设\(z =xlny\),\(x =u^2+v^2\),\(y =u^2-v^2\),则\( { { \partial z} \over {\partial v}} = \)( )。
A: \(2v\left[ {\ln ({u^2} +{v^2}) - \left( { { { { u^2} + {v^2}} \over { { u^2} - {v^2}}}} \right)} \right]\)
B: \(2v\left[ {\ln ({u^2} - {v^2})+ \left( { { { { u^2} + {v^2}} \over { { u^2} - {v^2}}}} \right)} \right]\)
C: \(2u\left[ {\ln ({u^2} - {v^2}) - \left( { { { { u^2} + {v^2}} \over { { u^2} - {v^2}}}} \right)} \right]\)
D: \(2v\left[ {\ln ({u^2} - {v^2}) - \left( { { { { u^2} + {v^2}} \over { { u^2} - {v^2}}}} \right)} \right]\)
A: \(2v\left[ {\ln ({u^2} +{v^2}) - \left( { { { { u^2} + {v^2}} \over { { u^2} - {v^2}}}} \right)} \right]\)
B: \(2v\left[ {\ln ({u^2} - {v^2})+ \left( { { { { u^2} + {v^2}} \over { { u^2} - {v^2}}}} \right)} \right]\)
C: \(2u\left[ {\ln ({u^2} - {v^2}) - \left( { { { { u^2} + {v^2}} \over { { u^2} - {v^2}}}} \right)} \right]\)
D: \(2v\left[ {\ln ({u^2} - {v^2}) - \left( { { { { u^2} + {v^2}} \over { { u^2} - {v^2}}}} \right)} \right]\)
举一反三
- 设\(z = {u^2}{\rm{ + }}{v^2}\),\(u = x + y\),\(v = x - y\),则\( { { \partial z} \over {\partial x}}=\) A: \(4y\) B: \(4x\) C: \(2(x+y)\) D: \(2(x-y)\)
- 实验命令“fsurf(@(u,v)2*u*sin(v),@(u,v)3*u*cos(v),@(u,v)u^2,[0,5,0,2*pi]), hold on, fsurf(@(u,v)0,3*u*cos(v),@(u,v)u^2,[0,5,0,2*pi])”的结果是【 】
- 函数 $y=5^{(3x+1)^2}$ 的复合过程为 ( ). A: $y=5^u, u=v^2, v=3x+1$ B: $y=u^2, u=5^v, v=3x+1$
- 实验命令“surf(@(u,v)2*u.*sin(v),@(u,v)3*u.*cos(v),@(u,v)u.^2,[0,5,0,2*pi])”表示【 】
- 函数 y = e^(sinx^2)是由哪几个函数复合而成? A: y=e^u, u=sinv, v=x B: y=e^u, u=v^2, v=sinx C: y=e^u, u=sinv, v=x^2 D: y=e^u, u=sinx