horocycle

Terms vs Horocycle - What's the difference?

As nouns the difference between terms and horocycle

is that terms is while horocycle is (geometry) a curve in hyperbolic geometry whose normals all converge asymptotically.

Horocycle vs Homocycle - What's the difference?

horocycle | homocycle |

As nouns the difference between horocycle and homocycle

is that horocycle is (geometry) a curve in hyperbolic geometry whose normals all converge asymptotically while homocycle is (inorganic chemistry) any inorganic compound based on a ring of three or more atoms of the same element.

Taxonomy vs Horocycle - What's the difference?

taxonomy | horocycle |

As nouns the difference between taxonomy and horocycle

is that taxonomy is the science or the technique used to make a classification while horocycle is (geometry) a curve in hyperbolic geometry whose normals all converge asymptotically.

Horocycle vs Horocyclic - What's the difference?

horocycle | horocyclic | Related terms |

Horocycle is a related term of horocyclic.

In geometry|lang=en terms the difference between horocycle and horocyclic

is that horocycle is (geometry) a curve in hyperbolic geometry whose normals all converge asymptotically while horocyclic is (geometry) relating to a set of points that are all equidistant (keeping other coordinates constant) from some constant point.

As a noun horocycle

is (geometry) a curve in hyperbolic geometry whose normals all converge asymptotically.

As an adjective horocyclic is

(geometry) relating to a set of points that are all equidistant (keeping other coordinates constant) from some constant point.

Asymptotic vs Horocycle - What's the difference?

asymptotic | horocycle |

As an adjective asymptotic

is (label) pertaining to values or properties approached at infinity.

As a noun horocycle is

(geometry) a curve in hyperbolic geometry whose normals all converge asymptotically.

Converge vs Horocycle - What's the difference?

converge | horocycle |

As a verb converge

is .

As a noun horocycle is

(geometry) a curve in hyperbolic geometry whose normals all converge asymptotically.

Normal vs Horocycle - What's the difference?

normal | horocycle |

As nouns the difference between normal and horocycle

is that normal is standard while horocycle is (geometry) a curve in hyperbolic geometry whose normals all converge asymptotically.

Geometry vs Horocycle - What's the difference?

geometry | horocycle |

As nouns the difference between geometry and horocycle

is that geometry is (mathematics|uncountable) the branch of mathematics dealing with spatial relationships while horocycle is (geometry) a curve in hyperbolic geometry whose normals all converge asymptotically.

Hyperbolic vs Horocycle - What's the difference?

hyperbolic | horocycle |

As an adjective hyperbolic

is of or relating to hyperbole or hyperbolic can be of or pertaining to a hyperbola.

As a noun horocycle is

(geometry) a curve in hyperbolic geometry whose normals all converge asymptotically.

Curve vs Horocycle - What's the difference?

curve | horocycle |

As a verb curve

is .

As a noun horocycle is

(geometry) a curve in hyperbolic geometry whose normals all converge asymptotically.