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Calculate the coefficient of x14,4 in the expansion of (x + y)18,
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1 vote
Calculate the coefficient of x14,4 in the expansion of (x + y)18,

User Tlemaster
by
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1 Answer

3 votes

Answer: 3060

Explanation:

Formula : (r+1)th term of
(a+b)^n :
T_(r+1)=\ ^nC_r(a)^(n-r)(b)^r

To find: Coefficient of
x^(14)y^4 in the expansion of
(x + y)^(18).

Let the term in the expansion of
(x + y)^(18) be
^(18)C_r x^(18-r)y^r=x^(14)y^4


\Rightarrow\ r=4

Now, Coefficient =
^(18)C_r=^(18)C_4=(18!)/(4!14!) [
^nC_r=(n!)/(r!(n-r)!)]


=(18*17*16*15*14!)/(14!(24))\\\\=3060

Hence, the coefficient of
x^(14)y^4 in the expansion of
(x + y)^(18) is 3060 .

User Peakxu
by
6.0k points
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