If $A$ and $B$ be two sets such that $n (A) = 15$ , $n (B) = 25$ , then the number of possible values of $n (A △ B)$ (symmetric difference of $A$ and $B$ ) is

$30$

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$16$

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$26$

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$40$

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Solution

The correct option is B
$16$

Explanation for the correct option:
Step 1: Frame a relation between $n (A △ B)$ and $n (A \cap B)$
Given, $n (A) = 15$ and $n (B) = 25$ .
Symmetric difference of two sets is defined as the difference of the union and intersection of the two sets. i.e.,
$n (A △ B) = n (A \cup B) - n (A \cap B)$
It can be rewritten as,
$n (A △ B) = n (A) + n (B) - n (A \cap B) - n (A \cap B) [∵ n (A \cup B) = n (A) + n (B) - n (A \cap B)] \Rightarrow n (A △ B) = n (A) + n (B) - 2 \cdot n (A \cap B) \Rightarrow n (A △ B) = 15 + 25 - 2 \cdot n (A \cap B) \Rightarrow n (A △ B) = 40 - 2 \cdot n (A \cap B) (1)$
Step 2: Calculate range of values of $n (A △ B)$
For $n (A △ B)$ to be minimum, value of $n (A \cap B)$ should be the maximum.
The maximum possible value of $n (A \cap B)$ is the number of elements in the smaller set.
Here, the smaller set is $B$ since it has only $15$ elements. Thus,
$n {(A △ B)}_{\min} = 40 - 2 \times 15 = 10$ .
For $n (A △ B)$ to be maximum, value of $n (A \cap B)$ should be the minimum.
The minimum possible value of $n (A \cap B)$ is $0$ .
So,
$n {(A △ B)}_{\max} = 40 - 2 \times 0 = 40$
Thus, $n (A \cap B)$ can vary from $0$ to $15$ , accordingly , $n (A △ B)$ varies from $10$ to $40$ with a difference of $2$ as second multiple of $n (A \cap B)$ is being subtracted.
Thus, the possible values for $n (A △ B) = {10, 12, 14, 16, \dots, 40}$ , obtained by substituting possible values of $n (A \cap B)$ into $(1)$
Step 3: Calculate the number of elements in the range of values of $n (A △ B)$
We can observe that, the elements in the set which holds the possible values of $n (A △ B)$ are in an arithmetic progression.
The $n^{th}$ term of an arithmetic progression is given as,
$a_{n} = a + (n - 1) d$
Where, $a_{n}$ is the $n^{th}$ term, $a$ is the first term and $d$ is the difference between each consecutive terms in the series, i.e., common difference.
Here, $a_{n} = 40$ , $a = 10$ and $d = 2$ .
Substituting the values in the formula,
$\Rightarrow \Rightarrow \Rightarrow$ $\begin{array}{rcl} 40 & = & 10 + (n - 1) \times 2 \\ n - 1 & = & 15 \\ n & = & 16 \end{array}$
Thus, the number of possible values of $n (A △ B) = 16$
Hence, option B is correct.

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