It belongs to the class of saddle surfaces, and its name derives from the observation that a saddle for a monkey would require two depressions for the legs and one for the tail. The point on the monkey saddle corresponds to a degenerate critical point of the function at . The monkey saddle has an isolated umbilical point with zero Gaussian curvature at the origin, while the curvature is strictly negative at all other points.
One can relate the rectangular and cylindrical equations using complex numbers
By replacing 3 in the cylindrical equation with any integer one can create a saddle with depressions.
[1]
Another orientation of the monkey saddle is the Smelt petal defined by so that the z-axis of the monkey saddle corresponds to the direction in the Smelt petal.[2][3]
^J., Rimrott, F. P. (1989). Introductory Attitude Dynamics. New York, NY: Springer New York. p. 26. ISBN9781461235026. OCLC852789976.{{cite book}}: CS1 maint: multiple names: authors list (link)
^Chesser, H.; Rimrott, F.P.J. (1985). Rasmussen, H. (ed.). "Magnus Triangle and Smelt Petal". CANCAM '85: Proceedings, Tenth Canadian Congress of Applied Mechanics, June 2-7, 1985, the University of Western Ontario, London, Ontario, Canada.