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editthis seems pretty similar to the 24 game, where you try to make 24 using some set of operators and 4 random integers found by drawing 4 cards from a deck. anybody want to add something about the similarities?
33 = 4! + 4 + sqrt(4)/.4 --Bobbymcr 04:48, 5 August 2006 (UTC)
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edit39 and 41 are also the subjects of impossibility.
39 = 44 - sqrt(4)/.4 41 = 44 - sqrt(4/.4')
Where .4' means 4/9. ZtObOr 00:38, 6 October 2007 (UTC)
Integrals?
editCan I use integrals? For example, is allowed? --Aruseusu (talk) 20:07, 1 May 2009 (UTC)
123 hard?
editNot really: 123 = 44/.4' + 4! where .4' = .444... = 4/9 Mark314159 (talk) 11:31, 6 October 2010 (UTC)
Or 123 = (√4/.4)! + √(4/.4'). Definitely don't require those silly-looking nested roots.
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editWhat does "!" mean? Please help! — Preceding unsigned comment added by 24.63.195.130 (talk) 19:43, 7 June 2011 (UTC)
- " ! means factorial "
113, Wheeler, and fives
editCertain numbers, such as 113 and 123, are particularly difficult to solve under typical rules. For 113, Wheeler suggests Γ(Γ(4)) −(4! + 4)/4. But who is Wheeler? He is not mentioned elsewhere in the article.
Whoever he is, his solution to 113 uses the gamma function. I have long believed that 113 is impossible to obtain using the set of operations I was restricted to (essentially, all those listed in the article except gamma function and subfactorial) but has this ever been proved? (Annoyingly, the value 113/16 can be obtained with only three fours, but there seems to be no way to reach a solution for 113 from this.)
There is no indication in the article of why the five fives and six sixes variants are considered notable enough for so much space to be given to listing their solutions. Whereas four fours is an excellent recreation because it has enough scope to hold the solver's interest for a long time, while being restrictive enough to require a lot of creativity in solving the harder numbers, allowing five or six digits makes the lower numbers too easy, and the puzzle becomes only of interest to computer algorithmists.
However, four ones, four twos, four threes and four fives are all rather interesting variants, although all of them have a smaller range of obtainable values than four fours (because sqrt(4) is an integer, and 4! is small enough to be very useful). Four fives is solvable for all integers from 0 to 67 inclusive, and 67 requires a particularly cunning solution:
67 = (5! x .5...) + sqrt(.5.../5) 2.25.142.67 (talk) 15:56, 19 July 2011 (UTC)
113 = (4! + 4 + 4′) × 4, where 4′ is the multiplicative inverse of 4 (like -4 is the additive inverse of 4). — Preceding unsigned comment added by 117.19.167.29 (talk) 15:33, 24 August 2017 (UTC)
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editIs ( integer ) allowed, which provides 11 = 4 + 4 + 4 - ( integer ) ( sqrt ( sqrt ( 4 ) ) ) ? Reg nim (talk) 17:59, 5 November 2011 (UTC)
How about using just one 4?
editSee: Knuth on representing numbers with one four, also algorithms for one three (which is equivalent to one four). — Preceding unsigned comment added by Davidbak2 (talk • contribs) 06:09, 27 June 2012 (UTC)
- Very interesting! I support adding a mention of both in the article. --Waldir talk 20:15, 3 July 2012 (UTC)
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editWhy "sqrt" can be used, but "sqr" can't? — Preceding unsigned comment added by 140.113.136.218 (talk) 08:02, 15 April 2014 (UTC)
- Probably because the default notation for square roots is the radical symbol, while the default notation for squares is the number 2, raised. AltoStev (talk) 22:50, 27 November 2024 (UTC)