by 
pudzey101
ANSWERS: 10
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The Goldbach Conjecture has remained unsolved since 1742. I think that wins.
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1x0=1 :0
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is 2.5 odd or even?
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Any number of unsolved problems would fit the bill. Who knows if one is proved tomorrow or thousands of years from now. Goldbach conjecture was already said, Riemann hypothesis, problems involving complexity ie polynomial vs exponential time.
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Goldbach conjecture has been mentioned and it's a good one because it's so easy to understand yet so hard to prove. Is every even number greater than 2 the sum of two primes? But another one which is easy to understand is the Collatz conjecture. Think of a number (a positive integer). If it's odd, muliply by three and add one. If it's even, divide by two. Repeat this proces. Example: 3 becomes 10 becomes 5 becomes 16 becomes 8 becomes 4 becomes 2 becomes 1. Do you always reach 1 at some point? Or are there any numbers which never reach 1? Unsolved!
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I would imagine the one for unified field theory.
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There is no definite mathematics problem that can be conclusively 'termed' the hardest maths question ever. This is because there is a huge list of unsolved problems that could all be viable for this title, some of these 'INSANE' Mathematics problems are some of those found in the Clay's Institutes Millenium Prize questions of 7, only one has been solved. However, there are some other extremely difficult ones, e.g. If an integer n is greater than 2, then the equation an + bn = cn has no solutions in non-zero integers a, b, and c. (Fermat's Last Theorem), or other more difficult yet, solveable questions for those who wish to try them. Could be: find the Integral for pi/4 to 0 of root tanx
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Here it is: "maths"-"s"=correct English!
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Number 15 on my last Algebra test. I totally blew it.
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165493456792+3444456992812x(256789345-45678923)+z = ? z=678894456672345679911233
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