A is a set containing n elements. A subset $P$ of A is chosen. The set A is reconstructed by replacing the elements of $P .$ another subset Q of A is again chosen. Find the number of ways of choosing $P$ and $Q,$ so that $P \cap Q$ contains exactly $r$ elements.

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$n_{C_{r}} 3^{n - r}$

$n_{C_{r}} 2^{n - r}$

$3^{n - r}$

$2^{n - r}$

answer is A.

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Detailed Solution

Let $A = \{a_{1}, a_{2}, a_{3}, \dots, a_{n}\}$

(i) The r elements in $P$ and $Q$ such that $P \cap Q$ can be chosen out of n is ${}^{n}C_{r}$ ways a general element of A must satisfy one of the following possibilities [here, general element be $a_{i} (1 \leq i \leq n)]$

(i) $a_{i} \in P$ and $a_{i} \in Q$

(ii) $a_{i} \in P$ and $a_{i} \notin Q$

(iii) $a_{i} \in P$ and $a_{i} \notin Q$

(iv) $a_{i} \notin P$ and $a_{i} \notin Q$

Let $a_{1}, a_{2}, \dots, a_{r} \in P \cap Q$

There is only one choice each of them (i.e., (i) choice) and three choices (ii), (iii) and (iv) for each of remaining $(n - r)$ elements. Hence, number of ways of remaining elements $= 3^{n - r}$

Hence, number of ways in which $P \cap Q$ contains exactly r elements $= {}^{n}C_{r} x 3^{n - r}$