2%g=34cm
You can only make one unique rectangle with a given area measured in square centimeters because the dimensions of the rectangle (length and width) must multiply to equal that specific area. While multiple pairs of dimensions can yield the same area, they will result in rectangles with different proportions. For example, an area of 12 cm² can be represented by rectangles of dimensions 1x12, 2x6, or 3x4, but they are not identical rectangles. Therefore, for a single area value, there is a unique rectangular shape when considering the constraints of integer dimensions.
The greatest area that a rectangle can have is, in fact, attained when it is a square. A square with perimeter of 16 cm must have sides of 4 cm and so an area of 4*4 = 16 cm2.
From the statement of the problem, if w is the width, the area is 2w2 , the product of the width and the length, which is stated to be twice the width. Since 2w2 must be less than 50, w2 < 25, and the width must be less than 5 meters.
No, two rectangles with the same perimeter do not necessarily have the same area. The area of a rectangle is calculated as length multiplied by width, while the perimeter is the sum of all sides. For example, a rectangle with dimensions 2x5 (perimeter 14) has an area of 10, while a rectangle with dimensions 3x4 (also perimeter 14) has an area of 12. Thus, rectangles can have the same perimeter but different areas.
We can't calculate anything regarding the rectangle, as there's a strong indication that there must be something fishy about it. A rectangle has only two dimensions, and we can't imagine what to do with the three numbers given for the rectangle in the question.
No, two rectangles with the same area do not necessarily have the same perimeter. For example, a rectangle with dimensions 2 x 6 has an area of 12 and a perimeter of 16, while a rectangle with dimensions 3 x 4 also has an area of 12 but a perimeter of 14. Thus, different combinations of length and width can yield the same area but different perimeters.
The area of a rectangle is simply its length times its width. In this case, you must first convert the dimensions to the same unit. Convert everything to feet, or convert everything to yards (your choice), then multiply.
To calculate the volume of a rectangle, you must multiply the length, the width, and the height--so the volume depends on the dimensions.
A hectar must have 10,000 square meters, or an area equivalent to 100 x 100 meters. Any rectangle with such an area will have an area of a hectar, for example 50 x 50, 80 x 125, 3 x 3333.333..., etc. Of course, you can also have a circle, for example, with an area of a hectar (just plug the desired area into the formula for a circle).
in order to find the area of a rectangle you must multiply the base of the rectangle by its height. This is also the same for most polygons
If you have a rectangle with sides as follows: 4,4,3,3 the area is 12cm2 and the perimeter is 14. Area: 4cmx3cm=12cm2 Perimeter: * 4+4=8 * 3+3=6 * 8+6=14cm
In order to find the area of a rectangle, you must follow the formula A= l x w where A is area, l is length, and w is width.