Question: Solve the separable ODEdydx = xy +2x + y +2A. ln |y +2|= x2/2+ x + C, where C is an arbitrary constant.B. ln |y

Solve the separable ODEdydx = xy +2x + y +2A. ln |y +2|= x2/2+ x + C, where C is an arbitrary constant.B. ln |y +2|= x2/2 x.C. ln |y +2|= x2/2+ x.D. ln |x +2|= y2/2 y + C, where C is an arbitrary constantE. ln |x +2|= y2/2+ y + C, where C is an arbitrary constantF. ln |y 2|= x2/2+ x.G. ln |y 2|= x2/2 x + C, where C is an arbitrary constant8.[5]The separated form of the separable ODE a(x) dydx + b(x)y =0 isA. y dy =a(x)b(x)dx.B. dyy = a(x)b(x) dx.C. dyy = b(x)a(x) dx.D. dyy = a(x)b(x) dx.E. dyy = b(x)a(x) dx.F. y dy = b(x)a(x) dx.G. dyy2= b(x)a(x) dx.

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