Question 621512
Hi, there--
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Find the length and width of the rectangle.
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STEP I: Choose variables.
Let L be the length  of the rectangle.
Let W be the width of the rectangle.
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STEP II: Write two equations using the information in the problem to model the situation.
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Perimeter (42m) means the distance around the outside of the rectangle. Going around, we have two lengths plus two widths. An equation for this is,
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{{{42=2L+2W}}}
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In algebra, the phrase "length is 3 less than twice the width," can be written as,
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{{{L=2W-3}}}
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STEP III: Solve the system of equations to find L and W.
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We'll use the substitution method. Substitute 2W-3 for L in the first equation.
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{{{42=2L+2W}}}
{{{42=2(2W-3)+2W}}}
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Simplify by clearing the parentheses.
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{{{42=4W-6+2W}}}
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Combine like terms (4W+2w is 6W.)
{{{42=6W-6}}}
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We want to isolate the variable W on one side of the equation. Add 6 to both sides. Simplify.
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{{{42+6=6W}}}
{{{48=6W}}}
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Divide both sides of the equation by 6.
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{{{48/6=6W/6}}}
{{{8=W}}}
{{{W=8}}}
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In the context of this problem, the equation W=8 means that the width of the rectangle is 8m.
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Substitute 8 for W in either equation to find the length. I'll use the 2nd equation.
{{{L=2W-3}}}
{{{L=2(8)-3}}}
{{{L=16-3}}}
{{{L=13}}}
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The length  is 13m.
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STEP IV: Check your answers in the original problem.
The perimeter is 42. Two widths is 2*8=16. Two lengths is 2*13=26, and 16 plus 26 is 42. Check!
The length is 3 less than twice the width. Twice the width is 16 and 13 is 3 less than that. Check, check!!
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Hope this helps! Feel free to email if there is any part that does not make sense yet.
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Ms.Figgy
math.in.the.vortex@gmail.com


The perimeter of a rectangle in 42m.  The length of the rectangle is 3m less than twice the width.  Find the length and width of the rectangle.