolution of the form y = C1y1 + y = C2y2 that satisfies the giveninitial conditions. Primes denote derivatives with respect to x.
x2y″ + 2xy′ − 6y = 0; y, = x2, y2 = x−3; y(2) = 10, y′(2) = 15
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