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Find The General Solution Of The Differential Equation Using Integrations Brainly In Differentiate using the Power Rule which states that d d x x n d d x x n is n x n − 1 n x n 1 where n = 2 n = 2 Multiply 2 2 by − 1 1 Reform the equation by setting the left side equal to the right side Reorder factors in −2e−x2 x 2 e x 2 x Replace y' y ′ with dy dx d y d x*Thanks for the A* First off, notice that this differential equation is of the form M(x,y)dxN(x,y)dy=0, and notice that this differential equation, in current form, is not exact Solve the following differential equation (dy)/(dx)=e^(x+y)+x^(2)e^(y)

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