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coords

coordinate systems supported in Maple

Description

•	At present, Maple supports the following coordinate systems:

In three dimensions - bipolarcylindrical, bispherical, cardioidal, cardioidcylindrical, casscylindrical, confocalellip, confocalparab, conical, cylindrical, ellcylindrical, ellipsoidal, hypercylindrical, invcasscylindrical, invellcylindrical, invoblspheroidal, invprospheroidal, logcoshcylindrical, logcylindrical, maxwellcylindrical, oblatespheroidal, paraboloidal, paraboloidal2, paracylindrical, prolatespheroidal, rectangular, rosecylindrical, sixsphere, spherical, tangentcylindrical, tangentsphere, and toroidal.

In two dimensions - bipolar, cardioid, cassinian, cartesian, elliptic, hyperbolic, invcassinian, invelliptic, logarithmic, logcosh, maxwell, parabolic, polar, rose, and tangent.

•

NOTE that only the positive roots have been used for the following transformations: (in three dimensions) casscylindrical, confocalellip, confocalparab, conical, ellipsoidal, hypercylindrical, invcasscylindrical, paraboloidal2, rosecylindrical; (in two dimensions) cassinian, hyperbolic, invcassinian, and rose.

•	The conversions from the various coordinate systems to cartesian coordinates in 3-space

$(u, v, w) \to (x, y, z)$

are given as follows (note that the author is indicated where necessary):

bipolarcylindrical: (Spiegel)

$x = \frac{a \sinh (v)}{\cosh (v) - \cos (u)}$

$y = \frac{a \sin (u)}{\cosh (v) - \cos (u)}$

$z = w$

bispherical:

$x = \frac{\sin (u) \cos (w)}{d}$

$y = \frac{\sin (u) \sin (w)}{d}$

$z = \frac{\sinh (v)}{d}$ where $d = \cosh (v) - \cos (u)$

cardioidal:

$x = \frac{u v \cos (w)}{{(u^{2} + v^{2})}^{2}}$

$y = \frac{u v \sin (w)}{{(u^{2} + v^{2})}^{2}}$

$z = \frac{u^{2} - v^{2}}{2 {(u^{2} + v^{2})}^{2}}$

cardioidcylindrical:

$x = \frac{u^{2} - v^{2}}{2 {(u^{2} + v^{2})}^{2}}$

$y = \frac{u v}{{(u^{2} + v^{2})}^{2}}$

$z = w$

casscylindrical: (Cassinian-oval cylinder)

$x = \frac{a \sqrt{2} \sqrt{\sqrt{{&ExponentialE;}^{2 u} + 2 {&ExponentialE;}^{u} \cos (v) + 1} + {&ExponentialE;}^{u} \cos (v) + 1}}{2}$

$y = \frac{a \sqrt{2} \sqrt{\sqrt{{&ExponentialE;}^{2 u} + 2 {&ExponentialE;}^{u} \cos (v) + 1} - {&ExponentialE;}^{u} \cos (v) - 1}}{2}$

$z = w$

confocalellip: (confocal elliptic)

$x = \sqrt{\frac{(a^{2} - u) (a^{2} - v) (a^{2} - w)}{(a^{2} - b^{2}) (a^{2} - c^{2})}}$

$y = \sqrt{\frac{(b^{2} - u) (b^{2} - v) (b^{2} - w)}{(- a^{2} + b^{2}) (b^{2} - c^{2})}}$

$z = \sqrt{\frac{(c^{2} - u) (c^{2} - v) (c^{2} - w)}{(- a^{2} + c^{2}) (- b^{2} + c^{2})}}$

confocalparab: (confocal parabolic)

$x = \sqrt{\frac{(a^{2} - u) (a^{2} - v) (a^{2} - w)}{- a^{2} + b^{2}}}$

$y = \sqrt{\frac{(b^{2} - u) (b^{2} - v) (b^{2} - w)}{- a^{2} + b^{2}}}$

$z = \frac{a^{2}}{2} + \frac{b^{2}}{2} - \frac{u}{2} - \frac{v}{2} - \frac{w}{2}$

conical:

$x = \frac{u v w}{a b}$

$y = \frac{u \sqrt{\frac{(- b^{2} + v^{2}) (b^{2} - w^{2})}{a^{2} - b^{2}}}}{b}$

$z = \frac{u \sqrt{\frac{(a^{2} - v^{2}) (a^{2} - w^{2})}{a^{2} - b^{2}}}}{a}$

cylindrical:

$x = u \cos (v)$

$y = u \sin (v)$

$z = w$

ellcylindrical: (elliptic cylindrical)

$x = a \cosh (u) \cos (v)$

$y = a \sinh (u) \sin (v)$

z = w

ellipsoidal:

