How to calculate the area of a cuboid?
If you are given the length, width and height of a cuboid, the area of the cuboid is equal to length × width × height. If you have a 2-dimensional cuboid, length refers to the length of the sides of the cuboid, width refers to the width of the front of the cuboid, and height refers to the height of the cuboid. For a 3-dimensional cuboid, length refers to the length of the sides of the cuboid, width
How to find the area of a right-angled prism?
A right-angled prism is a three-dimensional solid, formed by three equal length edges meeting at 90-degree angles at each vertex. A right-angled prism has six sides and eight vertices (the corners of the prism). If you measure each side of a right-angled prism and add them together, you will get the total surface area of the prism. To find the surface area of a right-angled prism, you need to multiply the length of each base by the height of the
How to calculate the area of a right angled prism?
A right-angled prism is a 3-dimensional solid with six sides. The sides are each a square (and thus, the surface area is also a square). To find the surface area of a right-angled prism, you need to multiply the length of each side by the length of a square.
How to calculate the area of a square cuboid?
A square cuboid that is standing on its edges has a volume of 1 cubic meter. In order to determine the area of a square cuboid, you first need to know the length of each side. The length of a side is the distance between two corners. In the example below, the length of three sides is 12 centimeters, so the area of the square cuboid is (1 × 1 × 12)², which equals 144 square centimeters. You can use the Pythagorean Theorem
How to calculate the area of a cap?
A capped cuboid is a three-dimensional shape having four faces and six edges. The capped cuboid has two opposite faces each of which is a rectangle. The two remaining sides are isosceles triangles. It is possible to calculate the area of the capped cuboid from the areas of the basic shapes that these sides are composed of. The height of the cuboid is equal to the length of one of the sides. The area of the capped cuboid equals the sum of the areas of