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What is the Welsh for space?
Lle (place) Gwagle (space, void) Gofod (space) Encyd (space; while) Ysbaid (space of time)
What are the roles of the space shuttle and the space station in space programs?
they both can be used in space to do missions
How can you compare a contrast a space shuttle and a space station?
They both start with space and they both can be in space
Why do space shuttle float on space?
A space shuttle is able to float because there is no gravity in space.
Is Skylab a space probe a space station or a space shuttle?
it was also in the earlyer (not shuttle) missions
What is an affine group?
An affine group is the group of all affine transformations of a finite-dimensional vector space.
What is an affine combination?
An affine combination is a linear combination of vectors in Euclidian space in which the coefficients add up to one.
Who invented affine space in linear algebra?
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.
What is an affine variety?
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.
When was Medicorophium affine created?
Medicorophium affine was created in 1859.
When was Agonum affine created?
Agonum affine was created in 1837.
When was Stylidium affine created?
Stylidium affine was created in 1845.
When was Pyropteron affine created?
Pyropteron affine was created in 1856.
What is an affine transformation?
An affine transformation is a linear transformation between vector spaces, followed by a translation.
What is an affine connection?
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.
What has the author M J Kallaher written?
M. J. Kallaher has written: 'Affine planes with transitive collineation groups' -- subject(s): Affine Geometry, Collineation
What does affine mean?
SENTENCE: That couple has an affinity for dancing.