$x = \frac{u v w}{a b}$

$y = \frac{\sqrt{\frac{(- b^{2} + u^{2}) (- b^{2} + v^{2}) (b^{2} - w^{2})}{a^{2} - b^{2}}}}{b}$

$z = \frac{\sqrt{\frac{(- a^{2} + u^{2}) (a^{2} - v^{2}) (a^{2} - w^{2})}{a^{2} - b^{2}}}}{a}$

hypercylindrical: (hyperbolic cylinder)

$x = \sqrt{\sqrt{u^{2} + v^{2}} + u}$

$y = \sqrt{\sqrt{u^{2} + v^{2}} - u}$

$z = w$

invcasscylindrical: (inverse Cassinian-oval cylinder)

$x = \frac{a \sqrt{2} \sqrt{\sqrt{{&ExponentialE;}^{2 u} + 2 {&ExponentialE;}^{u} \cos (v) + 1} + {&ExponentialE;}^{u} \cos (v) + 1}}{2 \sqrt{{&ExponentialE;}^{2 u} + 2 {&ExponentialE;}^{u} \cos (v) + 1}}$

$y = \frac{a \sqrt{2} \sqrt{\sqrt{{&ExponentialE;}^{2 u} + 2 {&ExponentialE;}^{u} \cos (v) + 1} - {&ExponentialE;}^{u} \cos (v) - 1}}{2 \sqrt{{&ExponentialE;}^{2 u} + 2 {&ExponentialE;}^{u} \cos (v) + 1}}$

$z = w$

invellcylindrical: (inverse elliptic cylinder)

$x = \frac{a \cosh (u) \cos (v)}{{\cosh (u)}^{2} - {\sin (v)}^{2}}$

$y = \frac{a \sinh (u) \sin (v)}{{\cosh (u)}^{2} - {\sin (v)}^{2}}$

$z = w$

invoblspheroidal: (inverse oblate spheroidal)

$x = \frac{a \cosh (u) \sin (v) \cos (w)}{{\cosh (u)}^{2} - {\cos (v)}^{2}}$

$y = \frac{a \cosh (u) \sin (v) \sin (w)}{{\cosh (u)}^{2} - {\cos (v)}^{2}}$

$z = \frac{a \sinh (u) \cos (v)}{{\cosh (u)}^{2} - {\cos (v)}^{2}}$

invprospheroidal: (inverse prolate spheroidal)

$x = \frac{a \sinh (u) \sin (v) \cos (w)}{{\cosh (u)}^{2} - {\sin (v)}^{2}}$

$y = \frac{a \sinh (u) \sin (v) \sin (w)}{{\cosh (u)}^{2} - {\sin (v)}^{2}}$

$z = \frac{a \cosh (u) \cos (v)}{{\cosh (u)}^{2} - {\sin (v)}^{2}}$

logcylindrical: (logarithmic cylinder)

$x = \frac{a \ln (u^{2} + v^{2})}{π}$

$y = \frac{2 a \arctan (\frac{v}{u})}{π}$

$z = w$

logcoshcylindrical: (ln cosh cylinder)

$x = \frac{a \ln ({\cosh (u)}^{2} - {\sin (v)}^{2})}{π}$

$y = \frac{2 a \arctan (\tanh (u) \tan (v))}{π}$

$z = w$

maxwellcylindrical:

$x = \frac{a (u + 1 + {&ExponentialE;}^{u} \cos (v))}{π}$

$y = \frac{a (v + {&ExponentialE;}^{u} \sin (v))}{π}$

$z = w$

oblatespheroidal:

$x = a \cosh (u) \sin (v) \cos (w)$

$y = a \cosh (u) \sin (v) \sin (w)$

$z = a \sinh (u) \cos (v)$

paraboloidal: (Spiegel)

$x = u v \cos (w)$

$y = u v \sin (w)$

$z = \frac{u^{2}}{2} - \frac{v^{2}}{2}$

paraboloidal2: (Moon)

$x = 2 \sqrt{\frac{(u - a) (a - v) (a - w)}{a - b}}$

$y = 2 \sqrt{\frac{(u - b) (b - v) (b - w)}{a - b}}$

$z = u + v + w - a - b$

paracylindrical:

$x = \frac{u^{2}}{2} - \frac{v^{2}}{2}$

$y = u v$

$z = w$

prolatespheroidal:

$x = a \sinh (u) \sin (v) \cos (w)$

$y = a \sinh (u) \sin (v) \sin (w)$

$z = a \cosh (u) \cos (v)$

rectangular:

$x = u$

$y = v$

$z = w$

rosecylindrical:

