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If a Minimal Surface is given by the equation 
and 
has Continuous
first and second Partial Derivatives for all Real 
and 
, then is a
Plane.
References
Hazewinkel, M. (Managing Ed.). Encyclopaedia of Mathematics: An Updated and Annotated Translation
of the Soviet ``Mathematical Encyclopaedia.'' Dordrecht, Netherlands: Reidel, p. 369, 1988.