Difference between revisions of "Prism"
m (→See Also) |
|||
(2 intermediate revisions by 2 users not shown) | |||
Line 1: | Line 1: | ||
{{stub}} | {{stub}} | ||
− | A '''prism''' is a solid that has two [[parallel]] base faces that are [[congruent]] [[polygons]]. Each of the other sides of a | + | A '''prism''' is a solid that has two [[parallel]] base faces that are [[congruent]] [[polygons]]. Each of the other sides of a'prism is a [[parallelogram]]. Examples of prisms include a [[parallelepipeds]], or, more specifically, a [[cube]]. A prism may also be classified as a right prism if the faces connecting to the base faces are [[perpendicular]] to the base faces. |
==Finding Area and Volume of a Prism== | ==Finding Area and Volume of a Prism== | ||
The [[volume]] of a prism is the area of the base face multiplied by the height. (If the prism is not a '''right prism,''' then the height is merely the perpendicular height from the base face.) The [[surface area]] of a prism is calculated by the sum of [[perimeter]] of the base face multiplied by the height of the prism and twice the area of a base face. | The [[volume]] of a prism is the area of the base face multiplied by the height. (If the prism is not a '''right prism,''' then the height is merely the perpendicular height from the base face.) The [[surface area]] of a prism is calculated by the sum of [[perimeter]] of the base face multiplied by the height of the prism and twice the area of a base face. | ||
+ | {{stub}} | ||
− | ==See | + | |
− | * [[Cube]] | + | ==See Also== |
+ | * [[Cube (geometry)]] | ||
* [[Parallelepiped]] | * [[Parallelepiped]] | ||
* [[Parallelogram]] | * [[Parallelogram]] | ||
* [[Polygon]] | * [[Polygon]] | ||
+ | * [[Hexagonal Prism]] | ||
+ | |||
+ | [[Category:Geometry]] | ||
+ | [[Category:Definition]] |
Latest revision as of 15:45, 9 December 2023
This article is a stub. Help us out by expanding it.
A prism is a solid that has two parallel base faces that are congruent polygons. Each of the other sides of a'prism is a parallelogram. Examples of prisms include a parallelepipeds, or, more specifically, a cube. A prism may also be classified as a right prism if the faces connecting to the base faces are perpendicular to the base faces.
Finding Area and Volume of a Prism
The volume of a prism is the area of the base face multiplied by the height. (If the prism is not a right prism, then the height is merely the perpendicular height from the base face.) The surface area of a prism is calculated by the sum of perimeter of the base face multiplied by the height of the prism and twice the area of a base face.
This article is a stub. Help us out by expanding it.