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Module 1 · L13 of 13 ~45 min ⚡ +90 XP available

Comparing Linear Models and Break-Even Points

Compare options using linear equations, find where two models are equal, and explain which option is better under different conditions. A lower starting cost is not always best — the rate tells the real story.

Today's hook — Plan A costs $20 plus $5 per gigabyte. Plan B costs $50 plus $2 per gigabyte. Which plan is cheaper? The answer is: it depends — and maths tells you exactly when to switch.

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Worksheets

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Three printable worksheets that build from foundations to mastery — or build your own from any module’s questions.

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Recall — your gut answer first

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Plan A costs $20 plus $5 per gigabyte. Plan B costs $50 plus $2 per gigabyte. Which plan is cheaper?

Without calculating — write what extra information you need before deciding. Which plan would you lean towards and why?

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The break-even method

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When comparing two options, set the two equations equal and solve for the input where both outputs match. This is the break-even point — the moment when neither option is cheaper than the other.

Fixed cost is the amount paid regardless of usage. Rate is how much each extra unit costs. A low fixed cost can be misleading if the rate is high — over time, the rate dominates.

Solve: $20 + 5g = 50 + 2g \Rightarrow g = 10$

Identify fixed cost and rate

Write $C = \text{fixed} + \text{rate} \times n$ for each option. Fixed cost is the y-intercept; rate is the gradient.

Set equal and solve

$\text{Model A} = \text{Model B}$ gives the input where both models output the same value.

Justify both sides

A break-even answer is incomplete without stating which option is better before and after the intersection.

What you'll master

Know

Key facts

A break-even point is where two models have the same output.
The intersection point can represent equal cost, equal distance or equal savings.
The cheaper option can change depending on the input value.

Understand

Concepts

A lower starting cost is not always the best long-term option.
A lower rate becomes more important as the input increases.
A decision should be justified for a specific range or condition.

Can do

Skills

Write two linear equations for competing options.
Find and interpret a break-even point.
Justify which model is better before and after the break-even point.

Key terms

Break-even pointThe input value at which two linear models give the same output.

Fixed costThe amount paid regardless of usage — the y-intercept of the linear model.

RateThe cost per unit of the input variable — the gradient of the linear model.

Linear modelAn equation of the form $C = a + bx$ where $a$ is the fixed cost and $b$ is the rate.

IntersectionThe point where two graphs meet; the input and output values are equal for both models at this point.

Justified decisionA conclusion that states which option is better, for what range of input values, and why.

Compare both starting cost and rate

core concept

A linear model with a low starting value can become expensive if its rate is high. When comparing options, identify the fixed cost and the repeated rate for each option. Then compare at the input value that matters.

Do not choose the cheaper starting cost without considering the rate. For small input values, the model with the lower fixed cost tends to be cheaper. For large input values, the model with the lower rate tends to be cheaper.

Common error: Do not choose the cheaper starting cost without considering the rate. Always check both components before deciding.

Break-even: where Revenue = Cost. Below: loss zone (red). Above: profit zone (green)

What to write in your book

A linear model takes the form $C = a + bx$ where $a$ is the fixed cost and $b$ is the rate per unit.
To find the break-even point: set Model A = Model B and solve for $x$.
A lower fixed cost does NOT mean cheaper overall — the rate matters more for large input values.
Always state which option is cheaper both below and above the break-even point.

Did you get this? True or false: when comparing two linear models, the option with the lower fixed cost will always be cheaper in the long run.

A table can check the intersection

core concept

After finding a break-even point algebraically, a table of values can confirm the result by showing both models producing the same output at the break-even input.

Gigabytes	5	10	15
Plan A: $20 + 5g$	$45	$70	$95
Plan B: $50 + 2g$	$60	$70	$80

The table confirms the break-even point at 10 GB because both costs are $70. At 5 GB, Plan A ($45) is cheaper. At 15 GB, Plan B ($80) is cheaper.

What to write in your book

Build a table substituting values either side of the break-even point to verify your algebra.
The break-even input is confirmed when both model outputs are equal in the table.
Below the break-even point, the model with the lower fixed cost is usually cheaper.
Above the break-even point, the model with the lower rate is always cheaper.

Fill the gap: Using the phone plan table above — at 5 GB Plan A costs $ and Plan B costs $60, so Plan is cheaper below the break-even point.

Worked examples · 3 in a row, reveal as you go

PROBLEM 1 · FIND THE BREAK-EVEN POINT

Plan A costs $20 plus $5 per gigabyte. Plan B costs $50 plus $2 per gigabyte. Find the number of gigabytes where the plans cost the same.

Let $g$ be the number of gigabytes. Plan A: $A = 20 + 5g$. Plan B: $B = 50 + 2g$.

Define the variable and write a linear model for each option.

PROBLEM 2 · DECIDE WHICH OPTION IS CHEAPER

Using the same plans (A: $20 + 5g$; B: $50 + 2g$), decide which is cheaper before and after 10 GB.

At 5 GB: Plan A = $20 + 5(5) = \$45$. Plan B = $50 + 2(5) = \$60$.

Substitute $g = 5$ into each formula. Plan A is $15 cheaper at this point.

