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In the sequence of all integers, there are arbitrary long runs with no primes. Yes, indeed. The basic construction constriction starts with factorial. As we know, N! = 1*2*3*4*...*N is the product of all integers from 1 through N. By definition, N! is divisible by every integer not exceeding N. Also, in general, a common divisor of any two numbers a and b divides their sum as well. Thus equipped, we may claim that
N! + 2 is divisible by 2 It follows that (N-1) consecutive numbers (N! + 2), (N! + 3), ..., (N! + N) are all composite. N! grows astronomically fast. 10! = 3628800. 70! is larger than the Googol, which is a 1 followed by 100 zeros. 100! is a number with 158 digits. So we are fortunate to have a short and handy notation for this number. Factorials are indeed used everywhere in Mathematics. Their appearance in the Binomial Theorem and Taylor series would alone justify a special notation for this product. The word "factorial" is in use from 1800 and the notation N! from 1808. Here is a problem that puts to test your understanding of this notation. ProblemFind integer m,n,k such that m!n! = k!. SolutionRemeber the recursive formula for factorials: Well, it's all here. Choose m arbitrarily and let N = m!, n = N-1, and k = N. Written explicitly, m!*(m! - 1)! = (m!)!. Reference
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