the nth term in the expansion (a+b)^m=
([tex] \frac{(m)!}{(n-1)!(m-(n-1))!} [/tex])a^(m-(n-1))b^(n-1)
so
8th term
([tex] \frac{(14)!}{(8-1)!(14-(8-1))!} [/tex])a^(14-(8-1))b^(8-1)=
([tex] \frac{(14)!}{7!(7)!} [/tex])a^(7)b^(7)=
([tex] \frac{14*13*12*11*10*9*8}{7!} [/tex])a^(7)b^(7)=
3432a⁷b⁷ is answer
