In a group of 15 women, 7 have nose studs, 8 have ear rings and 3 have neither. How many of these have both nose studs and ear rings?

Updated On: Oct 1, 2024

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The Correct Option is C

The correct option is (C): 3
To solve the problem, we can use the principle of inclusion-exclusion. Let:

- \( A \): the set of women with nose studs
- \( B \): the set of women with ear rings

First, we calculate the total number of women who have either nose studs or ear rings (or both):

\[|A \cup B| = \text{Total Women} - \text{Neither} = 15 - 3 = 12\]

Now, we use the formula for the union of two sets:

\[|A \cup B| = |A| + |B| - |A \cap B|\]

Substituting the known values:

\[12 = 7 + 8 - |A \cap B|\]

This simplifies to:

\[12 = 15 - |A \cap B|\]

So,

\[|A \cap B| = 15 - 12 = 3\]

Therefore, the number of women who have both nose studs and ear rings is 3.

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List - I	List -II
(A) \(P(\overline{A} \cap B)\)	(I)\(P(A)+P(B)\)
(B)\(P(A\cap \overline B)\)	(II)\(P(A)+P(B)-2P(A\cap B)\)
(C) \(P[(A\cap \overline B) \cup (\overline A \cap B)]\)	(III)\(P(B)-P(A\cap B)\)
(D)\(P(A\cup B)+ P(A\cap B)]\)	(IV)\(P(B)-P(A\cap B)\)

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