设z三次减3xyz隐函数
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df(x,y,z)/dx=[d(z^2)/dx]*y*e^x+y*z^2*(de^x/dx)=2zye^x(dz/dx)+y*z^2*e^x另,由x+y+z+xyz=0求dz/dx两边对x求偏导1+0
x²+y³-xyz=0,z=(x²+y³)/(xy)=x/y+y²/x;故z/x=1/y+y²/x²z/y=x/y²+y
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)
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
x^3+y^3+z^3-3xyz=(x+y+z)(x^2+y^2+z^2-xy-yz-zx)=(x+y+z)[(x-y)^2+(y-z)^2+(z-x)^2]/2≥0x^3+y^3+z^3≥3xyz
对X的偏导=yz/(e^z-xy)对Y的偏导=xz/(e^z-xy)
两边对X求导数就行了撒,把y看成是一个常数,Z看成对x函数就行了撒e^x-(z*y+y*x*zx)=0所以z对x的偏导数zx=(zy-e^x)/(y*x)
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
先对x求偏导数得z'(x)cosz=yz+z'(x)y所以z'(x)=yz/(cosz-y)同理对y求偏导数得z'(y)=xz/(cosz-x)所以dz=yz/(cosz-y)dx+xz/(cosz-
1.为了简化算式,设A=2000的立方根,B=2001的立方根,C=2002的立方根A^3=2000,B^3=2001,C^3=2002A^3x^3=B^3y^3=C^z^3y=Ax/Bz=Ax/C2
y^3z^2-x^2+xyz-5=0等式两边同时对x求导:∂z/∂x=(2x-yz)/(2zy^3+xy)等式两边同时对y求导:∂z/∂y=-(3y
运用隐函数求导法则,两端对x求导得3z^2*∂z/∂x-(3yz+3xy∂z/∂x)=0即∂z/∂x=yz/(z^2-xy)再问
/>x^3+y^3+z^3-3xyz=x^3+x^2y+x^2z+y^2x+y^3+y^2z+z^2x+z^2y+z^3-x^2y-y^2x-xyz-xyz-y^2z-yz^2-x^2z-xyz-z^
令F(x,y,z)=x^3+y^3+z^3-3xyzFx'(x,y,z)=3x^2-3yzFy'(x,y,z)=3y^2-3xzFz'(x,y,z)=3z^2-3xy∂z/∂x