作业帮xy-e^x e^y=0,求 dy dx
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y'+2xy=xe^(-x^2)e^(x^2)(y'+2xy)=x(ye^(x^2))'=x两边积分:ye^(x^2)=x^2/2+Cy=x^2e^(-x^2)/2+Ce^(-x^2)
将xy-e^x+e^y=0两边取导得:ydx+xdy-e^xdx+e^ydy=0解得:dy/dx=﹙y--e^x﹚/﹙x-+e^y﹚当x=0时,∴e^y=1,y=0∴dy/dx|x=0=(0-1)/﹙
将原方程两边微分得d[xe^y+sin(xy)]=0→e^ydx+xe^ydy+cos(xy)(ydx+xdy)=0→移项[xe^y+xcos(xy)]dy=-[e^y+ycos(xy)]dx整理→d
对方程取导数y+x(dy/dx)+(dy/dx)=0(dy/dx)(x+1)=-ydy/dx=(-y)/(x+1)
y'e^y+e^x-y²-2xyy'=0y'=(e^x-y²)/(2xy-e^y)即:dy/dx=(e^x-y²)/(2xy-e^y)祝你开心!希望能帮到你,如果不懂,请
ydx/dy+x=(e^x)(e^y)dx/dy+(e^x)(e^y)dx/dy=[(e^x)(e^y)-x]/[y-(e^x)(e^y)]dx/dy=(xy-x)/(y-xy)dx/dy=x(y-1
你说的没错,但是ydx是从d(xy)里面来的d(xy)有两项,xdy+ydx
e^ydx+(xe^y+2y)dy=d(xe^y)+d(y^2)=0------全微分积分可得xe^y+y^2=0
对xy-e^x+e^y=0求微分得ydx+xdy-e^xdx+e^ydy=0(y-e^x)dx+(x+e^y)dy=0dy/dx=(x+e^y)/(e^x-y)
y'=(x)'e^y+x(e^y)'y'=e^y+xe^y*y'再问:x(e^y)'=xe^y*y'?再答:对,因为y是x的函数,根据复合函数求导法,可得
x=0,e^y=e,y=1xy+e^y=ey+xdy/dx+e^ydy/dx=0dy/dx=-y/(x+e^y)dx/dy|x=0=-1/e
2yy'-xy'e^y=e^y2yy'=(xy'+1)e^y(y^2)'=(xe^y)'y^2=xe^y+C
y'=(xe^y)'=x'e^y+x(e^y)'=e^y+xe^yy'y‘=e^y/(1-e^y)∴dy/dx=e^y/(1-e^y)x=0好象没有一个确定的值