三、解:∵dy/dx=(x-y^2)/(2y(x+y^2))
==>2y(x+y^2)dy-(x-y^2)dx=0
==>(2xydy+y^2dx)+2y^3dy-xdx=0
==>d(xy^2)+2y^3dy-xdx=0
==>∫d(xy^2)+2∫y^3dy-∫xdx=0 (积分)
==>xy^2+y^4/2-x^2/2=C/2 (C是任意常数)
==>2xy^2+y^4-x^2=C
∴此方程的通解是2xy^2+y^4-x^2=C
∵y(1)=0
∴代入通解,得C=-1
故所求此方程的特解是2xy^2+y^4-x^2+1=0。
==>2y(x+y^2)dy-(x-y^2)dx=0
==>(2xydy+y^2dx)+2y^3dy-xdx=0
==>d(xy^2)+2y^3dy-xdx=0
==>∫d(xy^2)+2∫y^3dy-∫xdx=0 (积分)
==>xy^2+y^4/2-x^2/2=C/2 (C是任意常数)
==>2xy^2+y^4-x^2=C
∴此方程的通解是2xy^2+y^4-x^2=C
∵y(1)=0
∴代入通解,得C=-1
故所求此方程的特解是2xy^2+y^4-x^2+1=0。
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第1个回答 2015-06-12
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