设二元函数z=f(xy,x y),f具有二阶连续偏导数
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设u=xy,v=lnx+g(xy),则x(∂z/∂x)-y(∂z/∂y)=∂f/∂v.原因如下:dz=(∂f/
设u=xy^2;v=x^2y;二阶偏导数:(f'u)*y^2+2(f'u)xy+2(f'v)xy+(f'v)x^2不好好学习啊同志再问:哥们你能上一下步骤求图求真相再答:这就是步骤,这就是答案啊,再问
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
对方程两边求全微分得:(e^z-1)dz+y^3dx+3xy^2dy=0(方法和求导类似)移项,有dz=-(y^3dx+3xy^2dy)/(e^z-1)
e^z-z+xy^3=0偏z/偏x:z'e^z-z'+y^3=0y^3=z'(1-e^z)z'=y^3/(1-e^z)偏z/偏y:z'e^z-z'+3xy^2=0z'=3xy^2/(1-e^z)偏z/
已知二元函数z=f[x²-y²,e^(xy)]求∂²z/∂x∂y设z=f(u,v),u=x²-y²,v=e^(xy
令G(X,Y,Z)=F(xy,z-2x)GZ'=F'2GX'=yF'1-2F'2∂z/∂x=-GX'/GZ'=(2F'2-yF'1)/F'2Gy'=xF'1∂z/&
∵z=f(x,xy),令u=x,v=xy∴∂z∂x=f′1+yf′2∴∂2z∂x∂y=∂∂y(f′1+yf′2)=∂f′1∂y+∂∂y(yf′2)═(∂f′1∂u∂u∂y+∂f′1∂v∂v∂y)+f′
求二元函数全微分z=f[x²-y²,e^(xy)]设z=f(u,v),u=x²-y²,v=e^(xy)则dz=(∂f/∂u)du+(
设u=xy,v=y/x,则z=f(u,v),所以ðz/ðx=f'1*ðu/ðx+f'2*ðv/ðx=yf'1-yf'2/x^2,注意到f'1
你想说这个问题?z=e^(x^2+2xy)应该是y=e^(x^2+2xy)(2x+2y)i+e^(x^2+2xy)2xj
当点(x,y)沿x轴和y轴趋于(0,0)时,f(z)的极限都是0.但它沿直线y=mx趋于(0,0)时,limf(x,y)=lim(mx*x/(x*x+m*m*x*x))=m/(1+m*m),对于不同的
(z对x的偏导)=y+F(u)+x[F'(u)(-y/x^2)](z对y的偏导)=x+F'(u)/x代入,左边=[xy+xF(u)-yF'(u)]+[xy+yF'(u)]=xy+xF(u)+xy=z+
令u=xy,v=e^(x+y)Z'x=Z'u*U'x+Z'v*V'x=f'u*y+f'v*e^(x+y)Z'y=Z'u*U'y+Z'v*V'y=f'u*x+f'v*e^(x+y)
dz=[yIn(xy)+y]dx+[xIn(xy)+x]dy分开求导
求二元函数全微分z=f[x²-y²,e^(xy)]设z=f(u,v),u=x²-y²,v=e^(xy)则dz=(∂f/∂u)du+(
2z=2x^22xy2Y^2-2x-2y=(x^22xyy^2)(x^2-2x)(y^2-2y)2z2=(x^22xyy^2)(x^2-2x1)(y^2-2y1)=(xy)^2(x-1)^2(y-1)
答:f(x,y)=3xy/(x^2+y^2)f(y/x,1)=3*(y/x)*1/[(y/x)^2+1^2]=(3y/x)/[(y^2+x^2)/x^2]=3xy/(x^2+y^2)=f(x,y)x≠