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Lesson 15 ~35 min Unit 2 · Linear Relationships +100 XP

Linear Modelling

Apply linear equations to the real world, taxi fares, plumbers, cyclists and currency. Learn to identify rates and fixed costs in any context.

Today's hook: A taxi charges a $5 flag fall plus $2 per kilometre. A 3 km trip costs $11. A 10 km trip costs $25. Can you write the equation?
0/5QUESTS
Think First
warm-up

A taxi charges a $5 flag fall plus $2 per kilometre travelled.

  • How much would a 3 km trip cost?
  • How much would a 10 km trip cost?
  • Can you write an equation for the cost $C$ of any trip of distance $d$ km?
3 km: $C = 2 \times 3 + 5 = \$11$. 10 km: $C = 2 \times 10 + 5 = \$25$. Equation: $C = 2d + 5$
1
What is Linear Modelling?
+5 XP

A linear model uses the equation $y = mx + c$ to describe a real-world relationship. The trick is to identify which quantity is $x$, which is $y$, what the rate $m$ is, and what the starting value $c$ is.

Real-world situation$x$ (input)$y$ (output)$m$ (rate)$c$ (fixed)
Taxi fareDistance (km)Total cost ($)Cost per kmFlag fall
Phone billNumber of textsTotal cost ($)Cost per textMonthly fee
Distance travelledTime (hours)Distance (km)Speed (km/h)Starting distance
Temperature conversionCelsiusFahrenheitScale factorOffset

General strategy:

  1. Read the problem and identify the two changing quantities.
  2. Decide which one depends on the other, this is $y$.
  3. Look for a “per” rate, this is $m$.
  4. Look for a fixed starting amount, this is $c$.
  5. Write the equation: $y = mx + c$.
Tip: “per”
Whenever you see “per”, think gradient.
Tip: starting fee
Whenever you see a starting fee or base charge, think y-intercept.
Always define
Always define what $x$ and $y$ represent in your model.
5 10 15 20 25 2 4 6 8 Distance (km) Cost ($) Fixed cost = $5 Rate = $2/km Taxi Cost: C = 2d + 5
2
Cost Models
+5 XP

Cost models have the form:

$$\text{Total Cost} = (\text{rate} \times \text{quantity}) + \text{fixed cost}$$

Or simply: $$C = mx + c$$

Worked Example, Plumber: $80 call-out + $50/hr. Total cost for 3 hours?
  1. Identify the fixed cost and the rate

    Fixed cost (call-out fee) $= c = 80$

    Rate (cost per hour) $= m = 50$

  2. Write the equation

    $$C = 50x + 80$$

  3. Substitute $x = 3$ hours

    $$C = 50 \times 3 + 80 = 150 + 80 = 230$$

  4. State the answer with units

    The total cost for 3 hours is $230.

Always include units in the answer and check the answer is reasonable.
0 100 200 300 400 0 1 2 3 4 5 Hours ($x$) Cost ($) $230 $80 fixed Plumber Cost: $C = 50x + 80$
3
Distance-Speed-Time
+5 XP

In distance-time graphs, the gradient represents speed. A steeper line means faster travel.

$$\text{Distance} = \text{speed} \times \text{time} + \text{starting distance}$$

Or: $d = vt + d_0$

Worked Example, Cyclist starts 5 km from home, rides at 15 km/h. Distance after 2 hours?
  1. Identify the variables

    Starting distance $= d_0 = 5$ km

    Speed (gradient) $= v = 15$ km/h

  2. Write the equation

    $$d = 15t + 5$$

  3. Substitute $t = 2$

    $$d = 15 \times 2 + 5 = 30 + 5 = 35$$

  4. State the answer in context

    After 2 hours, the cyclist is 35 km from home.

The gradient on a distance-time graph always has units of km/h or m/s, it is the speed.
0 10 20 30 40 50 0 1 2 3 4 Time (hours) 35 km Starts at 5 km 15 km/h Cyclist: $d = 15t + 5$
4
Conversion Graphs
+5 XP

A conversion graph is a straight line that converts one unit to another. You can read values directly from the graph or use the equation.

Worked Example, Currency graph through (0,0) and (100 AUD, 65 USD). Convert 40 AUD.
  1. Find the gradient (exchange rate)

    $$m = \frac{65 - 0}{100 - 0} = 0.65$$

    This means 1 AUD = 0.65 USD.

  2. Write the equation

    Line passes through (0, 0), so $c = 0$: $y = 0.65x$

  3. Substitute $x = 40$ AUD

    $$y = 0.65 \times 40 = 26$$

  4. State the answer

    40 AUD = 26 USD.

When the line passes through the origin, $c = 0$, there is no fixed amount.
0 20 40 60 80 0 25 50 75 100 125 AUD ($x$) 26 USD Rate: 0.65 AUD to USD: $y = 0.65x$
5
Interpreting Gradient in Context
interpretation

The gradient $m$ in a linear model always tells you the rate of change. Its meaning depends entirely on what the variables represent.

ContextWhat $m$ meansExample value
Taxi fare vs distanceCost per kilometre$m = 2.50$ means $2.50 per km
Distance vs timeSpeed$m = 60$ means 60 km/h
Water bill vs usageCost per kilolitre$m = 1.50$ means $1.50 per kL
Wages vs hours workedHourly rate$m = 25$ means $25 per hour
Temperature conversionScale factor$m = \frac{9}{5}$ relates Celsius to Fahrenheit
Include units
The gradient always has units of $\frac{\text{y-units}}{\text{x-units}}$. Include units to show you understand the context.
6
Interpreting Intercept in Context
interpretation

The y-intercept $c$ is the value of $y$ when $x = 0$. It represents a starting value, fixed cost, or base amount.

