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Volder · Answer 1 · 2023-06-17T19:42:45+0000

Given

find the two positive numbers whose difference is 9 and whose product is 190

Solution

Let n and n+9 be the two numbers.

$\begin{gathered} \text{Their product } \\ n(n+9)=190 \\ n^2+9n=190 \\ n^2+9n-190=0 \end{gathered}$

It is now a quadratic equation

we can factorize

$\begin{gathered} n^2+19n-10n-190=0 \\ (n^2+19n)-(10n+190)=0 \\ \text{factorize} \\ n(n+19)-10(n+19)=0 \\ n-10=0 \\ n=10 \\ \text{and} \\ n+19=0 \\ n=-19 \end{gathered}$

The final answer is

The two positive numbers are 19 and 10

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