What is the coefficient of the term in $x^9$ in the expansion of $(3+x^3)^5$ ?

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What is the coefficient of the term in $x^9$ in the expansion of $(3+x^3)^5$ ?

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Answer 1 · 2017-05-28T07:18:03

$((5),(3)) 3^2 = 90$

Explanation:

The Binomial Theorem tells us that:

$(a+b)^n = sum_(k=0)^n ((n),(k)) a^(n-k) b^k$

where $((n),(k)) = (n!)/((n-k)!k!)$

So with $n=5$ , $a=3$ and $b=x^3$ we find:

$(3+x^3)^5 = sum_(k=0)^5 ((5),(k)) 3^(5-k) (x^3)^k$

The term in $x^9$ occurs when $k=3$ giving us:

$((5),(color(blue)(3))) 3^(5-color(blue)(3)) (x^3)^color(blue)(3) = (5!)/(2!3!)*9x^9$

$color(white)(((5),(3)) 3^(5-3) (x^3)^3) = (5*4)/2*9x^9$

$color(white)(((5),(3)) 3^(5-3) (x^3)^3) = 90x^9$

So the coeffient of $x^9$ is $90$

Instead of calculating $((5),(3)) = 10$ directly, we can read it from Pascal's triangle, in the row starting $1, 5,...$

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What is the coefficient of the term in $x^9$ in the expansion of $(3+x^3)^5$ ?

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