[tex]2^{2n+1}\cdot 3^{n}+4^{n}\cdot3^{n+2}=\\ \\=2^{2n}\cdot 2\cdot 3^{n}+4^{n}\cdot 3^{n}\cdot 3^{2}=\\ \\ =(2^{2})^{n}\cdot 3^{n} \cdot 2 +4^{n}\cdot 3^{n}\cdot 9=\\ \\ =4^{n}\cdot 3^{n}\cdot 2+4^{n}\cdot 3^{n}\cdot 9=\\ \\=(4\cdot 3)^{n}\cdot 2 +(4\cdot 3)^{n}\cdot 9=\\ \\ =12^n\cdot 2 +12^n \cdot 9=\\ \\ =12^n(2+9)=\\ \\ =12^n \cdot 11~divizibil~cu~12,~pentru~n~\in~N^*[/tex]
