IB Math AA SL Topic 5.1: Introduction to derivatives | Notes & Flashcards | Aimnova

IB Math AA SL — Introduction to derivatives

Topic 5.1 of IB Mathematics: Analysis and Approaches covers Introduction to derivatives, which is part of Unit 5: Calculus. Students explore key concepts including Derivative as gradient. A strong understanding of introduction to derivatives is essential for IB Math AA SL exams and builds the foundation for connected topics across the syllabus.

Key concepts in Introduction to derivatives

Key Idea: This topic is about reading the steepness of a curve: the derivative is the gradient at a single point and the instantaneous rate of change. It's the conceptual foundation for all of calculus — mostly tested on Paper 1 (interpret and reason, no calculator).

📈 What the derivative is

A straight line has one gradient everywhere; a curve keeps changing steepness, so we use the gradient at a point — the gradient of the tangent there (never a chord). The same number is also a rate of change: how fast y changes per unit of x at an instant (if x is time, the instantaneous rate). Always carry units — (y-units) per (x-unit).

✍️ Notation: f′(x) and dy/dx

f'(x) = \frac{dy}{dx}

$f'(x)$: "f prime of x" — the gradient function
$\frac{dy}{dx}$: rate of change of y with respect to x (same thing)

± Sign of the gradient = shape of the curve

✏️ IB-style worked examples

IB-style question — interpret a rate of change

The height h (cm) of a plant after t weeks satisfies dh/dt = 3.5 when t = 6. Interpret this value, with units.

Step by step:

dh/dt is the rate the height changes per week.
$\frac{dh}{dt} = 3.5 \text{ cm per week}$
The value is given at t = 6 specifically.
$\text{at } t = 6$

Final answer:

At t = 6 weeks the plant's height is increasing at 3.5 cm per week.

IB-style question — gradient at a point from f′(x)

The gradient function of a curve is f′(x) = 4x − 5. Find the gradient of the curve at x = 2.

Step by step:

Substitute x = 2 into the gradient function.
$f'(2) = 4(2) - 5$
Evaluate.
$= 3$

Final answer:

The gradient at x = 2 is 3.

IB-style question — increasing or decreasing?

For a function g, g′(−1) = 7 and g′(4) = −2. State whether g is increasing or decreasing at each point.

Step by step:

At x = −1 the derivative is positive.
$g'(-1) = 7 > 0 \Rightarrow \text{increasing}$
At x = 4 the derivative is negative.
$g'(4) = -2 < 0 \Rightarrow \text{decreasing}$

Final answer:

Increasing at x = −1; decreasing at x = 4.

Important: The gradient at a point is the gradient of the tangent there — not the average gradient of a chord between two points, and not a single fixed number for the whole curve. To get a value, substitute the x into f′(x).

Tap each card to reveal the answer.

Exam Tips

Gradient at a point = gradient of the tangent there (not a chord, not one number for the whole curve).
f′(x) and dy/dx mean the same thing — the gradient function.
To get a gradient value, substitute the x-value into f′(x).
f′(x) > 0 increasing, f′(x) < 0 decreasing, f′(x) = 0 stationary.
A rate of change carries units: (y-units) per (x-unit), e.g. cm per week.

IB Math AA SL — Introduction to derivatives

Key concepts in Introduction to derivatives

Key Idea: This topic is about reading the steepness of a curve: the derivative is the gradient at a single point and the instantaneous rate of change. It's the conceptual foundation for all of calculus — mostly tested on Paper 1 (interpret and reason, no calculator).

📈 What the derivative is

A straight line has one gradient everywhere; a curve keeps changing steepness, so we use the gradient at a point — the gradient of the tangent there (never a chord). The same number is also a rate of change: how fast y changes per unit of x at an instant (if x is time, the instantaneous rate). Always carry units — (y-units) per (x-unit).

✍️ Notation: f′(x) and dy/dx

f'(x) = \frac{dy}{dx}

$f'(x)$: "f prime of x" — the gradient function
$\frac{dy}{dx}$: rate of change of y with respect to x (same thing)

± Sign of the gradient = shape of the curve

✏️ IB-style worked examples

IB-style question — interpret a rate of change

The height h (cm) of a plant after t weeks satisfies dh/dt = 3.5 when t = 6. Interpret this value, with units.

Step by step:

dh/dt is the rate the height changes per week.
$\frac{dh}{dt} = 3.5 \text{ cm per week}$
The value is given at t = 6 specifically.
$\text{at } t = 6$

Final answer:

At t = 6 weeks the plant's height is increasing at 3.5 cm per week.

IB-style question — gradient at a point from f′(x)

The gradient function of a curve is f′(x) = 4x − 5. Find the gradient of the curve at x = 2.

Step by step:

Substitute x = 2 into the gradient function.
$f'(2) = 4(2) - 5$
Evaluate.
$= 3$

Final answer:

The gradient at x = 2 is 3.

IB-style question — increasing or decreasing?

For a function g, g′(−1) = 7 and g′(4) = −2. State whether g is increasing or decreasing at each point.

Step by step:

At x = −1 the derivative is positive.
$g'(-1) = 7 > 0 \Rightarrow \text{increasing}$
At x = 4 the derivative is negative.
$g'(4) = -2 < 0 \Rightarrow \text{decreasing}$

Final answer:

Increasing at x = −1; decreasing at x = 4.

Important: The gradient at a point is the gradient of the tangent there — not the average gradient of a chord between two points, and not a single fixed number for the whole curve. To get a value, substitute the x into f′(x).

Tap each card to reveal the answer.

Exam Tips

Gradient at a point = gradient of the tangent there (not a chord, not one number for the whole curve).
f′(x) and dy/dx mean the same thing — the gradient function.
To get a gradient value, substitute the x-value into f′(x).
f′(x) > 0 increasing, f′(x) < 0 decreasing, f′(x) = 0 stationary.
A rate of change carries units: (y-units) per (x-unit), e.g. cm per week.

IB Math AA SL — Introduction to derivatives

Key concepts in Introduction to derivatives

📈 What the derivative is

✍️ Notation: f′(x) and dy/dx

± Sign of the gradient = shape of the curve

✏️ IB-style worked examples

IB-style question — interpret a rate of change

IB-style question — gradient at a point from f′(x)

IB-style question — increasing or decreasing?

Exam Tips

What you'll learn in Topic 5.1

Study resources — 5.1 Introduction to derivatives

Derivative as gradient

Ready to study Introduction to derivatives?

Ready to practice?

IB Math AA SL — Introduction to derivatives

Key concepts in Introduction to derivatives

📈 What the derivative is

✍️ Notation: f′(x) and dy/dx

± Sign of the gradient = shape of the curve

✏️ IB-style worked examples

IB-style question — interpret a rate of change

IB-style question — gradient at a point from f′(x)

IB-style question — increasing or decreasing?

Exam Tips

What you'll learn in Topic 5.1

Study resources — 5.1 Introduction to derivatives

Derivative as gradient

Ready to study Introduction to derivatives?

Ready to practice?