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What are three different rectangles that have an area of 12 square units?
Thee different rectangles with an area of 12 square units are 3 by 4, 2 by 6 and 1 by 12.
What strategies are there to find the surface area of three-dimensional shapes made from rectangles and triangles?
Find the areas of the rectangles and triangles. Add them together.
How does surface area differ from the area?
Area is for two-dimensional shapes, like rectangles or squares, and surface area is for three-dimensional shapes, like pyramids and cylinders.
How do you find the are of a cross?
You could consider the cross as two intersecting rectangles. Calculate the area of both rectangles and the area of the intersection (overlap). Then area of cross = sum of the areas of the rectangles minus the area of the overlap.
What is the area of a L shaped room?
An L-shaped area can be divided into two rectangles. The total area is the sum of the areas of the two rectangles.
How many different rectangles with an area of 32 square units can you make?
To find the different rectangles with an area of 32 square units, we need to consider the factor pairs of 32. The pairs are (1, 32), (2, 16), (4, 8), and their reverses, giving us the dimensions of the rectangles: 1x32, 2x16, 4x8, and 8x4. However, since the order of dimensions does not create a new rectangle, we have four unique rectangles: 1x32, 2x16, and 4x8. Thus, there are three distinct rectangles with an area of 32 square units.
How many rectangles can be made with an area of 10 square inches?
The answer is Infinite...The rectangles can have an infinitely small area and therefore, without a minimum value to the area of the rectangles, there will be an uncountable amount (infinite) to be able to fit into that 10 sq.in.
What is the difference between inscribed and circumscribed in integration?
When rectangles are inscribed, they lie entirely inside the area you're calculating. They never cross over the curve that bounds the area. Circumscribed rectangles cross over the curve and lie partially outside of the area. Circumscribed rectangles always yield a larger area than inscribed rectangles.
How many rectangles have the same area and perimeter of 18?
thare is only 1 differint rectangles
How are rectangles related to the distributive property?
Rectangles are related to the distributive property because you can divide a rectangle into smaller rectangles. The sum of the areas of the smaller rectangles will equal the area of the larger rectangle.
Why does rectangles have the same area and perimeter?
they dont
How many smaller rectangles are there in an area model that represents 27 x 83?
To determine the number of smaller rectangles in an area model representing 27 x 83, you would multiply the number of smaller rectangles along the length and width. In this case, there are 27 smaller rectangles along the length and 83 smaller rectangles along the width. Multiplying these numbers together gives you a total of 27 x 83 = 2241 smaller rectangles in the area model.