PROBLEM 3 · COMPARE SAVINGS PLANS

Sam starts with $200 and saves $30 per week. Alex starts with $80 and saves $50 per week. When will they have the same amount?

Sam: $S = 200 + 30w$. Alex: $A = 80 + 50w$.

Let $w$ = weeks. Write a linear model for each person's savings.

What to write in your book

Always define your variable before writing the models (e.g. "Let $g$ = gigabytes").
Set the two equations equal and solve algebraically.
Verify with substitution: substitute the break-even value into both models — outputs must match.
Decision habit: state which model is better before the break-even point, and which is better after.

Quick check: Sam: $S = 200 + 30w$. Alex: $A = 80 + 50w$. After the break-even point (week 6), who has more savings?

Common errors · the 3 traps that cost marks

Trap 01

Choosing the lower fixed cost without checking the rate

A model with a $20 fixed cost looks cheaper than one with $50 — but if its rate is $5 vs $2, it will become more expensive after the break-even point. Always compare both components before deciding.

Trap 02

Giving the break-even point without explaining what it means

Stating "$g = 10$" alone is not a full answer. You must interpret: "At 10 GB both plans cost $70. Below 10 GB Plan A is cheaper; above 10 GB Plan B is cheaper." The decision either side of the point is worth marks.

Trap 03

Arithmetic error when rearranging the equation

When setting $20 + 5g = 50 + 2g$, collect the $g$ terms first: $5g - 2g = 50 - 20$, giving $3g = 30$. A common error is subtracting from the wrong side. Always check by substituting your answer back into both models.

What to write in your book

Always check your answer: substitute the break-even $x$-value into both models — the outputs must be equal.
The question usually wants a decision, not just a number — state which is cheaper and for what range.
The model with the lower rate wins for large inputs; the model with the lower fixed cost wins for small inputs.
A break-even point is only useful if you explain what happens before and after it.

Match each term to its meaning:

Quick-fire practice · 4 calculations

Company A charges $40 plus $12 per hour. Company B charges $70 plus $6 per hour. Find the break-even time.

Using Question 1, decide which company is cheaper for 3 hours and for 8 hours.

Two savings plans are $150 + 20w$ and $30 + 35w$. Find when they are equal.

Explain in one sentence why the cheaper option can change as the input increases.

Two truths and a lie: Three statements about break-even points are below. Which one is false?

Revisit the phone plans

The plans break even at 10 GB. Below 10 GB, Plan A is cheaper. Above 10 GB, Plan B is cheaper because it has the lower per-gigabyte rate.

Earlier you wrote what information you needed before deciding. Now that you have found the break-even point, explain why the answer depends on the number of gigabytes.

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Multiple choice

+5 XP per correct · +25 XP all-correct

Pick your answer, then rate your confidence — that tells the system what to drill next. Each retry pulls a fresh mix from the bank.

Short answer

ApplyBand 44 marks

Q1. Company A charges $35 plus $10 per hour. Company B charges $65 plus $4 per hour. Find the break-even time. (4 marks)

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ApplyBand 44 marks

Q2. Using Question 1, decide which company is cheaper for 3 hours and for 8 hours. (4 marks)

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UnderstandBand 32 marks

Q3. Explain what a break-even point means in a model comparison question. (2 marks)

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📖 Comprehensive answers (click to reveal)

Drill 1: Company A: $C = 40 + 12t$; Company B: $C = 70 + 6t$. Set equal: $40 + 12t = 70 + 6t \Rightarrow 6t = 30 \Rightarrow t = 5$ hours.

Drill 2: At 3 hr: A = $76, B = $88 → A is cheaper. At 8 hr: A = $136, B = $118 → B is cheaper.

Drill 3: $150 + 20w = 30 + 35w \Rightarrow 120 = 15w \Rightarrow w = 8$ weeks.

Drill 4: The cheaper option changes because the model with the lower rate eventually overtakes the model with the lower fixed cost as input increases.

Q1 (4 marks): Let $t$ = hours [1]. Company A: $A = 35 + 10t$; Company B: $B = 65 + 4t$ [1]. Set equal: $35 + 10t = 65 + 4t \Rightarrow 6t = 30 \Rightarrow t = 5$ hours [1]. Interpretation: At 5 hours both companies charge $85 [1].

Q2 (4 marks): At 3 hr: A = $35 + 30 = \$65$; B = $65 + 12 = \$77$ → Company A is cheaper [2]. At 8 hr: A = $35 + 80 = \$115$; B = $65 + 32 = \$97$ → Company B is cheaper [2].

Q3 (2 marks): A break-even point is the input value where both linear models produce the same output [1]. It marks the boundary between which option is cheaper — one option is better below the break-even point and the other is better above it [1].

Boss battle · Break-Even Sort

earn bronze · silver · gold

Compare fixed costs and rates, solve the equality, then state which option wins on each side. Beat the boss to bank a tier — gold (90% + speed), silver (75%), or bronze (50%). Replays welcome.

⚔ Enter the arena

Science Jump · platform challenge

Climb platforms by answering break-even and linear model comparison questions. Pool: lesson 13.

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Module overview · Mathematics Standard