z 根号x2 y2 y的全微分
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![z 根号x2 y2 y的全微分](/uploads/image/f/920795-59-5.jpg?t=z+%E6%A0%B9%E5%8F%B7x2+y2+y%E7%9A%84%E5%85%A8%E5%BE%AE%E5%88%86)
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
z'x=2e^(2x+y)z'y=e^(2x+y)所以dz=2e^(2x+y)dx+e^(2x+y)dy
Z=e^xy在x处的导函数为ye^(xy)在y处的导函数为xe^(xy)dz=ye^(xy)dx+xe^(xy)dy=2e^2dx+e^2dy
Z=C^mdz=Pz/Pcdc+Pz/PmdmPz/Pc=mC^(m-1)Pz/Pm=lnC*C^mdz=mc^(m-1)dc+c^mlncdm
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
z=3x²y+x/yzx=6xy+1/yzy=3x²-x/y²所以dz=zxdx+zydy=(6xy+1/y)dx+(3x²-x/y²)dy
两边即对数得:lnz=xy*ln(lnu),不妨记u=x^2+y^2z'x/z=yln(lnu)+2x^2y/lnu,z'x=z[yln(lnu)+2x^2y/lnu]z'y/z=xln(lnu)+2
看到dy,deltay,∂y,初学的话就别管区别,都是一个事:y的变化量还有你的公式有问题dz不是等于∂z/∂x+∂z/∂y,是等于(
dz=2e^(2x+y^2)dx+2ye^(2x+y^2)dy把对x和对y的偏导分别求了出来再乘以各自的微分项即可.
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
dz=1/y/(1+x^2/y^2)*dx-x/y^2/(1+x^2/y^2)*dy
dz=1/(1+(x/1+y^2)^2)*(dx/1+y^2)-1/(1+(x/1+y^2)^2)*x*(2ydy/1+y^2)^2
先求出z对x和y的偏导数分别是1/y,-x/y^2所以dz=(1/y)*dx-(x/y^2)*dy
2^(x^2+y^2)*In2*(2xdx+2ydy)
dz=2xydx+x^2dy再问:有全过程吗再答:en我想知道这里的X^2Y是指的X得平方乘以Y吗?如果是过程如下:dz/dx=2xydz/dy=x^2dz=2xydx+x^2dy再问:是X的2Y次方
dz=(y+1/y)dx+(x-x/y^2)dy