The rectangle below has an area of x^2-7x+10square meters and a width of x - 5 meters.
What expression represents the length of the rectangle below?
length=_____ meters.

The area of a rectangle is:

[tex]\sf A=lw[/tex]

Plug in what we know:

[tex]\sf x^2-7x+10=l(x-5)[/tex]

Factor the left side:

[tex]\sf (x-2)(x-5)=l(x-5)[/tex]

Divide (x - 5) to both sides:

[tex]\sf l=\boxed{\sf x-2}[/tex]

So the length is x - 2 meters.

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adioabiola adioabiola · Answer 2 · 2022-01-07T12:26:48+01:00

adioabiola adioabiola

07-01-2022

The expression which represents the length of the rectangle is; (x -2)

According to the question:

We are required to determine which express represents the length of the rectangle given.

Since the area of the rectangle, A is given as;

Area, A = x² -7x +10

And Width, w = x -5

A = l × w

w = A/l

w = (x² -7x +10)/(x-5)

w = (x-2) as obtained from polynomial long division

The rectangle below has an area of x^2-7x+10square meters and a width of x - 5 meters. What expression represents the length of the rectangle below? length=_____ meters.

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The rectangle below has an area of x^2-7x+10square meters and a width of x - 5 meters.
What expression represents the length of the rectangle below?
length=_____ meters.