Cho $n=1$ thì $A$ không chia hết cho $59$. Bạn xem lại đề nhé.

Lời giải:

$A=5^{n+2}+26.5^n+8^{2n+1}=5^n(5^2+26)+8^{2n+1}$

$=51.5^n+64^n.8$

$\equiv 51.5^n+5^n.8\equiv 5^n(51+8)\equiv 5^n.59\equiv 0\pmod {59}$

Ta có đpcm

Cô ơi e chưa học cái (≡) này ạ

a,  11ⁿ⁺²+12²ⁿ⁺¹

= 11ⁿ.121+12.12²ⁿ

= 11ⁿ.(133-12)+12.12²ⁿ

= 11ⁿ.133-11ⁿn .12+12.12²ⁿ

=12.(144ⁿ-11ⁿ)+11ⁿ. 133

Có 144ⁿn-11ⁿ \(⋮\)144-11=133

11ⁿ.133\(⋮\)133

=> dpcm

\(A=5^{n+2}+26.5^n+8^{2n+1}\left(n\in N\right)\)

\(=25.5^n+26.5^n+8.64^n\)

\(=5^n\left(25+26\right)+8.64^n\)

\(=5^n\left(59-8\right)+8.64^n\)

\(=59.5^n+8\left(64^n-5^n\right)\)

\(=59.5^n+8\left(64-5\right)\left(64^{n-1}+64^{n-2}.5+...\right)\)

\(=59.5^n+8.59\left(64^{n-1}+64^{n-2}.5+...\right)\)

\(=59\left[5^n+8\left(64^{n-1}+64^{n-2}.5+...\right)\right]⋮59\)

Vậy \(A⋮59\)\(\forall n\in N\)(đpcm)

a)  \(n\left(2n-3\right)-2n\left(n+1\right)\)

\(=2n^2-3n-2n^2-2n\)

\(=-5n\)\(⋮\)\(5\)

b)  \(\left(n-1\right)\left(3-2n\right)-n\left(n+5\right)\)

\(=3n-2n^2-3+2n-n^2-5n\)

\(=-3n^2-3\)

\(=-3\left(n^2+1\right)\)\(⋮\)\(3\)

\(=5^n.\left(5^2+26\right)+64^n.8\)

\(=5^n.\left(59-8\right)+64^n.8\)

\(=5^n.59-5^n.8+64.8\)

\(=5^n.59-8.\left(64^n-5^n\right)\)

vì 64-5 chia hết cho 59 => 64ⁿ-5ⁿ chia hết cho 59

vậy.....