Đặt \(A=7.5^{2n}+12.6^n=7.25^n+12.6^n\)
Do \(25\equiv6\left(mod19\right)\Rightarrow25^n\equiv6^n\left(mod19\right)\)
\(\Rightarrow A\equiv7.6^n+12.6^n\left(mod19\right)\)
\(\Rightarrow A\equiv19.6^n\left(mod19\right)\)
Do \(19.6^n⋮19\Rightarrow A⋮19\)
A = 7.52n + 12.6n
A = 7.(52)n + 12.6n
A = 7.25n + 12.6n
25 \(\equiv\) 6 (mod 19)
25n \(\equiv\) 6n (mod 19)
7 \(\equiv\) - 12 (mod 19)
⇒ 7.25n \(\equiv\) -12.6n (mod 19)
⇒ 7.25n -( -12.6n) ⋮ 19
⇒ 7.25n + 12.6n ⋮ 19
Ta có:
\(A=7.5^{2n}+12.6^n=7.25^n+12.6^n\)
Vì \(25\equiv6\left(mod19\right)\Rightarrow25^n\equiv6^n\left(mod19\right)\)
\(\Rightarrow A\equiv7.6^n+12.6^n\left(mod19\right)\)
\(\Rightarrow A\equiv19.6^n\left(mod19\right)\)
\(\Rightarrow A\equiv0\left(mod19\right)\)
Vậy ....