How do you find three consecutive even integers whose sum is 244?

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How do you find three consecutive even integers whose sum is 244?

2 Answers

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Answer 1 · 2015-06-13T16:00:16

There are no three consecutive even integers whose sum is 244.

Answer 2 · 2015-06-13T20:56:58

To attempt to find three such integers, you could solve $244 = n+(n+2)+(n+4)$ and find that the resulting $n$ isn't an integer. So there are no such three consecutive even integers.

Explanation:

If there are three such integers then they are of the form $n$ , $n+2$ and $n+4$ .

Then we have:

$244 = n + (n+2) + (n+4) = 3n+6$

Subtract $6$ from both sides to get:

$238 = 3n$

Divide both sides by $3$ to get:

$n = 79.dot(3)dot(3)$

which is not an integer, let alone an even one.

So there is no solution.

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How do you find three consecutive even integers whose sum is 244?

2 Answers

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