gyrovector |
gyrodiagonal |
In mathematics|lang=en terms the difference between gyrovector and gyrodiagonal
is that
gyrovector is (mathematics) a type of vector for which addition is defined by a formula that satisfies the axioms for a gyrogroup while
gyrodiagonal is (mathematics) a diagonal in gyrovector space.
As nouns the difference between gyrovector and gyrodiagonal
is that
gyrovector is (mathematics) a type of vector for which addition is defined by a formula that satisfies the axioms for a gyrogroup while
gyrodiagonal is (mathematics) a diagonal in gyrovector space.
diagonal |
gyrodiagonal |
As nouns the difference between diagonal and gyrodiagonal
is that
diagonal is something arranged diagonally or obliquely while
gyrodiagonal is (mathematics) a diagonal in gyrovector space.
As an adjective diagonal
is (geometry) joining two nonadjacent vertices (of a polygon or polyhedron).
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.
