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Search: id:A117539
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| A117539 |
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Integrals of the absolute value of the Z function between successive zeros greater than or equal to the integral corresponding to 12. If we define the normalized Z function by z(x) = Z(2 pi x/ln(2)), then the 33rd and 34th zeros are approximately 11.82 and 12.25. Integrating |z(x)| between these values gives a quantity I and the above sequence is defined as the midpoints of all successive zeros of z(x) such that the integral of |z(x)| is greater than or equal to I. |
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4
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| 12, 19, 31, 41, 46, 53, 58, 65, 72, 77, 87, 94, 99, 103, 111
(list; graph; listen)
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