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A Minimal Surface given by the parametric equation
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![$\displaystyle \Re\left[{\sqrt{2}\cos({\textstyle{1\over 3}}\zeta)\sqrt{\cos({\textstyle{2\over 3}}\zeta)}\,}\right]$](l2_16.gif) |
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![$\displaystyle \Re\left[{-\sqrt{2}\cos({\textstyle{1\over 3}}\zeta)\sqrt{\cos({\textstyle{2\over 3}}\zeta)}\,}\right]$](l2_18.gif) |
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![$\displaystyle \Re\left[{-{\textstyle{1\over 3}}\sqrt{2}\,i\int_0^t {d\zeta\over \sqrt{\cos({\textstyle{2\over 3}}\zeta)}}}\right].$](l2_20.gif) |
References
do Carmo, M. P. ``The Helicoid.'' §3.5F in
Mathematical Models from the Collections of Universities and Museums (Ed. G. Fischer).
Braunschweig, Germany: Vieweg, p. 47, 1986.
Lichtenfels, O. von. ``Notiz über eine transcendente Minimalfläche.''
Sitzungsber. Kaiserl. Akad. Wiss. Wien 94, 41-54, 1889.