u=ln(x² y² z²)的全微分-搜答案-搜狗做题网

Z=（1/2）ln(1+x²+y²)dz=(1/2)2x/(1+x²+y²)dx+(1/2)2y/(1+x²+y²)dy=x/(1+x&su

x=z(lny-lnz)对x求导1=∂z/∂x*(lny-lnz)+z*(0-1/z*∂z/∂x)1=∂z/∂x(lny-lnz

x=z(lnz-lny)=zlnz-zlny令F(x,y,z)=zlnz-zlny-xaF/ax=-1aF/ay=-z/yaF/az=lnz+1-lny所以az/ax=-Fx/Fz=1/(lnz+1-

ln(x+y+1)≠0【它充当分式的分母,当然不能为0】也就是ln(x+y+1)≠0=ln1x+y+1≠1且x+y+1＞0【对数的真数必须大于0】联合得到：x+y∈（-1,0）∪（0,+∞）

dz=[-3ysin3xy+1/(1+x+y)]dx+[-3xsin3xy+1/(1+x+y)]dy

z偏x=-sin3xy*3y+1/(x+y+1)z偏y=-sin3xy*3x+1/(x+y+1)dz=[-sin3xy*3y+1/(x+y+1)]dx+[sin3xy*3x+1/(x+y+1)]dy

(x+1)y>0(1)x+1>0且y>0,得到x>-1且y>0;(2)x+1

ux=2x/(x^2+y^2+z^2)uy=2y/(x^2+y^2+z^2)uz=2z/(x^2+y^2+z^2)故du=uxdx+uydy+uzdz=2x/(x^2+y^2+z^2)dx+2y/(x

dz(x=0,y=-1)=-2dy 详解如图

设z=ln(x^z×y^x),求dz

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

dy/dx=dy/du*du/dx+dy/dv*dv/dx=v*e^(x+y)+u*y/x=ln(xy)*e^(x+y)+e^(x+y)*y/x=e^(x+y)[ln(xy)+y/x]所以dy=e^(

F(x-y,y-z,z-x)=0对x求偏导数(y是常量):F1+F2(-az/ax)+F3(az/ax-1)=0F(x-y,y-z,z-x)=0对y求偏导数(x是常量):F1(-1)+F2(1-az/

∂z／∂x=∂z／∂u*du/dx+∂z／∂v*dv/dx=1/(u^2+v)*2u+1/(u^2+v)*2xy∂z

u'x=2x/(x^2+y^2+z^2)u'y=2y/(x^2+y^2+z^2)u'z=2z/(x^2+y^2+z^2)du=2xdx/(x^2+y^2+z^2)+2ydy/(x^2+y^2+z^2)

z=1/2*ln(x^2+y^2+4)Z'x=1/2*1/(x^2+y^2+4)*(2x)=x/(x^2+y^2+4)Z'y=1/2*1/(x^2+y^2+4)*(2y)=y/(x^2+y^2+4)所

对等式两边求全微分du=【1/(2x+3y+4z^2)】【2dx+3dy+8zdz】

全微分后=2x/(3+x^2+y^2)+2y/(3+x^2+y^2)=2/(3+1+4)+4/(3+1+4)=3/4

x/z=ln(y/z),x=zlny-zlnz两端对x求偏导得1=z'lny-z'lnz-z'两端对y求偏导得0=z'lny+z/y-z'lnz-z'