\(p=2a^{2n+1}+5a^{2n+1}-3a^{2n}-7a^{2n}+3a^{2n1}\)
\(p=\left(2a^{2n+1}+5a^{2n+1}+3a^{2n+1}\right)+\left(-3a^{2n}-7a^{2n}\right)\)
\(\Rightarrow P=10a^{2n+1}+\left(-10a\right)^{2n}\)
Mà \(2n⋮2\)còn \(2n+1⋮2̸\)
Do đó \(a>2\)thì\(P>0\)
cHÚC BẠN HỌC TÔT ~!!!
\(P=10a^{2n+1}-10a^{2n}>0\Leftrightarrow10a^{2n+1}>10a^{2n}\Leftrightarrow10a^{2n}.a>10a^{2n}\Leftrightarrow\hept{\begin{cases}a>0\\a>1\end{cases}\Leftrightarrow a>1}\)