# How to calculate all possible results of a N-sized yes/no test? [closed]

I'm trying to calculate the possible results of a test with 70 questions. They're all bools. How to do that and how many calculations they have to be done.

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## closed as too localized by Coding Gorilla, Matten, Burkhard, Mike Christensen, carlosfigueiraNov 19 '12 at 16:23

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Your result is 2^70, assuming they're independent. –  carlosfigueira Nov 19 '12 at 16:16
They're independent. But can you show example how to calculate it? –  blez Nov 19 '12 at 16:17
And the generalization is: 2^N paths exists, given that the number of boolean questions is N. From someone over 1000 points, I wouldn't have expected such a question. –  ppeterka Nov 19 '12 at 16:19
this is basic statistical.. –  Tobia Zambon Nov 19 '12 at 16:19

You'll probably want to do this in a loop or recursively.

the order of 270 calculations have to be done, considering that's the number of possible tests.

OR maybe just 70 if you don't care about individual paths.

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If you mean you want to get the amount of bools that were true, assuming they are stored in an array, loop through them.

``````int score = 0;
for(int c = 0; c < boolArray.Length; c++)
{
if(boolArray[c])
{
score++;
}
}
// (Now you have the score)
``````

I'm not sure this exact code will work as I am not very familiar with c#, but you should get the point.

If you mean you want all the possibilities that the test could give you, its 2 ^ 70 (2 because a bool only holds two values, 70 because there are 70 bools).

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Well, if you need to run though every combination of 70 true/false values, that's around 2^70 = 1.18e21 = 1.18 sextillion combinations. If you could do one per clock cycle, a 4-core machine at 3 GHz would take 3000 years to compute all solutions. If you printed each result on 0.1mm thick paper, at 50 lines per page, the stack of paper would be over a trillion miles high (and you might think about the fact that a single mile-high stack of paper has over 16 million sheets, weighs 72 tonnes and takes over 1000 trees to make).

I would reconsider the method of analysing this problem.

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`+1` for the totally useless math.. –  Mike Christensen Nov 19 '12 at 16:39

Well, each result can be true or false, so there are 2^70 results altogether. (It's awfully a lot!)

If you really want to enumerate through all the results, you can do the following:

``````IEnumerable<IEnumerable<bool>> EnumerateResults()
{
var curr = new List<bool>();
for (var idx = 0; idx < 3; idx++) curr.Add(false);
while (!curr.All(v => v))
{
var idx = 0;
while (curr[idx]) // no index OOB, because of while condition
{
curr[idx] = false;
idx++;
}
curr[idx] = true;
yield return new List<bool>(curr); // clone
}
}
``````
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The answer is simple. You're dealing with a N-sized binary number. For example, a 4 question test, has 16 possibilities

0000 0001 0010 0011

0100 0101 0110 0111

1000 1001 1010 1011

1100 1101 1110 1111

For N, it's just 2^N

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