Understanding Volume Concepts of a Rectangular Prism
Key Concepts
- Volume of the rectangular prism
Develop a volume formula
Rectangular prism
A three-dimensional shape with six faces, in which all the faces of the prism are rectangles and opposite faces are equal to each other.
Real life examples of rectangular prism.
What is a formula?
A formula is a rule that uses a symbol to relate two or more quantities.
Example:
c = a +b
Volume of a rectangular prism
What is a volume?
Volume is the number of cubic units required to pack a solid figure without gaps or over laps.
There are two methods to find the volume of rectangle prism:
- Counting the number of cubes
- Using a formula.
Example for volume by counting the number of cubes:
Let us calculate the volume of the below rectangular prism:
You can see three cubes are arranged in three rows in two sets.
So, if you count the cubes, the volume will be 18 cubic units.
Example 1: Find the volume of rectangular prism.
Solution:
The volume of bottom layer is 6 x 4 = 24 cubic units.
When we muultiply the volume of the bottom layer by 3.
The volume of the prism is 3 x 24 or 72 cubic units.
Now, we can conclude that the volume of the prism =6 × 4 × 3 = 72
Thus, the volume of the prism V = l × w × h
Using V = l × w × h formula
The volume of the rectangular prism is simply obtained by multiplying all three dimensions . length, height and width.
the V = l × w × h
w is the base width of the rectangular prism
l is the base length of the rectangular prism
h would be height of the rectangular prism
Example 1:
Length, width and height of the base of the rectangular prism are 6 cm, 9 cm and 4 cm respectively. Find the volume of the rectangular prism?
Solution:
Given,
l = 6 cm
w = 9 cm
h = 4 cm
Using volume of a rectangular prism, V = l × w × h
= (6 × 9 )× 4
= 54 × 4
= 216 cm3
Example 2:
Length, width, height of the rectangular prism are 12 cm, 2 cm, and 3 cm, respectively. What is the volume of the prism?
Solution:
Let us calculate the volume of the rectangular prism using the following steps:
Given, length = 12 cm, width = 2 cm,
height = 3 cm.
Using Volume of a Rectangular Prism V = l × w × h
= (12 × 2 )× 3
=24 × 3
= 72 mm3
The volume of rectangular prism is 72 cubic mm or 72 mm3
Using V = B × h formula
Formula of a volume of the rectangular prism is V= B × h
Example 1:
The base area and height of a rectangular prism are 452 in and 7 in, respectively. What is the volume of the prism?
Solution:
Let us calculate the volume of the rectangular prism using the following steps:
Step 1: The base area b = 45 in2.
Step 2: Height of the prism is 7 inches.
Step 3: Volume of the given rectangular prism V = B × h
base area × height
= 45 × 7
= 315 in3
The volume of rectangular prism is 315 cubic inches or 315 in3.
Example 2:
The base area and height of a rectangular prism are 20 cm2 and 3 cm, respectively. What is the volume of the prism?
Solution:
Step 1: The base area b = 20 cm2
Step 2: Height of the prism is 3 cm.
Step 3: The volume of the given rectangular prism
V = B × h
base area × height
= 20 × 3
= 60 cm3
Volume of a rectangular prism is 60 cubic cm or 60 cm3
Exercise
- The length, width, and height of a rectangular prism are 15 cm, 10 cm, and 5 cm,
respectively. What is the volume of the prism? - Find the volume of rectangular prism.
- Find the volume of the figure.
- Find the volume of the rectangular prism.
- Find the volume of a rectangular prism.
- Color the base part of the rectangular prism.
- Find base area of a rectangular prism.
- Find the volume of a rectangular prism.
Base area 12 cm2
- Find the volume of a fish tank that is 8 feet long and 5 feet wide, and the height is
5 feet. - Find the volume of an aquarium.
Base area 12 ft2
Concept Map
What have we learned
- Understanding the formula, volume and rectangular prism.
- How to find volume of rectangular prism by counting the cubes?
- How to find volume of rectangular prism using the formula (V) =1 x b x h.
- How to find volume of rectangular prism using the formula (V) = B x h.
Related topics
Square 1 to 20 : Chart, Table, Perfect Squares and Examples
Square 1 to 20 When you multiply a number by itself, the result is called a square. And when you’re preparing for exams, you need to have a foundation for algebra and quick mental math because you get a really short time to do your exam. Therefore, learning the squares from one to twenty is […]
Square 1 to 40 : Table, Perfect Squares, Chart and Examples
Square 1 to 40 When you multiply a number by itself, the resulting number is a square, and if you are someone who is either appearing in a competitive exam or just wants to do well in math in school, knowing square 1 to 40 is a really important skill. But manually multiplying every time, […]
Square Root : Definition, Formula, Methods and Types Explained
Square Root Square roots are one of those seemingly daunting maths topics that appear in many different situations, from algebra to geometry. Yet the concepts behind them aren’t as hard to grasp. It makes handling numbers far easier if you know the concept well. Let us understand how to find the square roots of a number […]
Cubes 1 to 20 : Chart, Table, Memory Tricks and Examples
Most students don’t struggle much with smaller cubes like 2³ or 3³. Those usually come quickly. The hesitation starts with numbers like 11³ or 17³. Or when someone suddenly asks, what is 20 cubed? That pause is not a memory problem. It’s about the lack of proper understanding and hence confidence. Naturally, learning cubes 1 […]
Other topics
Comments: