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A carpenter is assigned the job of expanding a rectangular deck where the width is one-fourth the length. The length of the deck is to be expanded by 6 feet, and the width by 2 feet. If the area of the new rectangular deck is 68 ft2 larger than the area of the original deck, find the dimensions of the original deck.

Respuesta :

Let the width be W, then the length is 4W (since the width is 1/4 the length)

The area of the original deck is [tex]W*4W=4W^{2} [/tex]

The dimensions of the new deck are :

length = 4W+6
width=W+2

so the area of the new deck is :

[tex](4W+6)(W+2)= 4W^{2}+8W+6W+12= 4W^{2}+14W+12[/tex]

"the area of the new rectangular deck is 68 ft2 larger than the area of the original deck" means that we write the equation:

[tex]4W^{2}+14W+12=68+4W^{2}[/tex]

[tex]14W+12=68[/tex]

[tex]14W=68-12=56[/tex]

[tex]W= \frac{56}{14}= 4 [/tex]

the length is [tex]4W=4*4=16[/tex]    ft


Answer: width: 4, length: 16

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