Plücker's conoid is a ruled surface sometimes also called the cylindroid, conical wedge, or conocuneus of Wallis. von Seggern (1993, p. 288) gives the general functional form as
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(1)
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whereas Fischer (1986) and Gray (1997) give
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(2)
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A polar parameterization therefore gives
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(3)
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(4)
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(5)
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The cylindroid is the inversion of the cross-cap (Pinkall 1986).
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A generalization of Plücker's conoid to 
folds is given by
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(6)
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(7)
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(8)
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(Gray 1997), which is a slight variation of the form called the "conical wedge" by von Seggern (1993, p. 302).
The coefficients of the first fundamental form of the generalized Plücker's conoid are
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(9)
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(10)
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 |  | ![1/2{2r^2+c^2n^2[1+cos(2nt)]}](/images/equations/PlueckersConoid/Inline28.svg) |
(11)
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and of the second fundamental form are
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(12)
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 |  | ![-(sqrt(2)cncos(nt))/(sqrt(2r^2+c^2n^2[1+cos(2nt)]))](/images/equations/PlueckersConoid/Inline34.svg) |
(13)
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 |  | ![-(sqrt(2)cn^2rsin(nt))/(sqrt(2r^2+c^2n^2[1+cos(2nt)])).](/images/equations/PlueckersConoid/Inline37.svg) |
(14)
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The Gaussian and mean curvatures are given by
 |  | ![-(4c^2n^2cos^2(nt))/({2r^2+c^2n^2[1+cos(2nt)]}^(3/2))](/images/equations/PlueckersConoid/Inline40.svg) |
(15)
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 |  | ![(sqrt(2)cn^2rsin(nt))/({2r^2+c^2n^2[1+cos(2nt)]}^(3/2)).](/images/equations/PlueckersConoid/Inline43.svg) |
(16)
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