The coefficient of x50 in the binomial expansion of (1 + x)1000 + x (1 + x)999 + x2(1 + x)998 + .... + x1000 is:

Question

The coefficient of x50 in the binomial expansion of (1 + x)1000 + x (1 + x)999 + x2(1 + x)998 + .... + x1000 is: (A) ((1000)!/(50)! ( 950)!) (B) ((1000)!/(49)! ( 951)!) (C) ((1001)!/(51)! ( 950)!) (D) ((1001)!/(50)! ( 951)!)

Tardigrade Admin · Accepted Answer

Let given expansion be S = (1+x)1000 + x (1+x)999 + x2 (1+x)998 + ... + ...+ x1000 Put 1 + x = t S= t1000 + xt999 + x2 (t)998 + ...+x1000 This is a G.P with common ratio (x/t) S = (t1000 [ 1 - ((x/t))1001]/1- (x)t) =((1+x)1000 [1- ((x/1+x))1001]/ 1 - (x)1+x) = ((1+x)1001 [(1+x)1001 -x1001]/(1+x)1001) = [(1+x)1001 - x1001] Now coeff of x50 in above expansion is equal to coeff of x50 in (1 + x)1001 which is 1001C50 = ((1001)!/50! (951)!)

Q. The coefficient of $x^{50}$ in the binomial expansion of $(1 + x)^{1000} + x (1 + x)^{999} + x^{2} (1 + x)^{998} + .... + x^{1000}$ is:

$\frac{( 1000 )!}{( 50 )! ( 950 )!}$

$\frac{( 1000 )!}{( 49 )! ( 951 )!}$

$\frac{( 1001 )!}{( 51 )! ( 950 )!}$

$\frac{( 1001 )!}{( 50 )! ( 951 )!}$

Q. The coefficient of x50 in the binomial expansion of (1+x)1000+x(1+x)999+x2(1+x)998+....+x1000 is:

(50)!(950)!(1000)!​

(49)!(951)!(1000)!​

(51)!(950)!(1001)!​

(50)!(951)!(1001)!​

Q. The coefficient of $x^{50}$ in the binomial expansion of $(1 + x)^{1000} + x (1 + x)^{999} + x^{2} (1 + x)^{998} + .... + x^{1000}$ is:

$\frac{( 1000 )!}{( 50 )! ( 950 )!}$

$\frac{( 1000 )!}{( 49 )! ( 951 )!}$

$\frac{( 1001 )!}{( 51 )! ( 950 )!}$

$\frac{( 1001 )!}{( 50 )! ( 951 )!}$