Lesson 10 ~25 min Unit 3 · Measurement & Geometry +85 XP

Volume of Prisms

One rule covers every prism: $V = A_\text{base} \times h$ — find the cross-section area, then multiply by the length.

Today's hook: A swimming pool is 3 m wide, 1.5 m deep and 12 m long. How many litres does it hold? (1 m³ = 1000 L)

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Think First

warm-up

If you stack 1-cm cubes to fill a 3×4×2 box, how many cubes fit? Without counting every cube, how could you work it out faster?

Record your answer in your workbook.

The Big Idea

+5 XP

Volume measures the amount of 3D space a solid occupies. For any prism, the formula is: $V = A_\text{base} \times h$, where $A_\text{base}$ is the area of the cross-section and $h$ is the height (length) of the prism. The cross-section must be the face that stays constant as you move along the prism.

$$V = A_\text{base} \times h$$

Identify the cross-section first

The base is the shape that is constant as you slice along the prism. For a triangular prism it is the triangle, not one of the rectangular sides.

Cubic units

Volume is measured in cubic units: cm³, m³, mm³. Not square units (that is surface area).

Capacity link

1 cm³ = 1 mL. 1 000 cm³ = 1 L. 1 m³ = 1 000 L. Always check which unit you need for the answer.

What You'll Master

objectives

Know

$V = A_\text{base} \times h$ for any prism
Rectangular: $V = lwh$
Triangular: $V = \frac{1}{2}bh \times l$
1 cm³ = 1 mL; 1 000 cm³ = 1 L; 1 m³ = 1 000 L

Understand

Why the same formula works for every prism (constant cross-section)
How to identify the correct base for non-rectangular prisms
The difference between volume (cm³) and capacity (L, mL)

Can Do

Find volume of rectangular, triangular, and composite prisms
Convert volume answers to capacity (litres, millilitres)
Solve real-world filling and pool problems

Words You Need

vocabulary

VolumeThe amount of 3D space a solid occupies. Measured in cubic units (cm³, m³, mm³).

PrismA solid with a constant cross-section along its length. The two end faces are congruent and parallel.

Cross-sectionThe shape you get when you cut through the prism at right angles to its length. This is the "base" in $V = A_\text{base} \times h$.

CapacityThe amount of liquid a container can hold. 1 cm³ = 1 mL; 1 000 cm³ = 1 L; 1 m³ = 1 000 L.

Rectangular prismA box shape. Cross-section is a rectangle. $V = l \times w \times h$.

Triangular prismCross-section is a triangle. $V = \frac{1}{2}bh_\triangle \times l$, where $l$ is the prism length.

Spot the Trap

heads-up

Classic error: confusing the triangle's height with the prism's length in a triangular prism.

Wrong (used prism length as triangle height)

$V = \frac{1}{2} \times 8 \times 12 \times 5 = 240$ cm³ ✗ (used $l = 12$ as $h$)

Correct

$A_\triangle = \frac{1}{2} \times 8 \times 5 = 20$ cm² then $V = 20 \times 12 = 240$ cm³ ✓

Rule: Find $A_\text{base}$ first using the triangle's own base and height, then multiply by the prism's length.

Volume of Rectangular Prisms

+5 XP

For a rectangular prism (cuboid), the cross-section is a rectangle with area $A = l \times w$. Multiplying by the height $h$ gives:

$V = l \times w \times h$

This is also written $V = lwh$. Any order of multiplication works: $l \times w \times h = w \times l \times h$.

$$V = lwh$$

Any order

$5 \times 4 \times 3 = 4 \times 3 \times 5 = 60$. Multiplication is commutative, so choose the easiest order.

Volume of Triangular Prisms

+5 XP

The cross-section is a triangle. Find its area first: $A_\triangle = \frac{1}{2} \times b \times h_\triangle$, where $b$ and $h_\triangle$ are the triangle's base and perpendicular height. Then multiply by the prism length $l$:

$V = \frac{1}{2} \times b \times h_\triangle \times l$

$$V = \tfrac{1}{2}\,b\,h_\triangle \times l$$

Volume of Composite and Trapezoidal Prisms

+5 XP

For an L-shaped cross-section, split it into two rectangles, find both areas, add them, then multiply by the prism length.

For a trapezium cross-section: $A = \frac{1}{2}(a+b)h$ where $a$ and $b$ are the parallel sides. Then $V = A \times l$.

$A_\text{L-shape} = A_{R1} + A_{R2}$ then $V = A \times l$

Capacity Conversions

+5 XP

Volume and capacity are related by:

$1\ \text{cm}^3 = 1\ \text{mL}$
$1\ 000\ \text{cm}^3 = 1\ \text{L}$
$1\ \text{m}^3 = 1\ 000\ \text{L}$
$1\ \text{m}^3 = 1\ 000\ 000\ \text{mL}$

To convert cm³ to mL: same number. To convert cm³ to L: divide by 1 000.

$1\ \text{cm}^3 = 1\ \text{mL}$ $1\ 000\ \text{cm}^3 = 1\ \text{L}$ $1\ \text{m}^3 = 1\ 000\ \text{L}$

Check units first

If the question gives dimensions in cm but asks for litres, compute in cm³ then divide by 1 000. If in m then multiply m³ by 1 000.

Watch Me Solve It · 3 examples

WE 1 — Volume of a Rectangular Prism

+10 XP

PROBLEM

Find the volume of a rectangular box: $l = 5$ cm, $w = 4$ cm, $h = 3$ cm.

1
Write the formula
$$V = lwh$$
2
Substitute values
$V = 5 \times 4 \times 3$
3
Calculate
$V = 60$ cm³

Answer$V = 60$ cm³

WE 2 — Volume of a Triangular Prism

+10 XP

PROBLEM

A triangular prism has triangle base $b = 8$ cm, triangle height $h = 5$ cm, and prism length $l = 12$ cm. Find its volume.

