what are the dimensions of the rectangle with this perimeter and an area of 8000 square meters
The answer depends entirely on how the dimensions change. It is possible to change the dimensions without changing the perimeter. It is also possible to change the dimensions without changing the area. (And it is possible to change the area without changing the perimeter.)
Area is quadrupled (*4) and perimeter is doubled.
no the area is 16,000,000 the perimeter is 16,000
When all of the linear dimensions are doubled . . .-- the perimeter is also doubled-- the area is multiplied by 22 = 4.
The area and perimeter of a parallelogram are not sufficient to determine its dimensions.
10 by 10
A 3 x 3 square has perimeter 12 and area 9 A 6 x 6 square has perimeter 24 and area 36 Double the dimensions, double the perimeter, quadruple the area. Mathematically, a square with side x has a perimeter of 4x and an area of x2 Doubled, a square with side 2x has a perimeter of 8x and an area of 4x2
The dimensions can be 4 units by 4 units
When linear dimensions are multiplied by 'K', - perimeter is also multiplied by 'K' - area is multiplied by K2 - volume is multiplied by K3
Area of square 400 so dimensions 20 x 20 making perimeter 80
By halving its perimeter and using the quadratic equation formula.