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What is the largest and smallest perimeter possible for a rectangle with a area of 42?
Wiki User
∙ 11y ago
Largest = 86, Smallest 26
Wiki User
∙ 11y ago
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If two shapes have the same perimeter will they have the same area?
Not at all. For example:A square of 2 x 2 will have a perimeter of 8, and an area of 4. A rectangle of 3 x 1 will also have a perimeter of 8, and an area of 3.A "rectangle" of 4 x 0 will also have a perimeter of 8, but the area has shrunk down to zero. The circle has the largest area for a given perimeter/circumference.
The perimeter of a triangle is 57 the first side is twice the length of the second side the third side is seven more than the second side what is the length of each side?
the perimeter of a triangle is 86 inches. the largest side is four inches less than twice the smallest side. the third side is 10 inches longer than the smallest side. what is the length of each side?
What is the term for data in order form smallest to largest?
From smallest to largest is known as putting data in ascending order.
What is the largest area that you can have if the perimeter is 24 feet?
You get the largest area with a circle. Divide the perimeter by (2 x pi), then calculate the area with the formula pi x radius2.You get the largest area with a circle. Divide the perimeter by (2 x pi), then calculate the area with the formula pi x radius2.You get the largest area with a circle. Divide the perimeter by (2 x pi), then calculate the area with the formula pi x radius2.You get the largest area with a circle. Divide the perimeter by (2 x pi), then calculate the area with the formula pi x radius2.
What is the largeest and the smallest area possible for a rectangle with a area of 36cm2?
We are baffled. You say the area of the rectangle is 36 cm2, but you ask us to calculate the range over which it changes, without describing anything about the influences, conditions, factors, ideologies, or processes that might cause it to change. If we are to accept your assertion that the area of the figure is in fact 36 cm2 ... an assertion made, we must believe, in all good faith and sincerity ... then we must conclude that 36 cm2 is in fact the area of the bloody thing, for once and for all time. We can expect nothing other than that 36 cm2 is the largest possible area, as well as the smallest possible area, the mean, median, mode area, and root-mean-square area as well, also, too.
What is the largest and the smallest perimeter possible for a rectangle with a area of 24cm2?
The smallest perimeter is 4*sqrt(24) = approx 19.6 cm There is no largest perimeter.
What is the largest and smallest perimeter possible for a rectangle with a area of 100?
The smallest is just over 40 units. At 40 units it is no longer a rectangle but a square. There is no largest perimeter.
What is the largest and smallest rectangle with the perimeter of 16?
A 4 by 4 and a 1 by 7.
Find the dimensions of the rectangle with an area of 100 square units and whole-number side lengths that has the largest perimeter or the smallest perimeter?
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
What is the greatest perimeter of a rectangle with integer side lengths and an area of 2014 sq cm?
For any given area, the rectangle closest to a square will have the smallest perimeter; and the one that is most "stretched out" has the largest perimeter. In this case, that would be a width of 1 and a length of 2014.
Give the demensions of the rectangle with an area of 100 square units and whole number side lenghts that has the largest perimeter and the smallest perimeter?
i think that the biggest one would be 1x100 (area) and 202 (perimeter) but i am not sure
What are the dimensions of a rectangle with the smallest possible area with a perimeter of 72 yards?
if the rectangle is a square 18yd x 18yd, the area = 324 sq yd. that us the largest area. As one side gets smaller, the other side get larger.If the smallest length you can measure is 1 yd., the rectangle would be 1 yd. x yd 35 yd.= 35 sq. yd. IF you can draw a line .01 yd.long, the other side of the rectangle is 36.99 yd. long. .01 yd x 36.99 yd = .3599 sq yd. There is no smallest area, only a largest area.
Do shapes with the largest area have the largest perimeter?
If the shapes are similar, such are all circles or all squares, those with the largest perimeters would also have the largest areas. However, in general there is no direct relation. For example a 2 by 2 rectangle has an area of 4 and a perimeter of 8, but a 2000 by 0.0005 rectangle has an area of 1 and a perimeter of 4000.001.
What is the largest rectangle you can have using 47916 square feet?
The answer depends on what your criterion for deciding what is "largest". Any rectangle will have an area of 47916 square feet. Its perimeter can be infinitely large.
What is the relationship between the length and width that will provide the largest area of a three sided rectangle?
There is no such thing as a three sided rectangle. They have four sides. Length and width of a rectangle being THE SAME (having a 1:1 ratio) will provide the largest area possible. In other words, for a given perimeter, a square is the largest rectangle. If you mean a triangle (which has three sides), then all sides being equal will still yield the largest area.
Is it possible for two shapes to have the same area but different perimeters?
Yes it is possible. Consider these two shapes with the same area: a 2-inch square and a 1-inch x 4-inch rectangle both have the same area of 4 sq inches. However, the square has a perimeter of 8 inches while the rectangle has a perimeter of 10 inches. By the way, the shape with the largest area for a given perimeter is a circle.
If two shapes have the same perimeter will they have the same area?
Not at all. For example:A square of 2 x 2 will have a perimeter of 8, and an area of 4. A rectangle of 3 x 1 will also have a perimeter of 8, and an area of 3.A "rectangle" of 4 x 0 will also have a perimeter of 8, but the area has shrunk down to zero. The circle has the largest area for a given perimeter/circumference.
