represent the given condition using a sing variable, x. The length and width of a rectangle whose length is 12 centimeters more than its width. the width of the rectangle is _____. The length of the rectangle is ____.

A rectangle, the opposite sides are parallel and equal of lenght.

Length = (x + 12)cm

Width = (x)cm

To represent the length and width of the rectangle using a single variable, let's use "x" as the width of the rectangle.

Given that the length of the rectangle is 12 centimeters more than its width, we can express the length as "x + 12".

Therefore, the width of the rectangle is x centimeters, and the length of the rectangle is (x + 12) centimeters.

Let's represent the width of the rectangle as x.

According to the given condition, the length of the rectangle is 12 centimeters more than its width. So, the length can be represented as (x + 12).

Therefore, the width of the rectangle is x, and the length of the rectangle is (x + 12).