| 41. | Let be an orthonormal basis of.
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| 42. | Completeness of an orthonormal system of vectors of a Hilbert space can be equivalently restated as:
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| 43. | We say that is an " orthonormal basis " for if it is a basis and
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| 44. | The two previous theorems raise the question of whether all inner product spaces have an orthonormal basis.
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| 45. | Every symmetric matrix is thus, up to choice of an orthonormal basis, a diagonal matrix.
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| 46. | The spherical harmonic functions form a complete orthonormal set of functions in the sense of Fourier series.
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| 47. | So is the kernel of the Fourier transform actually an orthonormal basis for L2 [ R ]?
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| 48. | Applying the Gram� Schmidt process to, there is a unique orthonormal basis and positive constants such that
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| 49. | Two vectors which are orthogonal and of length 1 are said to be " orthonormal ".
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| 50. | By additionally providing a start in, a starting point in and an initial positive orthonormal Frenet frame with
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