the length of a rectangle is 4 cm more than the width and the perimeter is at least 48cm. what are the smallest possible dimensions for the rectangle?

Sagot :

L=W+4, so the entire rectangle is 4W+8 because 2(W+4)+2(W). If the perimeter is at least 48, then 4W+8=48 at the least. So, using simple algebra, we can take 8 away from both sides, making 4W=40. Then, we divide both sides by 4, therefore W=10. This is the width. To find the length, we will just add 4. So, the dimensions are 10x14.
x=length
x+4=width
[tex]2(x+4)+2x=48[/tex]
[tex]2x+8+2x=48[/tex]
[tex]4x=40[/tex]
[tex]x=10[/tex]
It means that length will be equal 10 and width 14 :)
so dimensions of this rectangle is 10x14 :)