Students should be able to:
By hand, find the recurrence relation for a power series solution $H(\rho)$ of the equation:
$$\rho {d^2 H\over d\rho^2} +(2\ell+2-\rho){dH\over d\rho} +(\lambda-\ell-1) H=0$$
where $\ell$ is a known positive integer, and $\lambda$ is an unknown constant.
Suppose that you want a solution to (a) which is a polynomial of degree 4. Assume that $\ell=2$. What does that tell you about the unknown constant $\lambda$?
Find the polynomial of degree 4 solution to the differential equation in part (a) assuming $\ell=2$. Assume anything you need to about $\lambda$.