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Math / Discrete Mathematics and Its Applications 7 / Chapter 4.4 / Problem 1E

Discrete Mathematics and Its Applications | 7th Edition | ISBN: 9780073383095 | Authors: Kenneth Rosen

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Show that 15 is an inverse of 7 modulo 26.

Chapter 4, Problem 1E

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QUESTION:

Show that 15 is an inverse of 7 modulo 26.

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QUESTION:

Show that 15 is an inverse of 7 modulo 26.

ANSWER:

Step 1 of 2

In this question we have to show that 15 is an inverse of 7 modulo 26 .

Let \(\mathrm{a}\) and \(\mathrm{b}\) be the two integers such that

Such that \(\mathrm{a}\) and \(\mathrm{b}\) are inverses of each other

That is, \(a b=1(\bmod m)\)

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