求由下列方程所确定的隐函数的微分或全微分:
(1)ey=xy,求dy;
(2)x2+y2+z2=xyz,求dz.
(1)令F(x,y)=ey-xy,则 ∂F/∂x=-y,∂F/∂y=ey-x 所以dy=-[(∂F/∂x)/ ∂F/∂y]dx =-[-y(ey-x)]dx =y/(ey-x)dx (2)令F(x,y,z)=x2+y2+z2-xyz,则 ∂F/∂x=2x-yz,∂F/∂y=2y-xz,∂F/∂z=2z-xy, 所以 ∂z/∂x=-[(∂F/∂x)/( ∂F/∂z)]=-[(2x-yz)/(2x-xy)=(2x-yz)/(xy-2z), ∂z/∂y=-[(∂F/∂y)/( ∂F/∂z)]=-[(2y-xz)/(2z-xy)]=(2y-xz)/(xy-2z). 因此 dz=(∂z/∂x)x+(∂z/∂y)dy =[(2x-yz)/(xy-2z)]dx+[(2y-xz)/(xy-2z)]dy.
