1 Answer

Drembert · Answer 1 · 2021-07-19T09:35:14+0000

By the binomial theorem,

$\displaystyle (2x+y)^7 = \sum_(k=0)^7 \binom7k (2x)^(7-k) y^k=\sum_(k=0)^7 \binom7k 2^(7-k) x^(7-k) y^k$

where

$\dbinom nk=(n!)/(k!(n-k)!)$

is the binomial coefficient.

We get the x⁴y³ terms with k = 3, for which the coefficient would be

$\dbinom73 2^(7-3)=(7!)/(3! 4!) 2^4=\boxed{560}$

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