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$$a^7 \equiv a \pmod {42}.$$ There is no use telling you all what and how much I tried because I cannot even understand the problem itself left alone attempting it.

Prove that $ (\mathbb {Z}_n , +)$, the integers $\pmod {n}$ under addition, is a group. To show that this is a group, I know I need to show three things (in our text, we do not need to show …

Nov 27, 2025 · By the Chinese remainder theorem, $x^n\equiv x\pmod n$ if and only if the congruences $x^n\equiv x\pmod {p_j^ {r_j}}$ are simultaneously true for $1\le j\le m$.

Nov 20, 2020 · \pmod{m} will produce the parenthetical version of the mod operator (you don’t need to add parentheses); \bmod will produce the “mod” operator. \mod is the worst of the …

Jul 4, 2015 · Usually the parenthesized $\pmod y$ goes at the right of the line, right-justified. So it is a qualifier which tells you which equivalence relation is intended.

What does $ a \pmod b$ mean? Ask Question Asked 11 years, 7 months ago Modified 11 years, 7 months ago

Oct 10, 2013 · 3x $\equiv$ 7 (mod 11) and 5y $\equiv$ 9 (mod 11) 3x $\equiv$ 18 (mod 11) by adding 11 to 7, then 5y $\equiv$ 20 (mod 11) by add 11 to 9. x $\equiv$ 6 (mod 11) by dividing …

Aug 8, 2013 · What integers have order $6 \pmod {31}$? Ask Question Asked 12 years, 4 months ago Modified 12 years, 4 months ago

Aug 4, 2020 · This question was proposed in an Elementary number theory textbook I own. The question stated for the conditions needed such that $x^x \\equiv c\\pmod p$, where $p ...