Answer:
[tex]l=27cm[/tex] and [tex]w=11cm[/tex]
Step-by-step explanation:
the perimeter of a rectangle is given by the following equation:
[tex]p=2(l+w)=2l+2w[/tex]
if a rectangle has a perimeter of 76cm and its length is 5 plus the double of its width we can use a system of equations to find the length [tex]l[/tex], and the width [tex]w[/tex].
For the perimeter of the rectangle
[tex]2l+2w=76[/tex] where [tex]l[/tex] is its length, and [tex]w[/tex] is its width, 76 is the perimeter of the rectangle in cm.
We know that the lengh of the rectangle is 5 plus the double of its width, writing the equation:
[tex]l=5+2w[/tex]
Substituting the equation above in [tex]2l+2w=76[/tex]
[tex]2(5+2w)+2w=76\\10+4w+2w=76\\6w=76-10\\w=66/6\\w=11[/tex]
We got that the rectangle width is w=11cm
Substituting w in the equation [tex]2l+2w=76[/tex]
[tex]2l+2(11)=76\\2l+22=76\\l=(76-22)/2=54/2\\l=27[/tex]
We got that the rectangle length is l=27cm
Verifying the values obtained
[tex]2l+2w=76[/tex] with l=27 and w=11
[tex]2(27)+2(11)=76[/tex]
[tex]54+22=76[/tex]
Satisfying the equation
