设函数u=√(x2+y2+z2)，证明此函数满足等式∂2u/∂x2+∂2u/∂y

设函数u=√(x²+y²+z²)，证明此函数满足等式
∂²u/∂x²+∂²u/∂y²+∂²u/∂z²=2/u
【正确答案】：u=√(x²+y²+z²) ∴∂u/∂x=1/2•[2x/√(x²+y²+z²)]=x/√(x²+y²+z²) ∂²u/∂x²=[√(x²+y²+z²)-x²/ √(x²+y²+z²)]/(x²+y²+z²) ∂u/∂y=1/2•[2y/√(x²+y²+z²)]=xy/√(x²+y²+z²) ∂²u/∂y²=[√(x²+y²+z²)-y²/ √(x²+y²+z²)]/(x²+y²+z²) ∂u/∂z=1/2•[2z/√(x²+y²+z²)]=z/√(x²+y²+z²) ∂²u/∂y²=[√(x²+y²+z²)-z²/ √(x²+y²+z²)]/(x²+y²+z²) ∴∂²u/∂x²+∂²u/∂y²+∂²u/∂z² =2√(x²+y²+z²)/(x²+y²+z²)=2/u