terms |
gyroparallelogram |
As nouns the difference between terms and gyroparallelogram
is that
terms is while
gyroparallelogram is (mathematics) a hyperbolic quadrilateral whose two gyrodiagonals intersect at their gyromidpoints, analogous to a parallelogram in euclidean space.
wikidiffcom |
gyroparallelogram |
As a noun gyroparallelogram is
(mathematics) a hyperbolic quadrilateral whose two gyrodiagonals intersect at their gyromidpoints, analogous to a parallelogram in euclidean space.
parallelogram |
gyroparallelogram |
As nouns the difference between parallelogram and gyroparallelogram
is that
parallelogram is (geometry) a convex quadrilateral in which each pair of opposite edges are parallel and of equal length while
gyroparallelogram is (mathematics) a hyperbolic quadrilateral whose two gyrodiagonals intersect at their gyromidpoints, analogous to a parallelogram in euclidean space.
gyromidpoint |
gyroparallelogram |
In mathematics|lang=en terms the difference between gyromidpoint and gyroparallelogram
is that
gyromidpoint is (mathematics) a midpoint in gyrovector space while
gyroparallelogram is (mathematics) a hyperbolic quadrilateral whose two gyrodiagonals intersect at their gyromidpoints, analogous to a parallelogram in euclidean space.
As nouns the difference between gyromidpoint and gyroparallelogram
is that
gyromidpoint is (mathematics) a midpoint in gyrovector space while
gyroparallelogram is (mathematics) a hyperbolic quadrilateral whose two gyrodiagonals intersect at their gyromidpoints, analogous to a parallelogram in euclidean space.
intersect |
gyroparallelogram |
In mathematics|lang=en terms the difference between intersect and gyroparallelogram
is that
intersect is (mathematics) of two sets, to have at least one element in common while
gyroparallelogram is (mathematics) a hyperbolic quadrilateral whose two gyrodiagonals intersect at their gyromidpoints, analogous to a parallelogram in euclidean space.
As a verb intersect
is to cut into or between; to cut or cross mutually; to divide into parts.
As a noun gyroparallelogram is
(mathematics) a hyperbolic quadrilateral whose two gyrodiagonals intersect at their gyromidpoints, analogous to a parallelogram in euclidean space.
gyrodiagonal |
gyroparallelogram |
In mathematics|lang=en terms the difference between gyrodiagonal and gyroparallelogram
is that
gyrodiagonal is (mathematics) a diagonal in gyrovector space while
gyroparallelogram is (mathematics) a hyperbolic quadrilateral whose two gyrodiagonals intersect at their gyromidpoints, analogous to a parallelogram in euclidean space.
As nouns the difference between gyrodiagonal and gyroparallelogram
is that
gyrodiagonal is (mathematics) a diagonal in gyrovector space while
gyroparallelogram is (mathematics) a hyperbolic quadrilateral whose two gyrodiagonals intersect at their gyromidpoints, analogous to a parallelogram in euclidean space.
quadrilateral |
gyroparallelogram |
As nouns the difference between quadrilateral and gyroparallelogram
is that
quadrilateral is a polygon with four sides while
gyroparallelogram is (mathematics) a hyperbolic quadrilateral whose two gyrodiagonals intersect at their gyromidpoints, analogous to a parallelogram in euclidean space.
As an adjective quadrilateral
is having four sides.
hyperbolic |
gyroparallelogram |
As an adjective hyperbolic
is of or relating to hyperbole or
hyperbolic can be of or pertaining to a hyperbola.
As a noun gyroparallelogram is
(mathematics) a hyperbolic quadrilateral whose two gyrodiagonals intersect at their gyromidpoints, analogous to a parallelogram in euclidean space.