ContextWhat $c$ meansExample
Taxi fareFlag fall$c = 3.60$ means $3.60 flag fall
Phone planMonthly base fee$c = 30$ means $30/month regardless of usage
Gym membershipJoining fee$c = 100$ means $100 one-time joining fee
Temperature conversionOffset constant$c = 32$ in $F = \frac{9}{5}C + 32$
Watch out: $c = 0$
Sometimes there is no fixed cost. Currency conversion has $c = 0$, 0 AUD = 0 USD. The line passes through the origin.
Brain Trainer
speed drill

Set a timer for 3 minutes. Solve as many as you can!

1

A taxi costs $5 flag fall + $3 per km. Write the equation for cost $C$.

Answer

$C = 3d + 5$

2

Using $C = 3d + 5$, what is the cost for 8 km?

Answer

$C = 3 \times 8 + 5 = 29$. Cost is $29.

3

A car travels at 60 km/h. Write the equation for distance $d$ after $t$ hours.

Answer

$d = 60t$

4

Using $d = 60t$, how far does the car travel in 2.5 hours?

Answer

$d = 60 \times 2.5 = 150$ km.

5

A phone plan costs $25/month + $0.15 per text. Find the cost for 100 texts.

Answer

$C = 0.15 \times 100 + 25 = 40$. Cost is $40.

6

What is the gradient of the line through $(0, 10)$ and $(5, 30)$?

Answer

$m = \frac{30-10}{5-0} = 4$

7

Write the equation of a line with $m = 2.5$ and $c = 12$.

Answer

$y = 2.5x + 12$

8

A gym charges $80 joining fee + $18/week. When does the total reach $260?

Answer

$260 = 18w + 80$ → $w = 10$ weeks.

9

Convert 30°C to Fahrenheit using $F = 1.8C + 32$.

Answer

$F = 1.8 \times 30 + 32 = 86$°F.

10

A water bill is $C = 1.2x + 10$ where $x$ is kL. What is the fixed charge?

Answer

$10 (the y-intercept).

Q1
A plumber charges a $60 call-out fee plus $40 per hour. Which equation gives the total cost $C$ for $x$ hours?
10 XP
Q2
A car travels at 80 km/h. On a distance-time graph, which variable represents the gradient?
10 XP
Q3
A phone plan costs $30 per month plus $0.10 per text. In $C = 0.1x + 30$, what is the fixed cost?
10 XP
Q4
The graph shows printing cost against brochures. What is the cost per brochure?
10 XP
0 50 100 150 200 0 50 100 150 200 Number of brochures Printing Cost
Q5
Water is charged at $1.50 per kilolitre plus a $15 service fee. What is the cost for 20 kL?
10 XP
SAQ1
Short Answer
15 XP

A taxi charges a $4 flag fall plus $1.80 per kilometre.

(a) Write a linear equation for the cost $C$ in terms of distance $d$.

(b) Calculate the cost of a 15 km trip.

Sample solution

(a) The rate is $1.80 per km and the fixed cost is $4. $C = 1.8d + 4$

(b) Substitute $d = 15$: $C = 1.8 \times 15 + 4 = 27 + 4 = 31$. A 15 km trip costs $31.

SAQ2
Short Answer
15 XP

A temperature conversion graph passes through $(0, 32)$ and $(100, 212)$, where $x$ is Celsius and $y$ is Fahrenheit.

(a) Find the equation in the form $y = mx + c$.

(b) Convert 25°C to Fahrenheit.

Sample solution

(a) $m = \frac{212-32}{100-0} = \frac{180}{100} = \frac{9}{5}$. $c = 32$. Equation: $F = \frac{9}{5}C + 32$ (or $y = 1.8x + 32$).

(b) $y = \frac{9}{5} \times 25 + 32 = 45 + 32 = 77$. So 25°C = 77°F.

SAQ3
Short Answer
20 XP

A gym charges a $100 joining fee plus $20 per week.

(a) Write an equation for the total cost $C$ after $w$ weeks.

(b) After how many weeks has the total cost reached $500?

Sample solution

(a) $C = 20w + 100$

(b) $500 = 20w + 100$ → $400 = 20w$ → $w = 20$. The total reaches $500 after 20 weeks.

Stretch Challenge, Break-Even Analysis
extension

A bakery sells cupcakes. It costs $200 per day in rent and wages, plus $1.20 for ingredients per cupcake. Each cupcake sells for $3.50.

(a) Write a linear equation for the total cost $C$ of making $n$ cupcakes.

(b) Write a linear equation for the revenue $R$ from selling $n$ cupcakes.

(c) Find the break-even point the number of cupcakes where cost equals revenue.

Hint

The break-even point is where $C = R$. Set the two equations equal and solve for $n$.

Full solution

(a) $C = 1.2n + 200$

(b) $R = 3.5n$

(c) At break-even, $C = R$:

$$1.2n + 200 = 3.5n$$

$$200 = 2.3n$$

$$n \approx 87 \text{ cupcakes}$$

0 200 400 600 800 0 50 100 150 200 Cupcakes sold ($n$) 87, $304 Cost Revenue Break-Even Analysis
Key Takeaways
copy these
Linear model form$y = mx + c$, $m$ is the rate of change, $c$ is the starting/fixed value.
Gradient in contextAlways has units of $\frac{\text{y-units}}{\text{x-units}}$ e.g. $/km, km/h, $/hr.
y-intercept in contextThe value when $x = 0$, flag fall, joining fee, base charge, offset.
StrategyFind “per” → $m$. Find fixed amount → $c$. Define variables. Write equation. Substitute. Check.
Lesson Complete!
+100 XP

You can now apply linear equations to real-world situations, identifying rates, fixed costs, and interpreting graphs in context.

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