z=u^2 v^2,u=x-y,v=x y
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由z=u²v²,其中u=x-y,v=x+y,题型:求复合函数的偏导数:z=(x-y)²(x+y)²,dz/dx=(x-y)²×2(x+y)+2(x-y
令u=x-y,v=y/xaz/ax=az/au×au/ax+az/av×av/ax=fu-y/x^2×fva^2z/axay=a(az/ax)/ay=a(fu-y/x^2×fv)/ay=a(fu)/a
令u=x/y,v=y/x,偏导z/x=fu(u,v)du/dx+fv(u,v)dv/dx=fu(u,v)1/y-fv(u,v)y/x^2偏导z/y=fu(u,v)du/dy+fv(u,v)dv/dy=
再问:请问怎么变形到4里面这样啊。。
dz/dx=dz/du*du/dx+dz/dv*dv/dx=vu^(v-1)+u^vlnu=(x-y)(x+2y)^(x-y-1)+(x+2y)^(x-y)ln(x+2y)dz/dy=dz/du*du
偏z/偏x=(偏z/偏f)*f'x=偏z/偏f*1=偏z/偏f;偏z/偏u=(偏z/偏f)*(偏f/偏u)+偏g/偏u+偏h/偏u.
z=(x+y)^2*cos(x^2*y^2)dz/dx=2*(x+y)*cos(x^2*y^2)-2*(x+y)^2*sin(x^2*y^2)*x*y^2dz/dy=2*(x+y)*cos(x^2*y
z=f(x,u),u=xy,求z对x的二阶偏导数∂z/∂x=∂f/∂x+(∂f/∂u)(∂u/∂x)=&
怎么是u-v啊?觉得应该是实部虚部是两个式子吧验证两者满足二维拉普拉斯方程后用柯西黎曼方程,然后求积分吧u-v的话我也看不懂…
v'y=2x,因此u'x=v'y=2x,积分得u=x^2+g(y),又由于u'y=-v'x,所以g'(y)=-2y,g(y)=-y^2+c,故u=x^2-y^2+c,f(z)=x^2-y^2+c+2i
az/ax=az/au+au/ax=2ulnv-y/x^2az/ay=az/av+av/ay=u^2/v+2y然后再稍微化简一下就行啦!再问:怎么简化啊。。。。我完全不会啊。。。再答:这里的u跟v应该
有些条件是多余的.由z-y²=u⁴,z+y²=v⁴相加得z=(u⁴+v⁴)/2≥u²v²(均值不等式).由v>u
symsuv;d=[-5:0.5:5];[uv]=meshgrid(d);x=u.*sin(v),y=u.*cos(v),z=u;surf(x,y,z)
σu/σx=(z+y)+x(σz/σx+0)=z+y+xcos(x+y)σ2u/σxσy=σz/σy+1-xsin(x+y)=cos(x+y)+1-xsin(x+y)
z=f(u,v),u=xy,v=x^2-y^2du/dx=y,du/dy=xdv/dx=2x,dv/dy=-2ydz/dx=dz/du*du/dx+dz/dv*dv/dx=df/du*y+df/dv*
2(x+y),2(x-y).下次弄个难点的
dz/dx=dz/du*(du/dx)=2u*1=2udz/dy=dz/du*(du/dy)=2u*1=2u和v没关系
①偏z/偏x=偏z/偏u偏u/偏x+偏z/偏v偏v/偏x=(2uv-v^2)siny+(2uv-v^2)cosy=(2x^2sinycosy-x^2(cosy)^2)siny+(2x^2sinycos
∂z/∂x=∂z/∂u*du/dx+∂z/∂v*dv/dx=1/(u^2+v)*2u+1/(u^2+v)*2xy∂z