294 (number)
Original version was mathematically and grammatically incorrect. "267 isomorphic groups" doesn't make sense--it's the exact opposite, there are 267 *non-isomorphic* groups, when groups are considered up to isomorphism. The short sentence explaining what an isomorphism is didn't make sense and was out of place, so I deleted it.
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*11115² - 294² = 123456789 |
*11115² - 294² = 123456789 |
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*The Magic Inscribed Lotus was created by Nārāyaṇa, and Indian Mathematician in the [[14th century]]. In this inscription, each group of 12 numbers has a sum of 294. It was constructed with a 12 x 4 [[magic rectangle]].{{Cite web|url=https://archimedes-lab.org/2020/12/20/magic-inscribed-lotus/|title=Magic Inscribed Lotus information|website=archimedes-lab.org|first=Gianni|last=Sarcone|date=December 20, 2020}} |
*The Magic Inscribed Lotus was created by Nārāyaṇa, and Indian Mathematician in the [[14th century]]. In this inscription, each group of 12 numbers has a sum of 294. It was constructed with a 12 x 4 [[magic rectangle]].{{Cite web|url=https://archimedes-lab.org/2020/12/20/magic-inscribed-lotus/|title=Magic Inscribed Lotus information|website=archimedes-lab.org|first=Gianni|last=Sarcone|date=December 20, 2020}} |
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*In 1930, George A. Miller determined that there are 294 |
*In 1930, George A. Miller determined that there are 294 groups of order 64 up to [[Group isomorphism|isomorphism]]. This was later disproven; there are 267 groups of order of 64 up to isomorphism. See [[List of incomplete proofs]].{{Cite web|url=https://www.nasonline.org/publications/biographical-memoirs/memoir-pdfs/miller-george-a.pdf|website=www.nasonline.org|title=George A. Miller information}}{{Cite web|url=https://mathworld.wolfram.com/Isomorphism.html4|title=Isomorphism information|website=mathworld.wolfram.com}} |
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== References == |
== References == |
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