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Is it possible to have a rectangle that has a greater area than other rectangles?
Wiki User
∙ 12y ago
yes it just means that it is longer and taller
Wiki User
∙ 12y ago
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What quadrilateral have all the same attributes of a rectangle?
Only other rectangles.
How do you determine if rectangles are Simular?
If the 'ratio' (length/width) of one rectangle is the same number as (length/width) of the other one, then the two rectangles are similar.
How do make a 3D paper rectangle?
Make 2 rectangles diagonally next to each other and put two 75 degree lines to connect the rectangles
What is the relationship between the perimeters of rectangles with the same area?
None, other than that if the area is x square units, the perimeter must be greater than or equal to 4*sqrt(x) units. It is possible to construct a rectangle for each and every one of the infinitely many values greater than 4*sqrt(x) units. Consequently, there can be no relationship as suggested by the question.
What shape has 3 rectangles?
There is no shape which has only three rectangle. And, if it has other faces, then there are many possibilities.
Are rectangles squares?
No, but a Square can be a rectangle. Not the other way around.A square is a regular rectangle!No its false
Can rectangles with the same perimeter have different areas?
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.
What quadrilateral have all the same attributes of a rectangle?
Only other rectangles.
How do you fine the length in a similar rectangles?
If you are given two similar rectangles, one with all measurements and the other with only one, you first need to find the conversion ratio. Let's call the rectangle that you know everything about, rectangle A, and the other rectangle B. You take the ratio of the side of rectangle B to rectangle A. You then multiply the length of rectangle A by this value, to find the length of rectangle B.
How do you find ratio of two rectangles?
If you are trying to find the ratio of the lengths of two similar rectangles, divide the length of one side of one rectangle by the corresponding side length of the other rectangle. To find the ratio between their volumes, divide the volume of one rectangle by the volume the other rectangle. To find volume, multiply the width of the rectangle by the length of the rectangle.
Why a square can be rectangle and rectangle can not be square?
The above statement is not true since some rectangles ARE squares. Squares are a special type of a rectangle - one in which all sides are of equal length. In other words, the set of all squares is a subset of the set of all rectangles.
How do you determine if rectangles are Simular?
If the 'ratio' (length/width) of one rectangle is the same number as (length/width) of the other one, then the two rectangles are similar.
What is its the width of 2 rectangles that the areas are 15cm2 and 60cm2 the lengt of the first rectangle is 5cm?
I can give the width of one of the rectangles. The first rectangle of area 15 cm2 and length of 5 cm has width of 3 cm. It is impossible to know the width of the other rectangle of area 60 cm2. However, if you had said that the two rectangles were similar, then the dimensions of the second rectangle would be 10 cm X 6 cm. But you didn't say that the two rectangles were similar; so there are infinite possibilities of what the dimensions of the second rectangle might be.
How do make a 3D paper rectangle?
Make 2 rectangles diagonally next to each other and put two 75 degree lines to connect the rectangles
What is the relationship between the perimeters of rectangles with the same area?
None, other than that if the area is x square units, the perimeter must be greater than or equal to 4*sqrt(x) units. It is possible to construct a rectangle for each and every one of the infinitely many values greater than 4*sqrt(x) units. Consequently, there can be no relationship as suggested by the question.
Why is eight tenths greater that three eighth?
It's greater because if you draw to thin rectangles and divide one into tenths and one into eighths. First color in three eighths. Then in the other rectangle color in eight tenths. Then what shaded rectangle has the greatest amount. The One with the greatest shaded amount is larger so so... eight tenths is greater then three eighths.I hope that helped :)
What shape has 3 rectangles?
There is no shape which has only three rectangle. And, if it has other faces, then there are many possibilities.
