Fermat’s Little Theorem states that if p is a prime number and a is an integer then ܽ ap is congruent to a modulo p . This result is of huge importance in elementary and algebraic number theory. This theorem has many interesting and sometimes unexpected proofs. One modern proof is based upon Euler’s phi function and Euler’s theorem.
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L. Sahoo, "A modern proof of fermat's little theorem", Journal of Ultra Scientist of Physical Sciences, Volume 32, Issue 1, Page Number 1-3, 2020Copy the following to cite this URL:
L. Sahoo, "A modern proof of fermat's little theorem", Journal of Ultra Scientist of Physical Sciences, Volume 32, Issue 1, Page Number 1-3, 2020Available from: http://ultraphysicalsciences.org/paper/1514/