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Given a fair coin (0/1), how do you simulate fair dice(0 to 5) Obvious answer I know is toss 3 times, treat each toss as a bit to produce (2^3 = 0 to 7) If result == 7, discard and repeat.

Well, theoretically worst case big-O of this is really bad (another question in itself, something to do with monte-carlo algos). Lets keep this soln on shelf.

So now my question is, Is there/can there be n number of coin toss that can guarantee simulation of dice ? Of course if exists would like to know minimum number of tosses. :)

In absence of a number that is both divisible by three and 2^n, I couldnt think of any way to solve this. :(

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closed as off topic by AVD, Michael Petrotta, CoolBeans, yoda, Bill the Lizard Aug 17 '11 at 3:23

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sounds like an assignment question... what programming language do you want to use? – Raptor Aug 17 '11 at 2:45
    
Don't you mean divisible by 6 and 2^n? Do you know for a fact a better solution than this exists? – GBa Aug 17 '11 at 2:52
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Shouldn't result == 7 be result >= 6 ? – freiheit Aug 17 '11 at 3:08
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Great, can't post my answer. Comment instead: This is impossible. For n tosses, there are m = 2^n possible results. Getting a fair roll requires that there are an even number of results we could assign to each face of the die -- i.e., of the m results m/6 of those should represent each face of the die. But 2^n is not evenly divisible by 6, thus there cannot be a fair solution for fixed n. – Matthew Read Aug 17 '11 at 3:31
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OMG ! How is NOT A ALGORITHM QUESTION ? Did I have to put "Write a program in C++ " to output 0to6 with equal probability given a function that could return 0 or 1 ??? – Ajeet Aug 17 '11 at 5:41