神马作文网xdx ydy (x y-1)dz
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我来试试吧...z=e^xy*cos(x+y)Z'x=ye^xycos(x+y)-e^xysin(x+y)Z'y=xe^xycos(x+y)-e^xysin(x+y)故dZ=[ye^xycos(x+y
dz=(∂z/∂x)dx+(∂z/∂y)dyxy+yz+xz-1=0设g(x,y,z)=xy+yz+xz-1 ∂g/∂x=y+
先对x求导y*dz/dx+z+x*dz/dx+y=0所以dz/dx=-(z+y)/(x+y)同理得dz/dy=-(z+x)/(x+y)所以dz=-(z+y)/(x+y)dx-(z+x)/(x+y)dy
dz=2x+y就是对z求x的导数吧
dz/dx=dz/dx+dz/dy*dy/dx.然后你就知道了,高数中的链式法则啊.
dz/dx=arctan(xy)+xy/[1+(xy)^2](dz/dx)|(1,1)=π/4+1/2(dz/dy)|(1,1)=x^2/[1+(xy)^2]=1/2
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)
dz=d(xyln(xy))=xyd(ln(xy))+ln(xy)d(xy)=xyd(xy)/(xy)+ln(xy)d(xy)=d(xy)+ln(xy)d(xy)=(1+ln(xy))d(xy)=(1
dz=[sin(xy)+xycosxy]dx+(x^2cosxy)dydz|(1,1)=(sin1+cos1)dx+cos1dy再问:先求dx,dy,详细过程谢谢再答:=sin(xy)+xycosxy
z=(x+y)^2*cos(x^2*y^2)dz/dx=2*(x+y)*cos(x^2*y^2)-2*(x+y)^2*sin(x^2*y^2)*x*y^2dz/dy=2*(x+y)*cos(x^2*y
z=arctan(x*e^x)z'={1/[1+(x*e^x)^2]}*(x*e^x)'(x*e^x)'=x'*e^x+x*(e^x)'=e^x+x*e^x=(x+1)*e^x所以dz/dx=(x+1
全微分啊dz=(1+xy)^x[ln(1+xy)+xy/(1+xy)]dx+(1+xy)^xx^2/(1+xy)dy
dz=[yIn(xy)+y]dx+[xIn(xy)+x]dy分开求导
说明:eu应该是e的x次幂,dz/dx,dz/dy应该是偏导数.∵v=xy,u=x2-y2∴du/dx=2x,du/dy=-2y,dv/dx=y,dv/dy=x∵z=ln(e^u+v),∴dz/dx=
az/ax=y^3-2xy^6az/ay=3xy^2-6x^2y^5所以dz=(y^3-2xy^6)dx+(3xy^2-6x^2y^5)dy在点(1,1)的全微分为dz=-dx-3dy
u=x^2+y∂u/∂x=2x∂u/∂y=1du=(∂u/∂x)dx+(∂u/∂y)dy=2xdx+dy
z=x^2+2xy两边同时求导数,得到:dz=2xdx+2ydx+2xdy即:dz=2(x+y)dx+2xdy.
再问:就是这个吗?再答:是的。如还有不懂请追问,懂了请采纳。再问:还有这三题
∂z/∂x=yeˆ(xy)-sin(x+y)x=1,y=0时,∂z/∂x=-sin1∂z/∂y=xeˆ(xy