Volume is the amount of space an objects takes up, this can be the amount of space a 3D shape occupies or the space that a substance (solid, liquid or gas) fills. It is measured using units such as cubic millimetres (mm^{3}), cubic centimetres (cm^{3}) and cubic metres (m^{3}).
To find the volume of rectangular prisms we can multiply the three dimensions together. Multiplying the length by the breadth gives us the area of the base, we can then multiply this by the height to find the volume.
The volume of a rectangular prism is given by
$\text{Volume }=\text{length }\times\text{breadth }\times\text{height }$Volume =length ×breadth ×height , or
$V=l\times b\times h$V=l×b×h
To find the volume of a triangular prism, we can do as we did for the rectangular prism and find the number of squares that would cover the base (area of the base) multiplied by the height.
So the volume is:
$\text{Volume }=\text{Area of the triangle }\times\text{Height of the prism }$Volume =Area of the triangle ×Height of the prism
Since the prism can look quite different depending on the triangular face and which way it is orientated we need to be cautious about which measurements we use in our calculations.
To calculate the volume of a triangular prism we need the base and perpendicular height of the triangular face as well as the length of the prism  the distance between the two triangular faces, which is also referred to as the perpendicular height of the prism
Given these three measurements the volume of a triangular prism can be found as follows.
For triangular prisms:
$\text{Volume }=\text{Area of the triangle}\times\text{height of the prism}$Volume =Area of the triangle×height of the prism
Which we can simplify to $V=Ah$V=Ah.
Find the volume of the triangular prism shown.
Think: We want to identify the base and perpendicular height of the triangular face and the length of the prism. We can then use the formula: $\text{Volume }=\text{Area of triangle}\times\text{height of the prism}$Volume =Area of triangle×height of the prism.
Do:
$V$V  $=$=  $\text{Area of triangle}\times\text{height of the prism}$Area of triangle×height of the prism 
Write down formula. 
$=$=  $\left(\frac{1}{2}\times4\times3\right)\times6$(12×4×3)×6 
Substitute in given lengths. 

$=$=  $6\times6$6×6 
Evaluate the area first 

$=$=  $36$36 
Evaluate the product to find the volume 
So the volume of the triangular prism is $36$36 cm^{2}.
Reflect: We can see that in the case of both the rectangular prism, and the triangular prism, we first calculated the area of the flat base that makes up the shape, and then multiplied this by the height of the prism. There is nothing special about these two shapes, and in fact, we can find the volume of any prism using the same method. That is, if we know the area of the base and the height of the prism we can find the volume.
For all prisms:
$\text{Volume }=\text{Area of the base}\times\text{height of the prism}$Volume =Area of the base×height of the prism
Which we can simplify to $V=Ah$V=Ah.
Find the volume of the figure shown.
Consider the prism shown in the diagram.
What is the shape of the base of this prism?
Parallelogram
Triangle
Rectangle
Square
Find the area of the prism's base.
Find the volume of the prism.
A cylinder is very similar to a prism (except for the lateral face), so the volume can be found using the same concept we have already learnt.
$\text{Volume of Cylinder }$Volume of Cylinder  $=$=  $\text{Area of Base }\times\text{Height of Prism}$Area of Base ×Height of Prism 
$\text{Volume of Cylinder }$Volume of Cylinder  $=$=  $\pi r^2\times h$πr2×h 
$\text{Volume of Cylinder }$Volume of Cylinder  $=$=  $\pi r^2h$πr2h 
Consider the solid shown in the diagram.
What is the shape of the base of this solid?
Cylinder
Semicircle
Rectangle
Circle
Find the exact area of the solid's base. Leave your answer in terms of $\pi$π.
Find the exact volume of the solid. Leave your answer in terms of $\pi$π.
Find the volume of the cylinder rounded to two decimal places.
Sometimes we might know the volume of a prism but we are missing one measurement such as the the length or height. Using division, we can work backwards from the formula to find out the missing value.
For example: since a cube has equal length, width and height, if we know its volume then we can work out its side length by taking the cube root of the volume or asking ourselves "What value multiplied by itself $3$3 times will equal the given volume?".
A rectangular prism has a volume of $330$330 cm^{3}, and has a length of $22$22 centimetres and width of $5$5 centimetres. What is the height of the prism?
Think: The volume is length multiplied by width multiplied by height. To find an unknown value we need to divide the volume by the known values. We can write this formally in an equation and rearrange the equation to find the height.
Do:
$V$V  $=$=  $L\times W\times H$L×W×H 
Write the formula. 
$330$330  $=$=  $22\times5\times H$22×5×H 
Substitute in known values. 
$330$330  $=$=  $110H$110H 
Simplify the right hand side. 
$\frac{330}{110}$330110  $=$=  $\frac{110H}{110}$110H110 
Divide both sides by $110$110. 
$H$H  $=$=  $3$3 
Simplify the quotients 
We can see that the prism has a height of $3$3 cm.
A prism has a volume of $990$990 cm^{3}.
If it has a base area of $110$110 cm^{2}, find the height of the prism.