quaternions and spatial rotation造句

例句与造句

1. For the kinematics of rotation in three dimensions, see quaternions and spatial rotation.
2. Thus quaternions are a preferred method for representing spatial rotations  see quaternions and spatial rotation.
3. It is, in fact, already the subject of the article quaternions and spatial rotation.
4. :: Quaternions are used to represent rotations in 3D and 4D space-see Quaternions and spatial rotation.
5. The map from unit quaternions to rotations of 3D space described in quaternions and spatial rotation is also a universal cover.
6. It's difficult to find quaternions and spatial rotation in a sentence. 用quaternions and spatial rotation造句挺难的
7. By way of contrast he notes that Felix Klein appears not to look beyond the theory of Quaternions and spatial rotation.
8. Hence a selective merge of say, just the definition, to Versor or Quaternions and spatial rotation is an obvious alternative to deletion.
9. There's an article on quaternions and spatial rotation which may be helpful .-- talk ) 20 : 41, 6 March 2008 ( UTC)
10. Very similar formulas can be found in the article on quaternions and spatial rotations, which covers this from a purely mathematical viewpoint but does not cover electromagnetism.
11. There is a natural 2-to-1 homomorphism from the group of unit quaternions to the 3-dimensional rotation group described at quaternions and spatial rotations.
12. The diagram D 2 is two isolated nodes, the same as A 1 & cup; A 1, and this coincidence corresponds to the covering map homomorphism from SU ( 2 ) & times; SU ( 2 ) to SO ( 4 ) given by quaternion multiplication; see quaternions and spatial rotation.
13. The binary icosahedral group is most easily described concretely as a discrete subgroup of the unit quaternions, under the isomorphism \ operatorname { Spin } ( 3 ) \ cong \ operatorname { Sp } ( 1 ) where Sp ( 1 ) is the multiplicative group of unit quaternions . ( For a description of this homomorphism see the article on quaternions and spatial rotations .)
14. The binary tetrahedral group is most easily described concretely as a discrete subgroup of the unit quaternions, under the isomorphism \ operatorname { Spin } ( 3 ) \ cong \ operatorname { Sp } ( 1 ) where Sp ( 1 ) is the multiplicative group of unit quaternions . ( For a description of this homomorphism see the article on quaternions and spatial rotations .)
15. The binary octahedral group is most easily described concretely as a discrete subgroup of the unit quaternions, under the isomorphism \ operatorname { Spin } ( 3 ) \ cong \ operatorname { Sp } ( 1 ) where Sp ( 1 ) is the multiplicative group of unit quaternions . ( For a description of this homomorphism see the article on quaternions and spatial rotations .)
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