Two numbers have sum $-37$ and product $300$ . What are the numbers?

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Two numbers have sum $-37$ and product $300$ . What are the numbers?

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Answer 1 · 2016-12-08T14:42:33

$-12$ and $-25$

Explanation:

The prime factorisation of $300$ is:

$300 = 2^2*3*5^2$

If $m*n = 300$ and $m+n = 37$ then note that $37$ is divisible by neither $2$ nor $5$ . So when splitting the factors of $300$ into $m$ and $n$ , one of them must be divisible by $2^2 = 4$ and one (possibly the same one) must be divisible by $5^2 = 25$ .

We then see that $300/25 = 12$ and $25+12 = 37$ .

So the numbers we are looking for are $-12$ and $-25$

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Two numbers have sum $-37$ and product $300$ . What are the numbers?

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