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Question Number 184076 by liuxinnan last updated on 02/Jan/23

6647^3 mod10000=2023

$$\mathrm{6647}^{\mathrm{3}} {mod}\mathrm{10000}=\mathrm{2023} \\ $$

Commented by liuxinnan last updated on 02/Jan/23

maybe there are other number a^n mod10000=2023 n∈N n≥3 find more a and n

$${maybe}\:{there}\:{are}\:{other}\:{number} \\ $$$${a}^{{n}} {mod}\mathrm{10000}=\mathrm{2023} \\ $$$${n}\in\mathbb{N}\:{n}\geqslant\mathrm{3} \\ $$$${find}\:{more}\:{a}\:{and}\:{n} \\ $$

Commented by Rasheed.Sindhi last updated on 03/Jan/23

Surely 2023^1 mod 10000=2023 :) Happy New Year sir!

$$\left.\mathrm{Surely}\:\mathrm{2023}^{\mathrm{1}} \mathrm{mod}\:\mathrm{10000}=\mathrm{2023}\::\right) \\ $$$$\mathrm{Happy}\:\mathrm{New}\:\mathrm{Year}\:\mathrm{sir}! \\ $$

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