Answered: Let a, n be positive integers. Knowing…

Let a, n be positive integers. Knowing that 15a – 13n = 1, we deduce that the multiplicative inverse of a (mod n) is 15(mod n) O does not exist O None of the mentioned O is (n-13) (mod n)

Elements Of Modern Algebra

8th Edition

ISBN:9781285463230

Author:Gilbert, Linda, Jimmie

Publisher:Gilbert, Linda, Jimmie

Chapter2: The Integers

Section2.5: Congruence Of Integers

Problem 30E: 30. Prove that any positive integer is congruent to its units digit modulo .

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Question

Let a, n be positive integers. Knowing that 15a – 13n = 1, we deduce that the multiplicative
inverse of a (mod n)
is 15(mod n)
O does not exist
None of the mentioned
O is (n-13) (mod n)
2222 (mod 13) is equal to

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