Talk:Jordan-Pólya numbers: Difference between revisions
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== Factoring the 1050th number == |
== Factoring the 1050th number == |
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The 1050th jp number is 139,345,920,000. One and I suspect the only possible factorisation is 7! * 5!^3 * 2!^4, but the Phix/Julia/Wren entries are not getting that. I have thought of a better strategy, based on the prime powers, but it would naturally produce the ''lowest'' factorials - I ''think'' I might have just thought of a way to convert that to the highest factorials... |
The 1050th jp number is 139,345,920,000. One and I suspect the only possible factorisation is 7! * 5!^3 * 2!^4, but the Phix/Julia/Wren entries are not getting that. I have thought of a better strategy, based on the prime powers, but it is not straightforward and would naturally produce the ''lowest'' factorials - I ''think'' I might have just thought of a way to convert that to the highest factorials... Some examples: |
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<pre> |
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92,160 = 6! * 2!^7, or |
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92,160 = 5! * 3! * 2!^7 |
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18,345,885,696 = 4!^7 * 2!^2, or |
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18,345,885,696 = 3!^7 * 2!^16 |
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139,345,920,000 = 7! * 5!^3 * 2!^4 (only one?) |
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18,345,885,696 = 4!^7 * 2!^2, or |
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18,345,885,696 = 3!^7 * 2!^16 |
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724,775,731,200 = 6! * 5! * 2!^23, or |
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724,775,731,200 = 5!^2 * 3! * 2!^23 |
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9,784,472,371,200 = 6!^2 * 4!^2 * 2!^15, or |
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9,784,472,371,200 = 5!^2 * 3!^4 * 2!^19 |
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439,378,587,648,000 = 14! * 4!^2 * 2!^15 (only one?) |
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7,213,895,789,838,336 = 4!^8 * 2!^16, or |
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7,213,895,789,838,336 = 3!^8 * 2!^32 |
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</pre> |
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--[[User:Petelomax|Petelomax]] ([[User talk:Petelomax|talk]]) 23:52, 9 June 2023 (UTC) |