Question 247591
L = 3W - 4  (length is 4 less than 3 times the width)
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L*W = 160 (area is given)
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L = 160/W
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Substituting in the first equation
160/W = 3W - 4
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Multiply both sides by W
160 = 3W^2 -4W
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Subtract 160 from both sides
0 = 3W^2 -4W -160
or
3W^2 - 4W - 160 = 0
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Can we factor this?  Yes.
(3W + 20)(W - 8) = 0
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So our candidate values for W are:  8 and -6.667.  
Since a negative number is nonsensical, we'll go with 8.
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W = 8
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Substituting back into our setup, we find L.
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L = 160/W = 160/8 = 20
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Always check your work!
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A = L*W = 8 * 20 = 160
Is L = 3W - 4  true?
3W - 4 = 3(8) - 4 = 24 - 4 = 20
OK
...
But have we answered the question? Nope.
The question asked for the perimeter.
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P = 2L + 2W
P = 2(20) + 2(8)
P = 40 + 16
P = 56
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Now we're done.