(x*x-1)dy (2xy-cosx)dx=0

解析2xdx+ydx+xdy+3y²dy=0(2x+y)dx+(x+3y²)dy=0(2x+y)dx=-(x+3y²)dydy/dx=(2x+y)/-(x+3y²

x^2*dy/dx=xy-y^2dy/dx=y/x-y^2/x^2u=y/xy=xuy'=u+xu'代入：u+xu'=u+u^2xu'=u^2du/u^2=dx/x-1/u=lnx+lnCCx=e^(

虽说结果与路径无关,但是怎么知道起点与终点的位置如何?如果透过格林公式的结果是0,用参数方程的结果又是0,那又如何解释呢?那只有起点和终点的位置都一样,重合了.起点无论从曲线哪处开始也好,都绕曲线正向

令z=1/x,则dx=-x²dz代入原方程得(x²y³+xy)dy=-x²dz==>dz/dy+y/x=-y³==>dz/dy+yz=-y³

(1+x∧2)dy＝(1+xy)dx,y(x＝1)＝0观察知,y=x是方程的特解为求通解,令y=x+t,代入原方程得(1+x^2)(1+t')dx=(1+x^2+xt)dx化简得dt/t=xdx/(1

先求dy/dx+2xy=0的解:dy/y=-2xdx,--->lny=-x^2+C=-ln(e^(x^2))+lnC=ln(C*e^(-x^2)),即y=C*e^(-x^2).然后令y=C(x)*e^

答：dy/dx=1+x+y^2+xy^2y'=(1+x)(1+y^2)y'/(1+y^2)=1+x(arctany)'=1+x积分得：arctany=x+x²/2+Cy=tan(x+x

令y/x=u,dy=u+xdu,原方程化为:u+xdu/dx=x/(u^2)+u,即du/dx=1/(u^2)通解为:y=x*[(3x+3c)^(1/3)]

∵dy/dx=(x+y^3)/(xy^2)==>xy^2dy=(x+y^3)dx==>y^2dy/x^3=dx/x^3+y^3dx/x^4(等式两端同除x^4)==>d(y^3)/(3x^3)+y^3

别人一般问一道题,你一下子5道?我给你个提示：1.所有5道题全部可以化成y'=f(y/x)的形式.比如5：:y’=√(1-y^2/x^2)+y/x2.设y/x=uy=xuy'=u+xu',代入：u+x

siny+e^x=xy^2,两边求微分,cosydy+e^xdx=d(xy^2)cosydy+e^xdx=y^2dx+2xydy整理,得(e^x-y^2)dx=(2xy-cosy)dydy/dx=(e

f(x,y)=e^xy+x+y=2求全微分(Df/Dx)dx+(Df/Dy)dy=0dy/dx=-(y*e^xy+1)/(x*e^xy+1)如果x=1dy/dx|x=1=-(ye^y+1)/(e^y+

令z=1/x,则dx=-x²dz代入原方程得(x²y³+xy)dy=-x²dz==>dz/dy+y/x=-y³==>dz/dy+yz=-y³

2x+2ydy/dx-y-xdy/dx+3=0dy=(2x-y+3/x-2y)dx

是xy-[1/(x^2y)]dx-[1/(xy^2)]dy=0还是[(xy-1)/(x^2y)]dx-[1/(xy^2)]dy=0请表达清楚,无歧义!再问：[(xy-1)/(x^2y)]dx-[1/(

∫(x²-2xy)dx+(y²-2xy)dy=∫[-1→1](x²-2x*x²+(x^4-2x*x²)*2x)dx=∫[-1→1](x²-2

∵(1-x^2)dy/dx+xy=1==>(1-x^2)dy+xydx=dx==>dy/(1-x^2)^(1/2)+xydx/(1-x^2)^(3/2)=dx/(1-x^2)^(3/2)(等式两端同除

令y=xuy'=u+xu'代入方程：u+xu'=u^2/(u-1)xu'=u/(u-1)du(u-1)/u=dx/xdu(1-1/u)=dx/x积分;u-ln|u|=ln|x|+C1e^u/u=Cxe

dP/dy=2xy=dQ/dx这是个全微分方程,直接带公式就可以u(x,y)=∫(0,x)(xy^2+x)dx+∫(0,y)ydy=1/2*(x^2y^2+x^2+y^2)通解为1/2*(x^2y^2

你要求什么?