(Steps Shown) Solve using a Maclaurin series y''-3xy+3y=3x. Show that for this problem C0 and C1 are arbitrary, C3 has a fixed value, and the recurrence relation
Question: Solve using a Maclaurin series \(y''-3xy+3y=3x\). Show that for this problem
C0 and C1 are arbitrary, C3 has a fixed value, and the recurrence relation starts at n = 2.
If you cannot find an expression \({{C}_{n}}\) give at least the first 7 terms.
Deliverable: Word Document 
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