Saturday, June 20, 2015

Problems conceived by me

1. Recall the laws of divisibility by 2-11. Prove them.
2. Devise laws of remainders like "Remainder of a number by 2-11" etc...
    a. [Open problem] Devise law of remainder for 7.
3. Prove Fermat's little theorem,
         `a^p = a (mod p)` where `p` is a prime number.
4. For a number `N = \pi_{i=1}^k p_i^{e_i}`, given the prime number expansion, find out the sum of all factors of `N` (including `1` and `N` itself). Prove that it is,
         `\pi_{i=1}^k [(p_i^{e_i + 1} - 1)/(p_i - 1)]`
5. Sum of reciprocals of all factors of a number is given by,
         `\pi_{i=1}^k [(p_i - p_i^{-e_i})/(p_i - 1)]`.
6. Prove that for a number `N = \pi_{i=1}^k p_i^{e_i}`, the number of factors is given by
          `\pi_{i=1}^k (e_i + 1)`.
7. Only numbers having odd number of factors are ____________ numbers.
8. 

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