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Volume (Edexcel GCSE Maths)
Revision Note
Volume
What is volume?
- The volume of a 3D shape is a measure of how much space it takes up
- You need to be able to calculate the volumes of a number of common 3D shapes
How do I find the volume of cuboids, prisms, and cylinders?
- To find the volume of a cuboid use the formula
Volume of a cuboid = length × width × height
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- You will sometimes see the terms 'depth' or 'breadth' instead of 'height' or 'width'
- A cuboid is in fact another name for a rectangular-based prism
- To find the volume of a prism use the formula
Volume of a prism = area of cross-section × length
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- Note that the cross-section can be any shape, so as long as you know its area and length, you can calculate the volume of the prism
- Or if you know the volume and length of the prism, you can calculate the cross-section area
- To calculate the volume of a cylinder with radius, r and height, h, use the formula
Volume of a cylinder = πr2h
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- Note that a cylinder is in fact a circular-based prism: its cross-section is a circle with area πr2, and its length is h
How do I find the volume of pyramids, cones, & spheres?
- To calculate the volume of a pyramid with height h, use the formula
Volume of a pyramid = 1/3 × area of base × h
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- Note that to use this formula the height must be a line from the top of the pyramid that is perpendicular to the base
- To calculate the volume of a cone with base radius r and height h, use the formula
Volume of a cone = 1/3 πr2h
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- Note that a cone is in fact a circular-based pyramid
- As with a pyramid, to use the cone volume formula the height must be a line from the top of the cone that is perpendicular to the base
- To calculate the volume of a sphere with radius r, use the formula
Volume of a sphere = 4/3 πr3
Examiner Tip
- The formula for volume of a sphere or volume of a cone will be given to you in an exam question if you need it
- You need to memorise the other volume formulae
Worked example
A sculptor has a block of marble in the shape of a cuboid, with a square base of side 35 cm and a height of 2 m.
He carves the block into a cone, with the same height as the original block and with a base diameter equal to the side length of the original square base.
What is the volume of the marble he removes from the block whilst carving the cone.
Give your answer in m3, rounded to 3 significant figures.
The volume of the removed material will be equal to the volume of the original marble minus the volume of the cone.
Find the volume of the original marble.
Convert the units of the length, width and height of the cuboid into the same units, either metres or cm.
The question asks for the answer in m3 so it makes sense to use this throughout your calculations.
Length = width = 0.35 m
Height = 2 m
Substitute the values into the formula for the volume of a cuboid.
Find the radius of the base of the cone, this will be half of the diameter.
Find the volume of the cone by substituting the radius and the height into the formula for the volume of a cone.
Find the volume of the marble that was removed by subtracting the volume of the cone from the volume of the cuboid.
Volume removed = 0.245 - 0.0641409 = 0.180859...
Round the answer to 3 significant figures.
Volume of removed marble = 0.181 m3 (3 s.f.)
Problem Solving with Volumes
How can I solve problems when its not a "standard" 3D shape?
- Often the shape in a question will not be a standard cuboid, cone, sphere, etc
- It will likely either be:
- A prism (3D shape with the same cross-section running through it)
- A portion or fraction of a standard shape (a hemisphere for example)
- If the shape is a prism, recall that the volume of a prism is the cross sectional area × its length
- The cross-sectional area may be a compound shape, such an an L-shape, or a combination of a rectangle and a triangle for example
- If the shape is a fraction of a standard shape, consider the "full" version of the shape and then find the appropriate fraction of it
- A hemisphere is half a sphere
- A frustum is a truncated (chopped-off) cone or pyramid
- The volume of a frustum will be the volume of the smaller cone or pyramid subtracted from the volume of the larger cone or pyramid
Examiner Tip
- Before you start calculating, make a quick note of your plan to tackle the question
- e.g. "find the area of the triangle and the rectangle, add together, times by the length"
Worked example
A doll's house is in the shape of a prism pictured below. The prism consists of a cuboid with a triangular prism on top of it. The cross section of the triangular prism is an isosceles right-angled triangle. Find the volume of the doll's house.
Our strategy is to find the area of the triangle and the rectangle and add them together to find the cross-sectional area, and then multiply this by the length to find the volume
As it is an isosceles triangle, length
We can then use Pythagoras to find length
Length will also be
Finding the area of the triangle using
Finding the area of the rectangle
The total cross-sectional area is therefore the triangle plus the rectangle
Finding the volume of the prism by multiplying the cross-sectional area by the length
Rounding to 3 significant figures
79 900 cm3
Worked example
The diagram shows a truncated cone (a frustum). Using the given dimensions, find the volume of the frustum.
To find the volume of the frustum, find the volume of the larger cone (30 cm tall, with a radius of 20 cm), and subtract the volume of the smaller cone (15 cm tall, with a radius of 10 cm)
Formula for the volume of a cone:
Calculate the volume of the larger cone
Calculate the volume of the smaller cone
Find the difference
Round to 3 significant figures
11 000 cm3
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