Sujet : Re: The "Strand" puzzle --- ( Continued Fractions using Lisp or Python? )
De : HenHanna (at) *nospam* devnull.tb (HenHanna)
Groupes : rec.puzzles sci.lang sci.mathDate : 31. Jul 2024, 06:27:23
Autres entêtes
Organisation : A noiseless patient Spider
Message-ID : <v8chvs$1ev72$1@dont-email.me>
References : 1 2 3 4
User-Agent : Mozilla Thunderbird
On 7/30/2024 2:38 PM, IlanMayer wrote:
On Mon, 29 Jul 2024 18:58:21 +0000, HenHanna wrote:
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On 7/26/2024 5:37 AM, IlanMayer wrote:
On Thu, 25 Jul 2024 19:07:56 +0000, HenHanna wrote:
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e.g. -------- For the (street) Numbers (1,2,3,4,5,6,7,8)
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(1,2,3,4,5) and (7,8) both add up to 15.
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“In a given street of houses with consecutive numbers between 50 and
500, find the house number, for which, the sum of numbers on the left is
equal to the sum of numbers on the right”
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Ramanujan and Strand Puzzle
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this was a very interesting puzzle tackled by the genius
Srinivasa Ramanujan. In the year 1914, P.C. Mahalanobis, a Kings
college student in England, got hold of a puzzle from the Strand
magazine.
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Solution found at:
https://ubpdqnmathematica.wordpress.com/2021/12/05/ramanujan-and- strand-puzzle/
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thanks!
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>>> So the solutions to the Strand puzzle can be found from the
continued fraction of \sqrt{2}, which _is_ satisfying simple.
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>>> Using Mathematica to look at the first 10 convergents
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---------- is this (also) easy to do using Lisp or Python???
This can be done with Python:
N = 10
a = 1
b = 1
print(str(a) + "/" + str(b))
for n in range(N):
temp = a + 2 * b
b = a + b
a = temp
print(str(a) + "/" + str(b))
thanks! i've been reading about Ramanujan for 30+ years
and a few days ago, i watched a clip by Cindy Pom that
taught me a few new key things... like ...
He was married to a young girl when he moved to England.
He didn't want to travel to England because...........
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in Ramanujan's 1st letter to Hardy
1-2+3-4+5-6= ............
Are there just 4 formulas like this? Or are there dozens more?