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Please note that the content of this book primarily consists of articles available from Wikipedia or other free sources online. In mathematics, the Weierstrass Enneper parameterization of minimal surfaces is a classical piece of differential geometry. Alfred Enneper and Karl Weierstrass studied minimal surfaces as far back as 1863. Let and g be functions on either the entire complex plane or the unit disk, where g is meromorphic and is analytic, such that wherever g has a pole of order m, f has a zero of order 2m (or equivalently, such that the product g2 is holomorphic), and let c1, c2, c3 be constants.