Prove that for any natural n: a the number 7^(n+4) −7^n is divisible by 30. b the number 3^(n + 2) −2^(n +2) +3^n −2^n is divisible by 10.

Question

asked Oct 14, 2020 51.0k views

1 Answer

Psychemedia · Answer 1 · 2020-10-19T18:46:30+0000

a) Let
n=0 ; then
$7^4-1=2400=30\cdot80$ , which is divisible by 30. We have

7^(n+4)-7^n=7^n(7^4-1)

and since we know
$30\mid7^4-1$ , it follows that
$30\mid7^(n+4)-7^n$ for all
$n\ge1$ .

b) We can write

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

=3^n(3^2+1)-2^n(2^2+1)

$=10\cdot3^n+5\cdot2^n$

$=10\cdot3^n+10\cdot2^(n-1)$

$=10\left(3^n+2^(n-1)\right)$

and we're done.