30 former classmates gathered to celebrate the anniversary of their school graduation. Each of them greeted and shook hands with every other without any exceptions how many handshakes were exchanged when everyone was finished?

Note: When person A shakes with person B, person B is also shaking with person A. It is counted as one handshake.

Question

Mathematics

Myah Shepard

11 June, 03:19

30 former classmates gathered to celebrate the anniversary of their school graduation. Each of them greeted and shook hands with every other without any exceptions how many handshakes were exchanged when everyone was finished?

Note: When person A shakes with person B, person B is also shaking with person A. It is counted as one handshake.

+1

Answers (2)

Know the Answer?

Ellen Vega · Answer 1

The answer is 435 handshakes when everyone was finished. I hope this is correct.

Sullivan Adkins · Answer 2

Let's pick one person at random and call it the 'first'.

That person shakes hands with 29 other classmates.

Take another person different from the first, we'll call him the 'second'. Since he has already shaken hands with the first, he shakes hands with 28 other classmates.

The 'third' person will likewise shake hands with 27 other classmates, and so on.

Hence, the total number of handshakes is 29+28+27 + ... + 2+1 = 29*30/2=435 handshakes