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Title: Free Throws Post by THUDandBLUNDER on Dec 7th, 2004, 12:42am Shaq's coach has been keeping a record of the number S(N) of successful free throws he has made in his first N attempts of the season. Earlier in the season S(N) was less than 80% of N, but later in the season S(N) was more than 80% of N. Was there necessarily a time in between when S(N) was exactly 80% of N? |
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Title: Re: Free Throws Post by Icarus on Dec 7th, 2004, 12:40pm Yes: [hide]Let S, N be the values immediately before reaching or passing the 80% mark. Then 4N - 1 <= 5S < 4N. Since 5S is an integer, it must be the only integer in that range. I.e. 5S = 4N-1. So S+1 = (1/5)(4N-1) + 1 = 1/5 (4N-1+5) = 4/5 (N+1). [/hide] |
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Title: Re: Free Throws Post by Foolish on Dec 7th, 2004, 4:46pm Why does this work for 80% and not for all values? 35% for example 3/9 -> 4/10 skips over that value. 40% however, it seems to hold for. Is it the fact that .35 isn't made of prime/prime? There must be something underlying that I am missing. |
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Title: Re: Free Throws Post by THUDandBLUNDER on Dec 7th, 2004, 9:22pm on 12/07/04 at 16:46:08, Foolish wrote:
It works for all percentages of the form 1 - 1/k, where k is integer. |
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Title: Re: Free Throws Post by Foolish on Dec 7th, 2004, 9:35pm on 12/07/04 at 21:22:25, THUDandBLUNDER wrote:
Ah, that makes sense. Thanks :) |
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Title: Re: Free Throws Post by Barukh on Dec 8th, 2004, 2:08am on 12/07/04 at 21:22:25, THUDandBLUNDER wrote:
... and I think it has something to do with continued fractions. |
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