| 1. | The matrices are then kept to make additional prints for theaters.
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| 2. | Where, when viewed as matrices, is the inverse of.
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| 3. | The spinors are the column vectors on which these matrices act.
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| 4. | Pairwise counts are often displayed in matrices such as those below.
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| 5. | The converse is also true : orthogonal matrices imply orthogonal transformations.
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| 6. | Now consider orthogonal matrices with bottom right entry equal to 1.
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| 7. | The conclusion is that each M�bius transformation corresponds to two matrices.
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| 8. | The above generators are related to the Pauli matrices by and.
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| 9. | Hence, the skew-symmetric matrices form a vector space.
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| 10. | Both of these are much harder with matrices or Euler angles.
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