What is the ninth term in the binomial expansion of (x-2y)^13

Question

asked Jul 24, 2019 124k views

2 Answers

Houssem ZITOUN · Answer 1 · 2019-07-29T06:04:39+0000

Answer:

Explanation:

(x-2y)^(13)

T_(r+1)=nCr x^(n-r) y^r

x is the first term in the given parenthesis and y is the second tern

r= 8, r+1=9 because we need to find 9th term

x is x and y is 2y. n is the exponent 13. plug in all the values

T_(8+1)=13C8 x^(13-8) (2y)^8

T_(8+1)=13C8 x^(5) (2y)^8

nCr=
$(n!)/(r!(n-r)!)=\frac{13!}{8!(5!)=1287$

T_(8+1)=1287x^(5) 256y^8