What is the 5th term of #(x+2)^9#?

1 Answer
Trevor Ryan.
Jun 10, 2016

#2016x^5#

Explanation:

From the binomial theorem, the term in position #r+1# of the binomial expansion #(x+y)^n=sum_(r=0)^oo ~^nC_rx^(n-r)y^r# is given by

#T_(r+1)= ~^nC_rx^(n-r)y^r#.

Hence #T_5=T_(4+1)=~^9C_4x^(9-4)*2^4#

#=(9!)/((9-4)!4!)*x^5*16#

#=2016x^5#

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