Four persons meet at a party. Each of them shakes hands with every other…

2023

Four persons meet at a party. Each of them shakes hands with every other person. How many handshakes are in total?

  1. A.

    10

  2. B.

    6

  3. C.

    12

  4. D.

    5

  5. E.

    Question not attempted

Attempted by 53 students.

Show answer & explanation

Correct answer: B

To determine the total number of handshakes when four people meet and each shakes hands with every other person, we can use the combination formula. Since a handshake requires two people, we are looking for the number of ways to choose 2 people from a group of 4.

Step-by-Step Calculation
The formula for the number of handshakes is:
n * (n - 1) / 2

Where n is the number of people.

Here, n = 4.

Calculation: 4 * (4 - 1) / 2 = 4 * 3 / 2 = 12 / 2 = 6.

Alternatively, you can count them person by person:

Person 1 shakes hands with 3 others (Person 2, 3, and 4).

Person 2 shakes hands with 2 others (already shook hands with Person 1).

Person 3 shakes hands with 1 other (already shook hands with Person 1 and 2).

Person 4 has already shaken hands with everyone.

Total: 3 + 2 + 1 = 6.

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