Question ID: #792
The value of $\frac{^{100}C_{50}}{51}+\frac{^{100}C_{51}}{52}+…+\frac{^{100}C_{100}}{101}$ is:
- (1) $\frac{2^{101}}{100}$
- (2) $\frac{2^{100}}{100}$
- (3) $\frac{2^{101}}{101}$
- (4) $\frac{2^{100}}{101}$
Solution:
Let the sum be $S$.
$$ S = \sum_{r=50}^{100} \frac{^{100}C_r}{r+1} $$
Using the property $\frac{^nC_r}{r+1} = \frac{1}{n+1} \cdot ^{n+1}C_{r+1}$:
$$ S = \sum_{r=50}^{100} \frac{1}{101} \cdot ^{101}C_{r+1} $$
Let $k = r+1$. When $r=50, k=51$. When $r=100, k=101$.
$$ S = \frac{1}{101} \sum_{k=51}^{101} (^{101}C_k) $$
$$ S = \frac{1}{101} \left( ^{101}C_{51} + ^{101}C_{52} + \dots + ^{101}C_{101} \right) $$
We know that the sum of binomial coefficients is $\sum_{k=0}^{n} (^nC_k) = 2^n$.
Here $n=101$ (an odd number).
For odd $n$, the sum of the first half of coefficients equals the sum of the second half:
$$ \sum_{k=0}^{50} (^{101}C_k) = \sum_{k=51}^{101} (^{101}C_k) = \frac{2^{101}}{2} = 2^{100} $$
Therefore:
$$ S = \frac{1}{101} \cdot (2^{100}) $$
$$ S = \frac{2^{100}}{101} $$
Ans. (4)
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