解:基本思路,将该微分方程化简成可积,可微的形式,然后根据已知微积分性质求原函数。(x+y)dy-ydx=0可以写成:xdy+ydx = ydy而:xdy+ydx = d(xy)ydy = (1/2)·d(y²)因此:d(xy) = (1/2)·d(y²)显然:xy = (1/2)·(y²) + C,其中C是常数
