If C0, C1, C2, ......, Cn be the coefficients in the expansion of (1 + x)n, then (22.C0/1.2) + (23.C1/2.3)+ ..... + (2n+2. Cn/(n+1)(n+2)) is

Question

If C0, C1, C2, ......, Cn be the coefficients in the expansion of (1 + x)n, then (22.C0/1.2) + (23.C1/2.3)+ ..... + (2n+2. Cn/(n+1)(n+2)) is (A)  (3n+1-2n-5/(n+1)(n+2)) (B)  (3n+2-2n-5/(n+1)(n+2)) (C)  (3n+1+2n-5/(n+1)(n+2)) (D) None of these

Tardigrade Admin · Accepted Answer

We have, tr+1 = (2r+2 nCr/(r+1)(r+2)) = (2r+2/r+2) . (1/r+1) nCr = (2r+2/r+2) . (1/n+1) n+1Cr+1 = (2r+2/r+2) . ((1/r+1) n+1Cr+1) = (2r+2/r+2) . (1/n+2) n+2Cr+2 [∵ (1/r+1) nCr = (1/r+1) n+1Cr+1] Putting r = 0, 1, 2, ......, n and adding we get, The given expression = (1/(n+1)(n+2) ) 22. n+2C2 + 23. n+2C3 +.... + 2n+2. n+2Cn+2 = (1/(n+1)(n+2)) (1+2)n+2-n+2C0-2. n+2C1 = (3n+2-2(n+2)-1/(n+1)(n+2)) = (3n+2-2n-5/(n+1)(n+2))

Q. If $C_{0}, C_{1}, C_{2}, ......, C_{n}$ be the coefficients in the expansion of $(1 + x)^{n}$ , then $\frac{2 ^{2} . C _{0}}{1.2} + \frac{2 ^{3} . C _{1}}{2.3} + ..... + \frac{2 ^{n + 2} . C _{n}}{( n + 1 ) ( n + 2 )}$ is

$\frac{3 ^{n + 1} - 2 n - 5}{( n + 1 ) ( n + 2 )}$

$\frac{3 ^{n + 2} - 2 n - 5}{( n + 1 ) ( n + 2 )}$

$\frac{3 ^{n + 1} + 2 n - 5}{( n + 1 ) ( n + 2 )}$

None of these

Q. If C0​,C1​,C2​,......,Cn​ be the coefficients in the expansion of (1+x)n, then 1.222.C0​​+2.323.C1​​+.....+(n+1)(n+2)2n+2.Cn​​ is

(n+1)(n+2)3n+1−2n−5​

(n+1)(n+2)3n+2−2n−5​

(n+1)(n+2)3n+1+2n−5​

None of these

Q. If $C_{0}, C_{1}, C_{2}, ......, C_{n}$ be the coefficients in the expansion of $(1 + x)^{n}$ , then $\frac{2 ^{2} . C _{0}}{1.2} + \frac{2 ^{3} . C _{1}}{2.3} + ..... + \frac{2 ^{n + 2} . C _{n}}{( n + 1 ) ( n + 2 )}$ is

$\frac{3 ^{n + 1} - 2 n - 5}{( n + 1 ) ( n + 2 )}$

$\frac{3 ^{n + 2} - 2 n - 5}{( n + 1 ) ( n + 2 )}$

$\frac{3 ^{n + 1} + 2 n - 5}{( n + 1 ) ( n + 2 )}$