During a party a total of 78 handshakes occurred. If each person shook hands once with each of the other people , how many people were at the party?

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During a party a total of 78 handshakes occurred. If each person shook hands once with each of the other people , how many people were at the party?

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Answer 1 · 2018-06-21T20:56:53

$n = 13$ $n=13$

Explanation:

Lets say we have $n$ $n$ people. The first one can shake hands with $n - 1$ $n-1$ people (everyone, except himself). The next person can shake hands with $n - 2$ $n-2$ (everyone, except person 1 and himself). The one after that with $n - 3$ $n-3$ and so on. So the sum would be:
$1+2+3+4...+(n-2)+(n-1)="total sum of handshakes"$
This can be expressed by:
$((n-1)n)/2="total sum of handshakes"$
$((n-1)n)/2=78|*2$
$(n-1)n=156$
$n=13$

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During a party a total of 78 handshakes occurred. If each person shook hands once with each of the other people , how many people were at the party?

1 Answer

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