A In Problems 9–20, find the general or particular solution, as indicated, for each first-order differential equation . 15. d y d x = x 2 − x ; y ( 0 ) = 0
A In Problems 9–20, find the general or particular solution, as indicated, for each first-order differential equation . 15. d y d x = x 2 − x ; y ( 0 ) = 0
Solution Summary: The author explains how to find the general or particular solution of the differential equation.
For each dif erential equation in Problems 1–21, find the general solutionby finding the homogeneous solution and a particular solution.
Please DO NOT YOU THE PI method where 1/f(r) * x. Dont do that.
Instead do this, assume for yp = to something, do the 1 and 2 derivative of it and then plug it in the equation to find the answer.
5.Determine if the given function is a solution of the given differential equation
The instructions say:
For each differential equation in Problems 1–21, find the general solution by finding the homogeneous solution and a particular solution.
The first image below is the problem, the second is the answer. I'm able to get the homogeneous solution but am struggling with getting the particular solution to get to the answer the textbook provides.
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