C0Cr + C1Cr+1 + C2Cr+2 + ... + Cn-r Cn is equal to

Question

C0Cr + C1Cr+1 + C2Cr+2 + ... + Cn-r Cn is equal to (A) ((2n)!/(n-r)!(n+r)!) (B) (n!/r!(n+r)!) (C) (n!/(n+r)!) (D) None of these

Tardigrade Admin · Accepted Answer

∵ (1+x)n = C0+C1x+C2x2+ ldots+Crxr+ ldots +Cnxn ldots(i) and (1+(1/x))n = C0+C1 (1/x)+C2 (1/x2)+ ldots+Cr (1/xr) + Cr+1 (1/xr+1)+ Cr+2 (1/xr+2)+ ldots+ Cn (1/xn) ldots(ii) On multiplying (i) and (ii), equating coefficient of xr in (1/xn)(1+x)2n or the coefficient of xn+r in (1 + x)2n, we get the value of required expression which is 2nCn+r = ((2n)!/(n-r)!(n+r)!)

Q. $C_{0} C_{r} + C_{1} C_{r + 1} + C_{2} C_{r + 2} + ... + C_{n - r} C_{n}$ is equal to

$\frac{( 2 n ) !}{( n - r ) ! ( n + r ) !}$

$\frac{n !}{r ! ( n + r ) !}$

$\frac{n !}{( n + r ) !}$

None of these

Q. C0​Cr​+C1​Cr+1​+C2​Cr+2​+...+Cn−r​Cn​ is equal to

(n−r)!(n+r)!(2n)!​

r!(n+r)!n!​

(n+r)!n!​

None of these

Q. $C_{0} C_{r} + C_{1} C_{r + 1} + C_{2} C_{r + 2} + ... + C_{n - r} C_{n}$ is equal to

$\frac{( 2 n ) !}{( n - r ) ! ( n + r ) !}$

$\frac{n !}{r ! ( n + r ) !}$

$\frac{n !}{( n + r ) !}$