Find the least positive residues modulo 47 of 2^200. Help me please to solve this problem?

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Find the least positive residues modulo 47 of 2^200. Help me please to solve this problem?

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Answer 1 · 2018-04-11T18:24:56

$2^200 mod 47 = 18 mod 47$

Explanation:

There are probably more elegant ways to solve this problem, but we can make use of the fact that you are allowed to multiply across a modulo.

E.g., $2^4 = 16$ , so $2^4 mod 47 = 16$ . To find $2^8 mod 47$ use the fact that $2^8 = 2^4 * 2^4 = (16 * 16) mod 47 = 256 mod 47 = 21 mod 47$ .

We proceed in the following manner.
$2^5 mod 47 = 32 mod 47$
$2^10 mod 47 = (32 * 32) mod 47 = 37 mod 47$
$2^20 mod 47 = (37*37) mod 47 = 6 mod 47$
$2^40 mod 47 = (6*6) mod 47 = 36 mod 47$
$2^80 mod 47 = (36 * 36) mod 47 = 27 mod 47$
$2^160 mod 47 = (27*27) mod 47 = 24 mod 47$

Finally, since $2^200 = 2^160 * 2^40$
$2^200 mod 47 = (24 * 36) mod 47 = 18 mod 47$ .

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Find the least positive residues modulo 47 of 2^200. Help me please to solve this problem?

1 Answer

Explanation:

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