| 41. | Let " X " and " Y " be column vectors of factor loadings for two different samples.
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| 42. | So, instead of viewing the data as an array of rows, they are seen as an array of column vectors.
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| 43. | The convention is to use column vectors and ( therefore ) multiply with the matrix on the left and the vector on the right.
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| 44. | In an-dimensional Hilbert space, } } can be written as an column vector, and then is an matrix with complex entries.
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| 45. | The natural bias to read left-to-right, as subsequent transformations are applied in linear algebra, stands against column vector inputs.
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| 46. | The right hand side is, which is applied to the column vector "'b "'of the right hand sides.
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| 47. | The cross product of any two column vectors is normal to that plane, and is an Eigenvector of A for \ lambda _ i.
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| 48. | If a is a row vector of size [ 1 n ] and b is a corresponding column vector of size [ n 1 ].
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| 49. | As a matrix algebra, therefore, it acts on 2 " k "-dimensional column vectors ( with complex entries ).
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| 50. | And in turn, are column vectors ( the matrix transpose of these are row vectors ), and is the Lorentz factor of velocity.
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