SENTENCE: That couple has an affinity for dancing.
Affine means "assigning finite values to finite quantities", or, as a non-mathematical related noun, a relative by marriage.
Affinities is the plural form of the noun affinity. It is defined as a spontaneous or natural liking or sympathy someone or something.
An affine combination is a linear combination of vectors in Euclidian space in which the coefficients add up to one.
Euler introduced the term affine (Latin affinis, "related") in 1748 in his book "Introductio in analysin infinitorum." Felix Klein's Erlangen program recognized affine geometry as a generalization of Euclidean geometry.
Every plane has 3 or more. There is a projective (or affine) plane with only 3 points.
In ordinary geometry (as opposed to affine geometry), a plane MUST consist of an infinite set of points.
An infinite number in a Euclidean plane - which is the "normmal" plane. Some selected numbers in the finite or affine planes (but you need to be studying projective geometry to come across these).
An affine group is the group of all affine transformations of a finite-dimensional vector space.
Stylidium affine was created in 1845.
Medicorophium affine was created in 1859.
Agonum affine was created in 1837.
Pyropteron affine was created in 1856.
An affine space is a vector space with no origin.
An affine transformation is a linear transformation between vector spaces, followed by a translation.
An affine combination is a linear combination of vectors in Euclidian space in which the coefficients add up to one.
Euler introduced the term affine (Latin affinis, "related") in 1748 in his book "Introductio in analysin infinitorum." Felix Klein's Erlangen program recognized affine geometry as a generalization of Euclidean geometry.
M. J. Kallaher has written: 'Affine planes with transitive collineation groups' -- subject(s): Affine Geometry, Collineation
An affine variety is a set of points in n-dimensional space which satisfy a set of equations which have a polynomial of n variables on one side and a zero on the other side.
In the branch of mathematics called differential geometry, an affine connection is a geometrical object on a smooth manifold which connects nearby tangent spaces, and so permits tangent vector fields to be differentiated as if they were functions on the manifold with values in a fixed vector space.