Given $a \equiv 1 \pmod{7}$, $b \equiv 2 \pmod{7}$, and $c \equiv 6 \pmod{7}$, what is the remainder when $a^{81} b^{91} c^{27}$ is divided by 7?

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asked Oct 9, 2018 62.4k views

5 votes

Given $a \equiv 1 \pmod{7}$, $b \equiv 2 \pmod{7}$, and $c \equiv 6 \pmod{7}$, what is the remainder when $a^{81} b^{91} c^{27}$ is divided by 7?

Mathematics
middle-school

Highpost asked

by Highpost

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2 Answers

4 votes

Answer:

5 (mod 7)

Explanation:

Freddy Benson answered Oct 11, 2018

by Freddy Benson

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6 votes

$\begin{cases}a\equiv1\pmod7\\b\equiv2\pmod7\\c\equiv6\pmod7\end{cases}$

$a^(81)\equiv1^(81)\equiv1\pmod7$

$b^(91)\equiv2^(91)\pmod7$

$2^(91)\equiv(2^3)^(30)*2^1\equiv8^(30)*2\pmod7$

$8\equiv1\pmod7$

$2\equiv2\pmod7$

$\implies2^(91)\equiv1^(30)*2\equiv2\pmod7$

$c^(27)\equiv6^(27)\pmod7$

$6^(27)\equiv(-1)^(27)\equiv-1\equiv6\pmod7$

$\implies a^(81)b^(91)c^(27)\equiv1*2*6\equiv12\equiv5\pmod7$