$x = \frac{\sqrt{\sqrt{u^{2} + v^{2}} + u}}{\sqrt{u^{2} + v^{2}}}$

$y = \frac{\sqrt{\sqrt{u^{2} + v^{2}} - u}}{\sqrt{u^{2} + v^{2}}}$

$z = w$

sixsphere: (6-sphere)

$x = \frac{u}{u^{2} + v^{2} + w^{2}}$

$y = \frac{v}{u^{2} + v^{2} + w^{2}}$

$z = \frac{w}{u^{2} + v^{2} + w^{2}}$

spherical:

$x = u \cos (v) \sin (w)$

$y = u \sin (v) \sin (w)$

$z = u \cos (w)$

tangentcylindrical:

$x = \frac{u}{u^{2} + v^{2}}$

$y = \frac{v}{u^{2} + v^{2}}$

$z = w$

tangentsphere:

$x = \frac{u \cos (w)}{u^{2} + v^{2}}$

$y = \frac{u \sin (w)}{u^{2} + v^{2}}$

$z = \frac{v}{u^{2} + v^{2}}$

toroidal:

$x = \frac{a \sinh (v) \cos (w)}{d}$

$y = \frac{a \sinh (v) \sin (w)}{d}$

$z = \frac{a \sin (u)}{d}$ where $d = \cosh (v) - \cos (u)$

•	The conversions from the various coordinate systems to cartesian (rectangular) coordinates in 2-space

$(u, v) \to (x, y)$

are given by:

bipolar: (Spiegel)

$x = \frac{\sinh (v)}{\cosh (v) - \cos (u)}$

$y = \frac{\sin (u)}{\cosh (v) - \cos (u)}$

cardioid:

$x = \frac{u^{2} - v^{2}}{2 {(u^{2} + v^{2})}^{2}}$

$y = \frac{u v}{{(u^{2} + v^{2})}^{2}}$

cartesian:

$x = u$

$y = v$

cassinian: (Cassinian-oval)

$x = \frac{a \sqrt{2} \sqrt{\sqrt{{&ExponentialE;}^{2 u} + 2 {&ExponentialE;}^{u} \cos (v) + 1} + {&ExponentialE;}^{u} \cos (v) + 1}}{2}$

$y = \frac{a \sqrt{2} \sqrt{\sqrt{{&ExponentialE;}^{2 u} + 2 {&ExponentialE;}^{u} \cos (v) + 1} - {&ExponentialE;}^{u} \cos (v) - 1}}{2}$

elliptic:

$x = \cosh (u) \cos (v)$

$y = \sinh (u) \sin (v)$

hyperbolic:

$x = \sqrt{\sqrt{u^{2} + v^{2}} + u}$

$y = \sqrt{\sqrt{u^{2} + v^{2}} - u}$

invcassinian: (inverse Cassinian-oval)

invelliptic: (inverse elliptic)

$x = \frac{a \cosh (u) \cos (v)}{{\cosh (u)}^{2} - {\sin (v)}^{2}}$

$y = \frac{a \sinh (u) \sin (v)}{{\cosh (u)}^{2} - {\sin (v)}^{2}}$

logarithmic:

$x = \frac{a \ln (u^{2} + v^{2})}{π}$

$y = \frac{2 a \arctan (\frac{v}{u})}{π}$

logcosh: (ln cosh)

$x = \frac{a \ln ({\cosh (u)}^{2} - {\sin (v)}^{2})}{π}$

$y = \frac{2 a \arctan (\tanh (u) \tan (v))}{π}$

maxwell:

$x = \frac{a (u + 1 + {&ExponentialE;}^{u} \cos (v))}{π}$

$y = \frac{a (v + {&ExponentialE;}^{u} \sin (v))}{π}$

parabolic:

$x = \frac{u^{2}}{2} - \frac{v^{2}}{2}$

$y = u v$

polar:

$x = u \cos (v)$

$y = u \sin (v)$

rose:

$x = \frac{\sqrt{\sqrt{u^{2} + v^{2}} + u}}{\sqrt{u^{2} + v^{2}}}$

$y = \frac{\sqrt{\sqrt{u^{2} + v^{2}} - u}}{\sqrt{u^{2} + v^{2}}}$

tangent:

$x = \frac{u}{u^{2} + v^{2}}$

$y = \frac{v}{u^{2} + v^{2}}$

•	The a, b, and c values in the above coordinate transformations can be given using the coordinate specification as a function, e.g., conical(a,b) or ellcylindrical(2). The values a, b, and c if necessary, should be specified. If not specified, the default values used are a = 1, b = 1/2, and c = 1/3.

References

Moon, P., and Spencer, D. E. Field Theory Handbook 2d ed. Berlin: Springer-Verlag, 1971.

Spiegel, Murray R. Mathematical Handbook Of Formulas And Tables. New York: McGraw-Hill, 1968.

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