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Prove that for all whole values of n the value of the expression: n(n–1)–(n+3)(n+2) is divisible by 6.

Prove that for all whole values of n the value of the expression: n(n–1)–(n+3)(n+2) is divisible by 6.
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Prove that for all whole values of n the value of the expression:

n(n–1)–(n+3)(n+2) is divisible by 6.

Prove that for all whole values of n the value of the expression: n(n–1)–(n+3)(n+2) is-example-1
User James Crosswell
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8.7k points

1 Answer

4 votes

Expand:


n(n-1)-(n+3)(n+2)=(n^2-n)-(n^2+5n+6)=-6n-6

Then we can write


n(n-1)-(n+3)(n+2)=6\boxed{(-n-1)}

which means
6\mid n(n-1)-(n+3)(n+2) as required.

User Miguel Salas
by
8.1k points
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