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The area of a rectangular fountain is (x^2+12+20) square feet. A 2-foot walkway is built around the fountain. Find the dimensions of the outside border of the walkway

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apologiabiology
area=legnth times width
factor
what 2 numbes multiply to 20 and add to 12
10 and 2
(x+2)(x+10)

2 foot walkway is increase legnth and width by 2

area=LW
area=(x+2)(x+10)
increase each by 2
area=(x+4)(x+12)

the outside border is x+4 by x+12

josebarradas1607

Answer:

[tex](x+14)*(x+6)[/tex] feet

Step-by-step explanation:

We will start factorizing [tex]x^2+12x+20=(x+10)(x+2)[/tex].

This factorization is telling us that the square fountain has dimensions:

Fountain Lenght= [tex]x+10[/tex] feet

Fountain Width= [tex]x+2[/tex] feet

Then, a 2 foot walkway is constructed around the fountain. Observe that this 2 foot need to be added in each of the 4 sides of the square fountain. So, the outer walkway dimensions are:

Outer walkway Lenght= [tex]x+14[/tex] feet

Outer walkway Width= [tex]x+6[/tex] feet

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