if the perimeter of a rectangle is 120 units what is its area in square units
To find the area of a rectangle given its perimeter, we need to know at least one additional piece of information such as the length or the width of the rectangle. With only the perimeter information, we cannot determine the exact area of the rectangle.
The perimeter of a rectangle is found by adding the lengths of all four sides. If the perimeter is given as 120 units, that means the sum of all four sides is equal to 120 units.
Let's assume the length of the rectangle is "L" units and the width is "W" units. The formula for the perimeter of a rectangle is:
Perimeter = 2L + 2W
According to the information given, we know that the perimeter is 120, so we can write the equation:
120 = 2L + 2W
However, since we don't have any other information about the length or the width, we cannot solve for either of them. Therefore, we cannot accurately determine the area of the rectangle.
It could be 30 by 30
or
20 by 40
or
10 by 50
A = LW
If the perimeter of this rectangle is 120 units, what is its area in square units 3
Rectangle with a perimeter of 120 units
If the perimeter of the rectangle is 120 units, then that means each side added together equals 120 which is 120 divided by 4 which gives you 30.
Now to find the area, all you have to do is multiply the length and the width which is 30 x 30 which gives you 90 square units.