1
Find the triangle cross-section area
$A_\triangle = \frac{1}{2} \times b \times h = \frac{1}{2} \times 8 \times 5 = 20$ cm²
2
Multiply by prism length
$V = A_\triangle \times l = 20 \times 12 = 240$ cm³

Answer$V = 240$ cm³

WE 3 — Pool Volume and Capacity

+10 XP

PROBLEM

A swimming pool is 3 m wide, 1.5 m deep and 12 m long. Find its volume in m³ and its capacity in litres.

1
Write the formula
$$V = lwh$$
2
Substitute values
$V = 12 \times 3 \times 1.5 = 54$ m³
3
Convert to litres
$54\ \text{m}^3 \times 1\,000 = 54\,000\ \text{L}$

Answer$V = 54\ \text{m}^3 = 54\,000\ \text{L}$

Common Pitfalls

heads-up

Confusing Triangle Height With Prism Length

Mistake: $V = \frac{1}{2} \times b \times l \times l$ (using length twice).

Fix: Label carefully. $b$ and $h_\triangle$ belong to the triangle; $l$ is the prism's length. Compute $A_\triangle$ first.

Giving Area Units Instead of Volume Units

Mistake: Writing the answer as cm² instead of cm³.

Fix: Volume is always cm³, m³, etc. If your answer has square units, you forgot to multiply by the third dimension.

Wrong Conversion Factor for Litres

Mistake: Multiplying m³ by 100 instead of 1 000.

Fix: 1 m³ = 1 000 L (not 100). Remember: $1\ \text{m} = 100\ \text{cm}$, so $1\ \text{m}^3 = 100^3\ \text{cm}^3 = 1\,000\,000\ \text{cm}^3 = 1\,000\ \text{L}$.

Copy Into Your Books

Any prism: $V = A_\text{base} \times h$

Rectangular prism: $V = lwh$

Triangular prism: $V = \frac{1}{2}bh_\triangle \times l$ — find triangle area first

Capacity: 1 cm³ = 1 mL 1 000 cm³ = 1 L 1 m³ = 1 000 L

How are you completing this lesson?

Brain Trainer · 4 problems

Brain Trainer · Volume of Prisms

4 problems

Set a timer for 4 minutes. Show all working.

1 Find V of a cube with side 6 cm.

$V = 6 \times 6 \times 6 = 216$ cm³
2 Triangular prism: $b = 10$ cm, $h_\triangle = 6$ cm, $l = 8$ cm.

$A = \frac{1}{2}(10)(6) = 30$ cm². $V = 30 \times 8 = 240$ cm³
3 Box 20 cm × 15 cm × 10 cm. Find volume in cm³ then in litres.

$V = 20 \times 15 \times 10 = 3\,000$ cm³ $= 3$ L
4 Hook pool: 3 m × 1.5 m × 12 m. Find volume and capacity in litres.

$V = 3 \times 1.5 \times 12 = 54$ m³ $= 54\,000$ L

Complete in your workbook.

Quick Check · 5 questions

Which formula gives the volume of any prism?

+10 XP

Volume of a box: $l = 4$ cm, $w = 5$ cm, $h = 6$ cm.

+10 XP

Triangular prism: $b = 8$ cm, $h_\triangle = 5$ cm, $l = 12$ cm.

+10 XP

A box 15 cm × 10 cm × 10 cm. What is its capacity in mL?

+10 XP

A pool is 4 m long, 2 m wide, 3 m deep. How many litres does it hold?

+10 XP

Show Your Working · 3 questions

Show Your Working

9 marks total

ApplyMedium3 MARKS

Q6. A rectangular storage box is 8 cm × 5 cm × 6 cm. Find its volume in cm³ and its capacity in millilitres.

Show full working in your book.

ApplyMedium3 MARKS

Q7. A triangular prism has a right-angled triangular cross-section with legs 9 cm and 12 cm. The prism is 20 cm long. Find its volume.

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ReasonHard3 MARKS

Q8. An L-shaped cross-section prism is 15 cm long. The L-shape can be split into two rectangles: one 8 cm × 4 cm and one 6 cm × 3 cm. Find the prism's volume.

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Comprehensive Answers

MC: 1-B, 2-C, 3-A, 4-B, 5-D

Q6: $V = 8 \times 5 \times 6 = 240$ cm³ $= 240$ mL.

Q7: $A_\triangle = \frac{1}{2} \times 9 \times 12 = 54$ cm². $V = 54 \times 20 = 1\,080$ cm³.

Q8: $A_\text{total} = 32 + 18 = 50$ cm². $V = 50 \times 15 = 750$ cm³.

Stretch Challenge · +25 XP

Fish Tank Problem

A rectangular fish tank is 80 cm long, 40 cm wide and 50 cm tall. Water is filled to a depth of 40 cm.

(a) How many litres of water are in the tank?

(b) 8 litres evaporate. By how many centimetres does the water level drop?

Reveal solution

(a) $V = 80 \times 40 \times 40 = 128\,000$ cm³ $= 128$ L.

(b) $8$ L $= 8\,000$ cm³. Base area $= 80 \times 40 = 3\,200$ cm². Drop $= 8\,000 \div 3\,200 = 2.5$ cm.

Quick Review

Any prism

$V = A_\text{base} \times h$

Rectangular prism

$V = lwh$

Triangular prism

$V = \frac{1}{2}bh_\triangle \times l$

Composite prism

Split cross-section, add areas, then $\times h$

1 cm³ = 1 mL

1 000 cm³ = 1 L 1 m³ = 1 000 L

Key pitfall

Triangular prism: use triangle's $h$, not prism length, for $A_\triangle$

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