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The function is .
Region bounded by the surface of square with vertices and .
Surface area:
If and its first partial derivative are continuous on the closed region in the -plane then the area of the surface is given by over is defined as
Surface area = .
=
Region bounded by the vertices of square:
The function is .
Apply partial derivative with respect to x.
Apply partial derivative with respect to y to the function .
Consider .
The surface area :
Integration formula: .
The surface area of the function is .
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