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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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 4core 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 milehigh 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. 


You'll probably want to do this in a loop or recursively. the order of 2^{70} 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. 


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


The answer is simple. You're dealing with a Nsized 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 


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:


