The coefficient of xk in the expansion of (1-2 x-x2/e-x) is

Question

The coefficient of xk in the expansion of (1-2 x-x2/e-x) is (A) (1-k-k2/k !) (B) (k2+1/k !) (C) (1-k/k !) (D) (1/k !)

Tardigrade Admin · Accepted Answer

Now, (1-2 x-x2/e-x) =(1-2 x-x2)(ex) =(1-2 x-x2)(1+x+(x2/2 !)+(x3/3 !)+ ldots. .+(xk/k !)+ ldots ∞) =(1+x+(x2/2 !)+ ldots+(xk/k !)+. . ∞)-2(x+x2+(x3/2 !). .+ ldots+(xk/(k-1) !)+(xk+1/k !)+ ldots ∞) .-(xk/k !)+ ldots ∞) -(x2+x3+(x4/2 !)+ ldots .. .(xk/(k-2) !)+(xk+1/(k-1) !)+(xk+2/k !)+ ldots ∞) ∴ Coefficient of xk in ((1-2 x-x2/e-x)) =(1/k !)-(2/(k-1) !)-(1/(k-2) !) =(1/k !)-(2 k/k(k-1) !)-(k(k-1)/k(k-1)(k-2) !) =(1/k !)-(2 k/k !)-(k(k-1)/k !) =(1-k-k2/k !)

Q. The coefficient of $x^{k}$ in the expansion of $\frac{1 - 2 x - x ^{2}}{e ^{- x}}$ is

$\frac{1 - k - k ^{2}}{k !}$

$\frac{k ^{2} + 1}{k !}$

$\frac{1 - k}{k !}$

$\frac{1}{k !}$

Q. The coefficient of xk in the expansion of e−x1−2x−x2​ is

k!1−k−k2​

k!k2+1​

k!1−k​

k!1​

Q. The coefficient of $x^{k}$ in the expansion of $\frac{1 - 2 x - x ^{2}}{e ^{- x}}$ is

$\frac{1 - k - k ^{2}}{k !}$

$\frac{k ^{2} + 1}{k !}$

$\frac{1 - k}{k !}$

$\frac{1}{k !}$