1 Answer

Alisson Gomes · Answer 1 · 2017-04-25T04:25:10+0000

The (p+1)-th term of the Newton binomial expansion

(a+b)^(n)

is given by

$t_(p+1)=\dbinom{n}{p}\,a^(n-p)\,b^(p)$
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We want the 7th term. Hence, we set
p+1

to be

$p+1=7~~\Rightarrow~~p=6$

Then, the 7th term is

$t_(7)=\dbinom{8}{6}\,x^(8-6)\,4^(6)\\\\\\ t_(7)=(8!)/(6!\cdot (8-6)!)\cdot x^(8-6)\cdot 4^(6)\\\\\\ t_(7)=(8\cdot 7\cdot \diagup\!\!\!\! 6!)/(\diagup\!\!\!\! 6!\cdot 2!)\cdot x^(2)\cdot 4^(6)\\\\\\ t_(7)=(8\cdot 7)/(2\cdot 1)\cdot x^(2)\cdot 4^(6)\\\\\\ t_(7)=28\cdot x^(2)\cdot 4,096\\\\ \boxed{\begin{array}{c} t_(7)=114,688\,x^(2) \end{array}}$

Correct answer:
$\text{A. }114,688\,x^(2).$

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