a) Giải:

Đặt \(A_n=11^{n+2}+12^{2n+1}\)\((*)\) Với \(n=0\) ta có:

\(A_0=11^2+12^1=133\) \(⋮133\Rightarrow\) \((*)\) đúng

Giả sử \((*)\) đúng đến giá trị \(k=n\) tức là:

\(B_k=11^{k+2}+12^{2k+1}\) \(⋮133\left(1\right)\)

Xét \(B_{k+1}-B_k\)

\(=11^{k+1+2}+12^{2\left(k+1\right)+1}-\left(11^{k+2}+12^{2k+1}\right)\)

\(=11^{k+3}-11^{k+2}+12^{2k+3}-12^{2k+1}\)

\(=10.11^{k+2}+143.12^{2k+1}\)

\(=10.121.11^k+143.12.144^k\)

\(\equiv\) \(10.121.11^k+10.12.11^k\)

\(\equiv\) \(10.11^k\left(121+12\right)\) \(\equiv\) \(0\left(mod133\right)\)

Theo giả thiết quy nạy \(\left(1\right)\) ta có: \(B_k⋮133\Leftrightarrow B_{k+1}⋮133\)

Hay \((*)\) đúng với \(n=k+1\) \(\Rightarrow\) Đpcm

Với n = 0

\(\Rightarrow3.5^{2.0+1}+2^{3.0+1}=3.5+2=15+2=17⋮17\Rightarrow\)đúng với n = 0

Giả sử \(3.5^{2n+1}+2^{3n+1}\) đúng với n = k \(\in\) N*

\(\Rightarrow3.5^{2k+1}+2^{3k+1}⋮17\)

C/m : \(3.5^{2n+1}+2^{3n+1}\) đúng với n = k + 1 ( k \(\in\) N* )

Ta có :

\(3.5^{2n+1}+2^{3n+1}=3.5^{2\left(k+1\right)+1}+2^{3\left(k+1\right)+1}\)

\(=3.25.5^{2k+1}+8.3^{3k+1}=3.25.5^{2k+1}+25.2^{3k+1}-17.2^{3k+1}\)

\(=25\left(3.5^{2k+1}+2^{3k+1}\right)-17.2^{3k+1}\)

Vì : \(17.2^{3k+1}⋮17\) ; \(3.5^{2k+1}+2^{3k+1}⋮17\) theo phương pháp quy nạp

\(\Rightarrow3.5^{2\left(k+1\right)+1}+2^{3\left(k+1\right)+1}⋮17\)

Vậy ...

\(3^{n+2}-2^{n+4}+3^n+2^n=\left(3^{n+2}+3^n\right)-\left(2^{n+4}-2^n\right)=\left(3^n.9+3^n\right)-\left(2^n.16-2^n\right)=3^n.\left(9+1\right)-2^n.\left(16-1\right)=3^n.10-2^n.15=3^{n-1}.3.10-2^{n-1}.2.15=3^{n-1}.30-2^{n-1}.30=30.\left(3^{n-1}-2^{n-1}\right)\)

Vì \(30⋮30=>30.\left(3^{n-1}-2^{n-1}\right)⋮30=>3^{n+2}-2^{n+4}+3^n+2^n⋮30\)