If 1- x n - C 0- C 1 x - C 2 x 2- C n x n- thenthe value of -0- r - s - n r - s C r C s iA- 2 n-22 n-1-2 n-1 Cn-1-B- n-22 n -1-2 n -1 C n -1-C- n-22 n-1-2 n-1 Cn-1-D- 2 n -22 n -1-2 n -1 C n -1-

The correct option is B n[2^2n 1 ^2n 1C_n 1]We have, ∑_r=0^n ∑_s=0^n(r+s)C_r C_s =∑_r=0^n 2r (C_r)^2+20 ≤ r lt;s ≤ n∑∑(r+s)C_r C_s =2∑_r=0^n r(C_r)^2+2 0 ≤ ...

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Byju's Answer

Standard XII

Mathematics

Sum of Coefficients of All Terms

If 1+ x n = C...

Question

If $(1 + x)^{n} = C_{0} + C_{1} x + C_{2} x^{2} + \dots + C_{n} x^{n},$ then
the value of $\sum \sum 0 \leq r < s \leq n (r + s) C_{r} C_{s}$ is

n [2^{2 n - 1} -^{2 n - 1} C_{n - 1}]

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n [2^{2 n - 1} +^{2 n - 1} C_{n - 1}]

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2 n [2^{2 n - 1} -^{2 n - 1} C_{n - 1}]

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2 n [2^{2 n - 1} +^{2 n - 1} C_{n - 1}]

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Solution

The correct option is A $n [2^{2 n - 1} -^{2 n - 1} C_{n - 1}]$
We have,
$n \sum r = 0 n \sum s = 0 (r + s) C_{r} C_{s}$
$= n \sum r = 0 2 r (C_{r})^{2} + 2 \sum \sum 0 \leq r < s \leq n (r + s) C_{r} C_{s}$
$= 2 n \sum r = 0 r (C_{r})^{2} + 2 \sum \sum 0 \leq r < s \leq n (r + s) C_{r} C_{s}$
$\Rightarrow n \cdot 2^{2 n} = 2 (\frac{n}{2} \cdot^{2 n} C_{n}) + 2 \sum \sum 0 \leq r < s \leq n (r + s) C_{r} C_{s}$
$\Rightarrow \sum \sum 0 \leq r < s \leq n (r + s) C_{r} C_{s} = \frac{1}{2} [n \cdot 2^{2 n} - n \cdot^{2 n} C_{n}]$
$= \frac{n}{2} [2^{2 n} - \frac{2 n}{n} \cdot^{2 n - 1} C_{n - 1}]$
$= n [2^{2 n - 1} -^{2 n - 1} C_{n - 1}]$

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Similar questions

Q. If

(1 + x)^{n} = C_{0} + C_{1} x + \dots . . + C_{n} x^{n}

, then the value of

\sum \sum 0 \leq r < s \leq n C_{r} C_{s}

is equal to

Q. Find the value of

^{2 n + 1} C_{0} +^{2 n + 1} C_{1} +^{2 n + 1} C_{2} + . . . . . . +^{2 n + 1} C_{n} +^{2 n + 1} C_{n + 1} +^{2 n + 1}

C_{n + 2} + . . . . . +^{2 n + 1} C_{2 n + 1}

n = 3

___

C_{0} + 2 C_{1} + 3 C_{2} + 4 C_{3} + . . . + (n + 1) C_{n} = (n + 2) 2^{n - 1}

Q. If

(1 + x)^{n} = C_{0} + C_{1} x + C_{2} x^{2} + . . . . + C_{n} x^{n}

then show that the sum of the products of the

C_{i}^{'} s

taken two at a time, represented by

\sum \sum C_{i} C_{j} 0 \leq i < j \leq n

is equal to

2^{2 n - 1} - \frac{2 n!}{2 (n!)^{2}}

Q. If

(1 + x)^{n} = C_{0} + C_{1} x + C_{2} x^{2} + \dots + C_{n} x^{n},

then
the value of

\sum \sum 0 \leq r < s \leq n (r + s) (C_{r} + C_{s})

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If (1+x)n=C0+C1x+C2x2+…+Cnxn, then the value of ∑∑0≤r<s≤n(r+s)CrCs is

If $(1 + x)^{n} = C_{0} + C_{1} x + C_{2} x^{2} + \dots + C_{n} x^{n},$ then
the value of $\sum \sum 0 \leq r < s \leq n (r + s) C_{r} C_{s}$ is