设二元函数z=x*2 y*2求全微分dz-搜答案-智慧作业帮

1.3y²zdy+y³dz=cosxdx-e^xdz整理:(y³+e^z)dz=cosxdx-3y²zdydz=[cosx／(y³+e^z)]dx-[

e^(-xy)-2z+e^z=0-ye^(-xy)-2z'(x)+e^zz'(x)=0z'(x)=ye^(-xy)/(e^z-2)-xe^(-xy)-2z'(y)+e^zz'(y)=0z'(y)=xe

因为z=z(x,y),所以全微分是dz=P(x,y)dx+Q(x,y)dy的形式,其中P(x,y)=∂z/∂x,Q(x,y)=∂z/∂y等式两边同时对x

由柯西不等式(a^2+b^2+c^2)(x^2+y^2+z^2)>=(ax+by+cz)^2,得((1/√2)^2+(1/√3)^2+1)(2x^2+3y^2+z^2)>=(x+y+z)^22x^2+

x^2+y^2+z^2+4z=02xdx+2ydy+2zdz+4dz=0(2z+4)dz-2xdx-2ydydz=(-2xdx-2ydy)/(2z+4)

两边对x求导1-a*δz/δx=f'(y-bz)*(-bδz/δx)整理得：[a-bf'(y-bz)]δz/δx=-1两边对y求导-a*δz/δy=f'(y-bz)*(1-bδz/δy)整理得：[-a

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

Zxe^z=YZ+XYZx,Zx=YZ/(e^z-XY)Zy=XZ/(e^z-XY)dZ=Zxdx+Zydy=(ydx+xdy)Z/(e^z-xy)再问：设F(x,y,z)=e^z-xyzə

∂z/∂x=cos(x-y)∂z/∂y=-cos(x-y)dz=∂z/∂x*dx+∂z/∂y*dy=co

1,-1不存在

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zx=1/y,代入y=1得zx=1zy=-（x/y^2)代入x=2,y=1得zy=-2所以dz=dx-2dy

dz=(y+y/(X^2))dx+(x-1/x)dy,

dz/dx=1/y,在(2,1)的值是1dz/dy=-x/y^2,在(2,1)的值是-2所以dz|(2,1)=dx-2dy

zx=1/(1+(x/y)²)*1/y=y/(x²+y²)zy=1/(1+(x/y)²)*(-x/y²)=-x/(x²+y²)所以

dz/dx=dz/du*(du/dx)=2u*1=2udz/dy=dz/du*(du/dy)=2u*1=2u和v没关系

2zdz+zdy+ydz=-sinydx-xcosydydz=[-sinydx-(xcosy+z)dy]/(2z+y)再问：不是先等式两边同时对x求偏微分再对y求偏微分吗？再答：偏微分和全微分的概念不

x+2y+z=e^(x-y-z)两边对x求偏导注意到z=z(x,y)1+z'=e^(x-y-z)*(1-z')...(1)再对x求偏导z"=e^(x-y-z)(1-z')^2-z"e^(x-y-z).

对左右两边求导：(1+ez)dz=ydx+xdy.dz=1/（1+ez).（ydx+xdy）.