3.1 and 2.9 units
3.2 and 2.8 units
3.3 and 2.7 units
etc
or
3.01 and 2.99 units
3.02 and 2.98 units
3.03 and 2.97 units
etc.
All you need to do is to have two different postitve numbers that sum to 6 (half of 12)
1 unit x 5 units2 units x 4 units3 units x 3 units
There is only one equilateral triangle with a perimeter of 60 units. Its side lengths are integers.
Length of rectangle is 18 units and its width is 2 units
36 square units. You can't express a perimeter in square units; a perimeter is a length expressed in ordinary units. If the perimeter of this square is 24 units then the answer above is correct.
Perimeter is the length around the object, so it is a linear quantity. For n sided figures, you add the lengths of the n sides. Multiplication would give you units of area.
1 unit x 5 units2 units x 4 units3 units x 3 units
There are an infinite number of rectangles with this perimeter. The "whole number" sides could be (5 x 1), (4 x 2) or (3 x 3), but (5½ x ½) or (3¼ x 2¾) etc would fit the description.
area = 144 square units perimeter = 48 units
Yes, I could draw three rectangles with 12 units, so long as the perimeter of the rectangles sum up to 12. You're probably asking for integer lengths, though. A square is a special type of rectangle where all the sides are the same length, so I could have 3 squares with a side length of 1 unit, which gives 3x(1x4)=12 units.
Since the perimeter is a sum of lengths, it will also be a length.
The perimeter is 26 units.
Perimeter = 2 x (width + length)⇒ 12 = 2 x (width + length)⇒ width + length = 6⇒ the rectangles could be:1 by 52 by 43 by 3[A square is a rectangle with equal sides.]
There is only one equilateral triangle with a perimeter of 60 units. Its side lengths are integers.
Assuming that 7 and 9 are the lengths - in some units - of the sides of a rectangle, its perimeter is 32 units of length.
Type your answer here... give the dimensions of the rectangle with an are of 100 square units and whole number side lengths that has the largest perimeter and the smallest perimeter
There are three possibilities.. 1 x 12... 2 x 6 & 3 x 4
1 x 5 2 x 4 3 x 3