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प्रश्न
If X is a binomial variate with parameters n and p, where 0 < p < 1 such that \[\frac{P\left( X = r \right)}{P\left( X = n - r \right)}\text{ is } \] independent of n and r, then p equals
विकल्प
1/2
1/3
1/4
None of these
उत्तर
1/2
Given that P(X=r) = k P(X=n -r), where k is independent of n and r .
\[^{n}{}{C}_r p^r q^{n - r} = k ^{n}{}{C}_{n - r} p^{n - r} q^r \]
\[\text{ We have } ^{n}{}{C}_r = ^{n}{}{C}_{n - r} \text{ and also q } = 1 - p\]
\[\text{ Hence, the equation changes to the following } :\]
\[ p^r (1 - p )^{n - r} = \text{ k } p^{n - r} (1 - p )^r \]
\[ \Rightarrow (1 - p )^{n - 2r} = \text{ k }p^{n - 2r} \]
\[ \Rightarrow \left( \frac{q}{p} \right)^{n - 2r} = k \]
\[ \text{ This is possible when p = q and k becomes 1 .} \]
\[\text{ Hence,} p = q = \frac{1}{2}\]
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