Follow the steps to solve the below differential equation using series methods. Assuming the solution can be represented by a power series ∞ y' = Σ n=1 a) Find the first and second derivatives of y. y' = Σ n=2 Σ n=0 ∞ Σ n=2 b) Substituting y, y', y'' into the equation gives y'' - 5xy' − 3y = 0, y(0) = 1, y'(0) = 2 an+ 2 = where: + ao = a₁ = a2 = y = Σ n=0 ∞ az = a3 a4 = n=1 anxen c) After shifting the summation indices to start from the same values and have the sam exponent of x, combine the summations into a single summation. +Σ n=0 d) Given that if a power series is zero for all x, all its coefficients must be zero, find a recursive formula for the solution. x = 0 = 0 e) Using the initial values and the recursive formula, determine the first few terms of th series solution = y = a +α₁x + ²x² + α3x³ + α₁x² + ...

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Follow the steps to solve the below differential equation using series methods. Assuming the solution can be represented by a power series y' = y" a) Find the first and second derivatives of y. n=2 Σ n=0 İM: İM8 b) Substituting y, y', y'' into the equation gives An +2 = where: ao = a1 a2 y'' — 5xy' — 3y = 0, y(0) = 1, y'(0) = = || c) After shifting the summation indices to start from the same values and have the same exponent of x, combine the summations into a single summation. = = y + a3 a4 = n=0 n=1 d) Given that if a power series is zero for all o, all its coefficients must be zero, find a recursive formula for the solution. || Anxn e) Using the initial values and the recursive formula, determine the first few terms of the series solution n=0 x = 0 2 = 0 y = A。 + A₁x + A²x² + α3x³ + α²x² +