Answer to Question #231422 in Complex Analysis for Praise Johnwest

Question #231422

prove that the function u = 2x (1-y) is harmonic

Expert's answer

"u=2x(1-y)"

"\\dfrac{\\partial u}{\\partial x}=2(1-y)"

"\\dfrac{\\partial^2 u}{\\partial x^2}=0"

"\\dfrac{\\partial u}{\\partial y}=-2x"

"\\dfrac{\\partial^2 u}{\\partial y^2}=0"

"\\nabla^2u(x,y)=\\dfrac{\\partial^2 u}{\\partial x^2}+\\dfrac{\\partial^2 u}{\\partial y^2}"

"=0+0=0"

Then the function "u = 2x (1-y)" is harmonic.

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