设函数z=x^y,dz|(2,1)=
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∂z/∂x=2xy∂z/∂u=x²所以dz=2xydx+x²dy
z'x=2e^(2x+y)z'y=e^(2x+y)所以dz=2e^(2x+y)dx+e^(2x+y)dy
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
x^2+y^2+z^2+4z=02xdx+2ydy+2zdz+4dz=0(2z+4)dz-2xdx-2ydydz=(-2xdx-2ydy)/(2z+4)
∂z/∂x=cos(x-y)∂z/∂y=-cos(x-y)dz=∂z/∂x*dx+∂z/∂y*dy=co
f对第1个变量的偏导函数记作f1,第2个变量的偏导函数记作f2,dz=f1*d(xz)+f2*d(z/y)...[注:写完整的话是f1(xz,z/y),f2也如此]=f1*(xdz+zdx)+f2*(
再问:非常感谢,还要问大侠一道题面目。曲线y=x³+3x的拐点坐标为???再答:y'=3x²+3y''=3x令y"=0,得x=3当x=3时,y=36所以拐点坐标(3,36)
∂z/∂x=2x/(1+x^2+y^2)∂z/∂y=2y/(1+x^2+y^2)dz=∂z/∂xdx+∂z/W
z=lnx^z+lny^x=zlnx+xlnyz=xlny/(1-lnx)先关于x求偏导,把y看做常数,再对y求偏导,把x看做常数dz=0dx+x/y(1-lnx)dy(此处省略了一些计算过程,)dz
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/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
f(x)=z=x+y/x-ydz=fxdx+fydy=[[(x-y)-(x+y)]/(x-y)^2]dx+[[(x-y)+(x+y)]/(x-y)^2]dy=-2y/(x-y)^2dx+2x/(x-y
dz=Z'xdx+Z'ydy=2xcos(x^2+y^2)dx+2ycos(x^2+y^2)dy
dz=[2e^(2x+y)]dx+[e^(2x+y)]dy
再问:啊不好意思搞错了。。是z=e^(x^2+y^2),求dz,谢谢你帮我解答一下吧。。再答:
dz/dx=dz/du*(du/dx)=2u*1=2udz/dy=dz/du*(du/dy)=2u*1=2u和v没关系
应该是∂z/∂x吧!令u=x+y^2+z=>du/dx=1+dz/dxu=lnu^(1/2)=1/2*lnudu/dx=1/2*1/u*du/dx=>du/dx=u/(1/2+
z=sin(x²y²)+3x-5y²+1所以δz/δx=cos(x²y²)*2xy²+3δz/δy=cos(x²y²)*
两边求微分的2xdx+2zdz=2e^zdy+2ye^zdz解得dz=(2e^zdy-2xdx)/(2z-2ye^z)=(e^zdy-xdx)/(z-ye^z)
u=x^2+y∂u/∂x=2x∂u/∂y=1du=(∂u/∂x)dx+(∂u/∂y)dy=2xdx+dy