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Question #0089c

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Mar 13, 2017

width: $6$ inches

Explanation:

Let $L$ be the length and $W$ be the width (both in inches).

We are told that the length is $8$ inches longer than $2$ times the width:
$color(white)("XXX")L=2W+8$

We are also told that the area is $120 "in"^2$
and since
$color(white)("XXX")"Area" = L xx W$

we have
$color(white)("XXX")(2W+8) xx W = 120$

$color(white)("XXX")2W^2+8W-120=0$

$color(white)("XXX")W^2+4W-60=0$

$color(white)("XXX")(W+10)*(W-6)=0$

$color(white)("XXX")W=-10" (not possible)"color(white)("XXX")or W=6$

(We weren't asked for this, but...)
If $W=6$ and $L=2W+8$
then
$color(white)("XXX")L=20$

Mar 22, 2017

Width = $6$ inches.

Explanation:

Although there are two dimensions involved, we can use one variable to define the length and the width.

Choose the smaller value to be $x$

Let the width be $x$ .

The length is $2x+8$
( $8$ inches longer than twice the width)

The area is $120$ Write an equation: $A = lxx w$

$x(2x+8) = 120$

$2x^2 +8x -120 =0" "larr div 2$

$x^2 +4 -60 =0" "larr$ find factors

$(x+10)(x-6)=0$

$x = -10 or x = 6" "larr$ reject $-10$ as a length.

Width = $6$ inches.

Check: $w = 6" "$ then $l = 20$

$A = 6 xx 20 = 120 " in"^2$

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