设z是由方程组
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dz=d[xyP(z)]=yP(z)dx+xP(z)dy+xyP'(z)dz所以dz=[yP(z)dx+xP(z)dy]/[1-xyP'(z)]du=df(x,z)=f'x(x,z)dx+f'z(x,
将z对x的偏导记为dz/dx,(不规范,请勿参照)(e^x)-xyz=0两边对x求导数(e^x)'-(xyz)'=0e^x-x'yz-xy(dz/dx)=0e^x-yz-xy(dz/dx)=0xy(d
对y求导,e^z*z'(y)=xz+xyz'(y),əz/əy=z'(y)=xz/(e^z-xy)
两边微分e^zdz-yzdx-xzdy-xydz=0(e^z-xy)dz=yzdx+xzdy∂z/∂y=xz/(e^z-xy)=xz/(xyz-xy)=z/(yz-y)
对方程两边求全微分得:(e^z-1)dz+y^3dx+3xy^2dy=0(方法和求导类似)移项,有dz=-(y^3dx+3xy^2dy)/(e^z-1)
e^z-z+xy^3=0偏z/偏x:z'e^z-z'+y^3=0y^3=z'(1-e^z)z'=y^3/(1-e^z)偏z/偏y:z'e^z-z'+3xy^2=0z'=3xy^2/(1-e^z)偏z/
z(x)+z(y)=-(f(x)+f(y))/f(z)f(x)=f1(1-z(x)-f2z(x))f(y)=-f1z(y)+f2(1-z(y))f(z)=-f1-f2所以z(x)+z(y)=1+z(x
对方程e^(-xy)+2z-e^z=2两边微分,有:e^(-xy)*d(-xy)+2*dz-e^z*dz=0-e^(-xy)*(x*dy+y*dx)+2*dz-e^z*dz=0移项,得:(e^z-2)
方程x^2-z^2+lny-lnz=0两端对x求导得2x-2zz'x-z'x/z=0z'x=2x/(2z+1/z)两端对y求导得-2zz'y+1/y-z'y/z=0z'y=1/[y(2z+1/z)]因
方程组z=x2+y2x2+2y2+3z2=20两边对x求导得:dzdx=2x+2ydydx2x+4ydydx+6zdzdx=0解得dydx=−x(6z+1)2y(3z+1),dzdx=x4z
由于偏导符号不好打,以下略述我的思路和解法.首先认清题目已知的是f,g,z的函数形式,所以结果应该是它们的偏导的组合.有g(y,z,t),h(z,t)恒等于0,可以把z,t看成只是y的函数,即z=z(
设F(x,y,z)=z^2-2xyz-1则Fx=-2yz,Fy=-2xz,Fz=2z-2xyαz/αx=-Fx/Fz=-(-2yz)/(2z-2xy)=yz/(z-xy)αz/αy=-Fy/Fz=xz
对X的偏导=yz/(e^z-xy)对Y的偏导=xz/(e^z-xy)
e^z=xyz两边对x求偏导e^z*z'(x)=y(z+x*z'(x))z'(x)=yz/(e^z-xy)∂z/∂x=yz/(e^z-xy)原式对y求偏导e^z*z'(y)=x
df=f1*d(xz)+f2*d(y+z)=f1*(z*dx+x*dz)+f2*(dy+dz)=0dz=-(z*f1*dx+f2*dy)/(x*f1+f2)其中f1和f2分别为f这个二元函数对第一个和
dz=-dx-dy
首先du/dx=z+x*dz/dx而Z=Z(x,y)由方程x²z+2y²z²+y=0确定,对x求导得到2xz+x²*dz/dx+2y²*2z*dz/d