The greatest possible area of a rectangle is simply the area of a square, which is a special type of rectangle.in order to find the area of that square:4s=96 (4s=4 sides)s=24A=lwA=24*24A=576so the area of that rectangle would be 576 ft...
98 square feet
12 cm
the answer to number 20 is B...12
Perimeter: 150+15+150+15 = 330 feet Area: 150*15 = 2250 square feet
81 square feet.
If it's allowed to be a square, 625 square feet. If not, 624 square feet.
5
4 feet
4 feet
2
The perimeter is 18 feet.
Write two simultaneous equations and solve them. One for the perimeter, one for the area.
The area cannot be 15 feet since that is a measure of length, not area. In any case, information about the area cannot determine the perimeter; it can only put a lower limit on it. The perimeter can be anyhting from 15.49193 ft upwards. Consider the following rectangles, all with area = 15 square feet: a sqrt(15)*sqrt(15) rectangle will have a perimeter of 4*sqrt(15) = 15.49193 ft (approx). 1ft*15ft rectangle will have a perimeter of 32 feet 0.1ft*150ft rectangle: perimeter = 300.2 feet 0.01ft*1500ft rectangle: perimeter = 3000.02 ft 0.001ft*15000ft rectangle: perimeter = 30000.002 ft by now you should see that there is no upper limit to the perimeter.
Area is 1.44 square feet Perimeter is 6 feet.
. What is the greatest area possible enclosed by a quadrilateral with a perimeter of 24 feet?
The width is either 2ft or 7ft.