Đặt A=1+7+72+...+7101
=(1+7)+(72+73)+...+(7100+7101)
=8+72(1+7)+...+7100(1+7)
=8+72.8+...+7100.8
=8(1+72+...+7100)
\(\Rightarrow A⋮8\)
Vậy A\(⋮\)8
Ta có : A = ( 1 + 7 ) + ( 7^2 +7^3 ) + .... + ( 7^100 + 7^101 )
= 1( 1 + 7 ) + 7^2( 1+7 ) +.....+ 7^100( 1 + 7 )
= 1. 8 + 7^2 . 8 +....+ 7^100 . 8
= 8( 1+7^2+....+7^100 )
=> A chia hết cho 8