For each problem (A and B),
- Seek power series solutions of the given differential equationabout the given point x0 and find the recurrencerelation.
- Find the first four terms in each of two solutionsy1 and y2 (unless the series terminatessooner).
- By evaluating the Wronskian W(y1,y2)(x0), show that y1 andy2 form a fundamental set of solutions.
- If possible, find the general term in each solution.
A) (1 - x)y\" + y = 0; x0 = 0
B) xy\" + y' + xy = 0; x0 = 1
