Introduction to rectangular pyramid vertices
The pyramid is the solid form objects through a polygon for a bottom. Each faces joint on one point. The bottom of a rectangular pyramid is for all time a rectangle. The rectangular pyramid includes the five vertices. It normally contains five sides. Let us see about the rectangular pyramid vertices.
Rectangular Pyramid Vertices
A rectangular pyramid contains five vertices.
Rectangular pyramid is geometrical form within math. Usually pyramids are objects which contain a pyramid like formation through a triangular or else rectangular or else square or else pentagonal base etc. The bottom is which categorized the kind of pyramids. Pyramid through a rectangular bottom is identified as rectangular pyramid.
The rectangular pyramid contains the five vertices and five sides, eight edges.
In the above rectangular pyramid contains five vertices.
The volume of right rectangular pyramid = `1/3` x base x height
Example
Given the length = 12 cm, width = 15 cm, height = 18 cm.
The volume of right rectangular pyramid = `1/3` x base x height
= `1/3` x (length x width) x height.
= `1/3` x (12 x 15) x 18
= `1/3` x 180 x 18
= `1/3` x 3240
= 1080
Therefore the volume of right rectangular pyramid is 1080 cm3
Between, if you have problem on these topics geometric probability formula, please browse expert math related websites for more help on math word problem solver online.
Examples for Rectangular Pyramid
Example 1
Compute the volume of rectangular pyramid if length = 8 cm, width = 10 cm, height = 14 cm.
Solution
Given the length = 8 cm, width = 10 cm, height = 14 cm.
The volume of right rectangular pyramid = `1/3` x base x height
= `1/3` x (length x width) x height.
= `1/3` x (8 x 10) x 14
= `1/3` * 80 x 14
= `1/3` * 1120
= 373.3
Therefore the volume of right rectangular pyramid is 373.3 cm3
Example 2
Compute the volume of rectangular pyramid if length = 6 cm, width = 12 cm, height = 20 cm.
Solution
Given the length = 6 cm, width = 12 cm, height = 20 cm.
The volume of right rectangular pyramid = `1/3` x base x height
= `1/3` x (length x width) x height.
= `1/3` x (6 x 12) x 20
= `1/3` x 72 x 20
= `1/3` x 1440
= 480
Therefore the volume of right rectangular pyramid is 480 cm3
The pyramid is the solid form objects through a polygon for a bottom. Each faces joint on one point. The bottom of a rectangular pyramid is for all time a rectangle. The rectangular pyramid includes the five vertices. It normally contains five sides. Let us see about the rectangular pyramid vertices.
Rectangular Pyramid Vertices
A rectangular pyramid contains five vertices.
Rectangular pyramid is geometrical form within math. Usually pyramids are objects which contain a pyramid like formation through a triangular or else rectangular or else square or else pentagonal base etc. The bottom is which categorized the kind of pyramids. Pyramid through a rectangular bottom is identified as rectangular pyramid.
The rectangular pyramid contains the five vertices and five sides, eight edges.
In the above rectangular pyramid contains five vertices.
The volume of right rectangular pyramid = `1/3` x base x height
Example
Given the length = 12 cm, width = 15 cm, height = 18 cm.
The volume of right rectangular pyramid = `1/3` x base x height
= `1/3` x (length x width) x height.
= `1/3` x (12 x 15) x 18
= `1/3` x 180 x 18
= `1/3` x 3240
= 1080
Therefore the volume of right rectangular pyramid is 1080 cm3
Between, if you have problem on these topics geometric probability formula, please browse expert math related websites for more help on math word problem solver online.
Examples for Rectangular Pyramid
Example 1
Compute the volume of rectangular pyramid if length = 8 cm, width = 10 cm, height = 14 cm.
Solution
Given the length = 8 cm, width = 10 cm, height = 14 cm.
The volume of right rectangular pyramid = `1/3` x base x height
= `1/3` x (length x width) x height.
= `1/3` x (8 x 10) x 14
= `1/3` * 80 x 14
= `1/3` * 1120
= 373.3
Therefore the volume of right rectangular pyramid is 373.3 cm3
Example 2
Compute the volume of rectangular pyramid if length = 6 cm, width = 12 cm, height = 20 cm.
Solution
Given the length = 6 cm, width = 12 cm, height = 20 cm.
The volume of right rectangular pyramid = `1/3` x base x height
= `1/3` x (length x width) x height.
= `1/3` x (6 x 12) x 20
= `1/3` x 72 x 20
= `1/3` x 1440
= 480
Therefore the volume of right rectangular pyramid is 480 cm3