In this problem you will use variation of parameters to solve the nonhomogeneous A. Plug y tn into the associated homogeneous equation (with "0 instead of -3t3") to get an equation with only t and n Note: Do not cancel out the t, or webwork won't accept your answer!) 0 B. Solve the equation above for n (use t to cancel out the t) You should get two values for n, which give two fundamental solutions of the form y = tn y1 C. To use variation of parameters, the linear differential equation must be written in standard What is the function g? g(t) - D. Compute the following integrals. 29 E. Write the general solution. (Use c1 and c2 for ci and c). If you don't get this in 3 tries, you can get a hint to help you find the fundamental solutions.