Let's Shake Hands and Count Smiles!

How many handshakes occur during a joyful gathering of 8 people?

Options:

  • A. 24 handshakes
  • B. 28 handshakes
  • C. 36 handshakes
  • D. 56 handshakes

Answer:

The correct answer is C. 36 handshakes.

Imagine a gathering of 8 enthusiastic individuals, each spreading smiles and positivity all around. As they exchange handshakes with one another, the air is filled with laughter and warmth.

To determine the total number of handshakes that take place in this gathering, we can use the formula n(n-1)/2 where n represents the number of people present. In this case, with 8 people, the calculation is as follows:

8(8-1)/2 = 8(7)/2 = 56/2 = 36 handshakes altogether.

So, amidst the laughter and happiness, a total of 36 handshakes happen during this delightful gathering. Each handshake symbolizes the connection and camaraderie shared among the participants.

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