Reduction of Order

Already knowing one solution to the second-order DE:

L [y] = y^{″} + p (x) y^{'} + q (x) y = 0

We can always find a second solution, linearly independent to the first, by assuming the second solution is of the form

y_{2} (x) = v (x) y_{1} (x)

where $v (x)$ is some unknown function of the independent variable