The product of two consecutive even integers is 168. How do you find the integers?

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The product of two consecutive even integers is 168. How do you find the integers?

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Answer 1 · 2016-05-21T06:52:13

12 and 14
-12 and -14

Explanation:

let the first even integer be $x$ $x$
So the second consecutive even integer will be $x + 2$ $x+2$
Since the given product is 168 ,the equation will be as follows:

$x \cdot (x + 2) = 168$ $x*(x+2)=168$

$x^{2} + 2 \cdot x = 168$ $x^2+2*x=168$

$x^{2} + 2 \cdot x - 168 = 0$ $x^2+2*x-168=0$

Your equation is of the form

$a . x^{2} + b \cdot x + c = 0$ $a.x^2+b*x+c=0$

Find the discriminat $Delta$

$Delta= b^2-4*a*c$

$Delta=2^2-4*1*(-168)$

$Delta=676$

Since $Delta >0$ two real roots exist.

$x=(-b+sqrt(Delta))/(2*a)$

$x'=(-b-sqrt(Delta))/(2*a)$

$x=(-2+sqrt(676))/(2*1)$

$x=12$

$x'=(-2-sqrt(676))/(2*1)$

$x'=-14$

Both roots satisfy the condition being even integers

First possibility : two consecutive positive integers

12 and 14

Second possibility : two consecutive negative integers

-12 and -14

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The product of two consecutive even integers is 168. How do you find the integers?

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