The length of a rectangle is 4 inches more than its width, and its perimeter is 34 inches. What is the length and width of the rectangle?

2 Answers
Mar 2, 2018

Length #l = 10.5”#, Width #w = 6.5”#

Explanation:

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Perimeter #P= 2l + 2w#

Given #l =( w + 4)”, P = 34”#

#:. 34 = 2(w+4) + 2w#

#4w + 8 = 34#

#w = 26/4 = 6.5”#

#l = w + 4 = 6.5 + 4 = 10.5”#

Mar 2, 2018

length is #10.5# inches

width is #6.5# inches

Explanation:

Let length be #l#
Let width be #w#
Let perimeter be #P#

First, we must construct an equation for these variables:

#l=w+4#

#P=34#

But, Perimeter of a rectangle #=l+w+l+w#

#=2l+2w#

So:

#34=2l+2w#

But, since #l=w+4#, we can substitute for #l#, having only the #w# variable:

#34=2(w+4)+2w#

#34=2w+8+2w#

#34=4w+8#

Solve for #w#:

#4w=34-8#

#4w=26#

#w=26/4#

#w=6.5# inches

Now, we can substitute #6.5# for #w# in the Perimeter Equation:

#34=2l+2w#

becomes:

#34=2l+2*6.5#

#34=2l+13#

Solve for #l#:

#2l=34-13#

#2l=21#

#l=21/2#

#l=10.5# inches

Thus, length is #10.5# inches

Thus, width is #6.5# inches