In this question, we solve the equation (t – 1)y" – ty + y = (t – 1)?. (a) Ne first consider the associated homogeneous equation (t 1)y"– ty + y = 0. One can see that yi = t is a solution to this equation. Using this with reduction of order, find a fundamental set of solutions to this associated homogeneous equation. (b) the nonhomogeneous equation Use variation of the parameters to find a particular solution to

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In this question, we solve the equation (t – 1)y" – ty' + y = (t – 1)2. (a) Ve first consider the associated homogeneous equation (t – 1)y" – ty' + y = 0. One can see that y1 t is a solution to this equation. Using this with reduction of order, find a fundamental set of solutions to this associated homogeneous equation. (b) the nonhomogeneous equation Use variation of the parameters to find a particular solution to (t – 1)y" – ty + y = (t – 1)?. Then give the general solution to this equation.