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(34C) (11C) Summation of Infinite Alternating Series
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(34C) (11C) Summation of Infinite Alternating Series
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(34C) (11C) Summation of Infinite Alternating Series
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02-13-2021, 10:34 PM
Post: #5
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RE: (34C) (11C) Summation of Infinite Alternating Series
I have worked through this nice paper and algorithm too, many thanks Valentin!
(02-12-2021 03:04 PM)Albert Chan Wrote: We may apply Aitken Extrapolation, to slight improve estimate of s2 Very clever to think of that. I have one question. I would think that t[d+1]^2/(t[d+1] - t[d]) and (x[n+1]-x[n])^2/((x[n+1]-x[n])-(x[n]-x[n-1])) are related if terms x[] are extrapolated, but that is not the case? Shouldn't the formula be (t[d]+t[d+1])^2/(t[d+1]) since when d=2 for example t[2]=x[n+2]-x[n+1] and t[3]=x[n+3]-2x[n+2]+x[n+1]? How did you derive your formula? - Rob "I count on old friends to remain rational" |
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| Messages In This Thread |
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(34C) (11C) Summation of Infinite Alternating Series - Valentin Albillo - 02-10-2021, 06:04 PM
RE: (34C) Summation of Infinite Alternating Series - Albert Chan - 02-12-2021, 03:04 PM
RE: (34C) (11C) Summation of Infinite Alternating Series - Valentin Albillo - 02-13-2021, 05:51 PM
RE: (34C) (11C) Summation of Infinite Alternating Series - Albert Chan - 02-13-2021, 06:15 PM
RE: (34C) (11C) Summation of Infinite Alternating Series - robve - 02-13-2021 10:34 PM
RE: (34C) (11C) Summation of Infinite Alternating Series - Albert Chan - 02-13-2021, 11:30 PM
RE: (34C) (11C) Summation of Infinite Alternating Series - Albert Chan - 02-14-2021, 11:30 AM
RE: (34C) (11C) Summation of Infinite Alternating Series - robve - 02-16-2021, 01:57 AM
RE: (34C) (11C) Summation of Infinite Alternating Series - Thomas Klemm - 03-02-2022, 03:17 PM
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