Proceed as in this example to find a particular solution y p (x) of the given differential equation in the integral form yₚ(x)=∫ˣₓ₀ G(x,t)f(t)dt.
25y′′ −10y′ +y=f(x)
1. Find the linearly independent solutions of the associated homogeneous equation. (Let c 1 and c 2 equal 1 . Enter your answers as a comma-separated list)
2. Determine the value of the Wronskian of the solution functions.
3. Find a particular solution y p (x) of the given differential equation in the integral form.