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Suggested: integration of cos(x+y)dx - dy/dx=cos(x+y)+sin(x+y) - x=a(theta+sin theta) y=a(1-cos theta) then dy/dx - find dy/dx if y+sin y=cos x - dy/dx=cos(x+y) - dy/dx=x(2logx+1)/(siny+y cos y) - x cos y=sin(x+y) find dy/dx - y=x^cos x find dy/dx - (y-cos^2x)dx+cos x dy=0 - cos^2x dy/dx+y=tan x - (1+x)^2d^2y/dx^2+(1+x)dy/dx+y=4 cos log(1+x) - solve cos(x+y)dy=dx - y=cos^-1(1-x^2/1+x^2) find dy/dx - cos x dy/dx+y(xsinx+cosx)=1 - cos(x+y)dx               

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