better way to explain the picture one rec is standing up ont he left the other two are on there side on top of each other agaist the standing one so they make a bigger rec with all the little rectangles inside......
Infinite amounts.
Yes. Say there are two rectangles, both with perimeter of 20. One of the rectangles is a 2 by 8 rectangle. The area of this rectangle is 2 x 8 which is 16. The other rectangle is a 4 by 6 rectangle. It has an area of 4 x 6 which is 24.
Yes, it can because a 3 by 6 rectangle has the perimeter of 18 and has the area of 18! :)
what is the perimeter of the rectangle
Yes of course. Each rectangle will have a width half its length.
No rectangle can have equal perimeter and length.
Infinite amounts.
Yes. Say there are two rectangles, both with perimeter of 20. One of the rectangles is a 2 by 8 rectangle. The area of this rectangle is 2 x 8 which is 16. The other rectangle is a 4 by 6 rectangle. It has an area of 4 x 6 which is 24.
The perimeter of a rectangle is the sum of its four sides. Add the sides for both rectangles, then compare the results.
Yes, it can because a 3 by 6 rectangle has the perimeter of 18 and has the area of 18! :)
It is a 3 x 15 rectangle !
That depends on the rectangle! You can have different rectangles with the same area, but with different perimeters.
There is no relationship between the perimeter and area of a rectangle. Knowing the perimeter, it's not possible to find the area. If you pick a number for the perimeter, there are an infinite number of rectangles with different areas that all have that perimeter. Knowing the area, it's not possible to find the perimeter. If you pick a number for the area, there are an infinite number of rectangles with different perimeters that all have that area.
Rectangles Perimeter Is 2L + 2W. 2(7) + 2(4) = Perimeter 14 + 8 = Perimeter Perimeter = 22
It is: 2(x+y) = perimeter whereas x is the width and y is the length of the rectangle
the answer is 11 sq cm
No, it is not. I'll give you two examples of a rectangle with a perimeter of 1. The first rectangle has dimensions of 1/4x1/4. The area is 1/16. The second rectangle has dimensions of 3/8x1/8. The area is 3/64. You can clearly see that these two rectangles have the same perimeter, yet the area is different.