ydx-2xdy+x^3dx=0,
y/(x^(3/2))dx-2/(x^(1/2))dy+x^(3/2)dx=0, (除以x^(3/2))
得到全微分形式:d(-2y/sqrt(x))+2/5d(x^(5/2))=0, (其中sqrt(x)=x^(1/2))
积分可得:-2y/(x^(1/2))+2/5x^(5/2)=C
由x=1, y=6/5可得积分常数 C=-2*6/5+2/5=-2,
所以,微分方程的特解为:y=1/5x^3+x^(1/2)
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