If `C_r` stands for `nC_r,` then the sum of first `(n+1)` terms of the series `a C_0-(a+d)C_1+(a+2d)C_2-(a+3d)C_3+......,` is

If C_(r) stands for nC_(r), then the sum of first (n+1) terms of the series aC_(0)-(a+d)C_(1)+(a+2d)C_(2)-(a+3d)C_(3)+...... is

Find the sum of ( n + 1 ) terms of the following series 2 C_ 0 − 3 C_ 1 + 4 C_ 2 − 5 C_ 3 + ... ...

The sum to (n+1) terms of the series (C_(0))/(2)-(C_(1))/(3)+(C_(2))/(4)-(C_(3))/(5)+......=

If C_(r) stands for nC_(r), then the sum of the series (2((n)/(2))!((n)/(2))!)/(n!)[C_(0)^(2)-2C_(1)^(2)+3C_(2)^(2)-......+(-1)^(n)(n+1)C_(n)^(2)], where n is an even positive integer,is

The sum of the series sum_(r=0) ^(n) ""^(2n)C_(r), is

If C_(r) stands for ""^(n)C_(r) , then the sum of the series (2((n)/(2))!((n)/(2))!)/(n!)[C_(0)^(2)-2C_(1)^(2)+3C_(2)^(2)-...+(-1)^(n)(n+1)C_(n)^(2)] , where n is an even positive integers, is:

If n is a positive integer such that (1+x)^n=^nC_0+^nC_1+^nC_2x^2+…….+^nC_nx^n, for epsilonR . Also ^nC_r=C_r On the basis o the above information answer the following questions for any aepsilon R the value of the expression a-(a-1)C_1+(a-2)C-2-(a-3)C_3+.+(1)^n(a-n)C_n= (A) 0 (B) a^n.(-1)^n.^(2n)C_n (C) [2a-n(n+1)[.^(2n)C_n (D) none of these