The integralegral part of ((8+3\sqrt{7})^n) is | Mathematics | SolveeIt

Question

The integral part of $(8+3\sqrt{7})^n$ is

an odd integer

an even integer

zero

nothing can be said.

Answer

an even integer

Explanation

Solution

Let $(8+3\sqrt{1})^n = p+f$ , where $p\,\in \,I$ and $f$ is a proper fraction and let $(8+3\sqrt{1})^n = f'$ , a proper fraction $\left[\because 0 < 8-3\sqrt{7} < 1\right]$ Since $\left(8+3\sqrt{7}\right)^{n}+\left(8-3\sqrt{7}\right)^{n} = p+f+f'$ is an even integer $\therefore p + 1$ is even $\therefore p$ is an odd integer

Mathematics Question on general and middle terms

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