Functions and Graphs

Subject: Mathematics
Topic: 2
Cambridge Code: 0580

Functions

Function - Relationship between input and output

Function Notation

$f(x) = 2x + 3$

Read as: "f of x equals 2x plus 3"

Input: x
Output: f(x)
f(2) = 2(2) + 3 = 7

Domain and Range

Domain - Set of all possible input values

Range (Codomain) - Set of all possible output values

Example: $f(x) = \sqrt{x}$

Domain: $x ≥ 0$ (cannot take square root of negative)
Range: $f(x) ≥ 0$ (square roots are non-negative)

Types of Functions

Linear: $f(x) = mx + c$

Straight line
One solution usually

Quadratic: $f(x) = ax^2 + bx + c$

Parabola
Up to two solutions

Cubic: $f(x) = ax^3 + bx^2 + cx + d$

S-shaped curve
Up to three solutions

Rational: $f(x) = \frac{p(x)}{q(x)}$

Discontinuous at zeros of denominator
May have vertical asymptotes

Trigonometric: $f(x) = \sin x, \cos x, \tan x$

Periodic functions
Specific domains and ranges

Exponential: $f(x) = a^x$

Continuous growth or decay
Always positive

Logarithmic: $f(x) = \log_a x$

Inverse of exponential
Domain: x > 0

Inverse Functions

Inverse function - Undoes original function

Finding Inverse

Process:

Write $y = f(x)$
Swap x and y
Solve for y
Replace y with $f^{-1}(x)$

Example: $f(x) = 2x + 3$ $y = 2x + 3$ $x = 2y + 3$ $2y = x - 3$ $y = \frac{x - 3}{2}$ $f^{-1}(x) = \frac{x - 3}{2}$

Conditions for Inverse

Function must be:

One-to-one (injective): Each output from exactly one input
Onto (surjective): Every possible output is achieved

Graphical test: Horizontal line test

Horizontal line intersects graph at most once

Property

$f(f^{-1}(x)) = x$ $f^{-1}(f(x)) = x$

Graph Transformations

Transformations - Changes to position, shape, or orientation

Translations (Shifts)

Horizontal shift:

$f(x - h)$ : Shift right by h units
$f(x + h)$ : Shift left by h units

Vertical shift:

$f(x) + k$ : Shift up by k units
$f(x) - k$ : Shift down by k units

Example: $y = (x - 2)^2 + 3$

Parabola $y = x^2$ shifted 2 right, 3 up

Reflections

Reflection across x-axis:

$y = -f(x)$ : Flip upside down

Reflection across y-axis:

$y = f(-x)$ : Mirror image

Stretches and Compressions

Vertical stretch by factor a:

$y = af(x)$ : Stretches if |a| > 1
$y = af(x)$ : Compresses if 0 < |a| < 1

Horizontal stretch by factor a:

$y = f(\frac{x}{a})$ : Stretches if a > 1
$y = f(\frac{x}{a})$ : Compresses if 0 < a < 1

Curve Sketching

Key Features to Identify

Intercepts:

x-intercepts (roots/zeros): Where $f(x) = 0$
y-intercept: Value of $f(0)$

Asymptotes:

Vertical: Lines function approaches (undefined)
Horizontal: Lines function approaches as $x → ±∞$
Oblique: Non-horizontal asymptotes

Turning points (extrema):

Maximum: Highest point in region
Minimum: Lowest point in region
Stationary points: Where $f'(x) = 0$

End behavior:

What happens as $x → +∞$ ?
What happens as $x → -∞$ ?

Symmetry:

Even function: $f(-x) = f(x)$ (symmetric about y-axis)
Odd function: $f(-x) = -f(x)$ (symmetric about origin)

Sketching Process

Find domain and range
Find intercepts
Find asymptotes
Find turning points
Check symmetry
Determine end behavior
Sketch curve

Special Functions

Absolute Value Function

$f(x) = |x|$

V-shaped graph
Vertex at origin
Domain: all real numbers
Range: $y ≥ 0$

Piecewise Functions

$f(x) = \begin{cases} x^2 & \text{if } x < 0 \\ x & \text{if } x ≥ 0 \end{cases}$

Different rules for different domains
Graph may have corners or jumps
Check continuity at boundaries

Modulus Function

$|f(x)|$

Reflects negative part upward
All outputs become non-negative

Composition of Functions

Composition - One function applied after another

$f∘g(x) = f(g(x))$

Example:

$f(x) = 2x$
$g(x) = x + 3$
$f∘g(x) = f(g(x)) = f(x + 3) = 2(x + 3) = 2x + 6$

Note: $f∘g ≠ g∘f$ usually

Key Points

Function maps inputs to outputs
Domain: input values; Range: output values
One-to-one function has inverse
Inverse undoes original function
Translations shift graphs horizontally/vertically
Stretches change shape
Reflections flip graphs
Curve sketching requires identifying key features
Asymptotes show behavior at infinity
Composition applies functions in sequence

Practice Questions

Evaluate functions for given values
Find domain and range
Determine if function is one-to-one
Find inverse functions
Apply transformations
Sketch curves with transformations
Identify asymptotes
Analyze piecewise functions
Compose functions
Solve problems involving transformations

Revision Tips

Practice finding domain and range
Use coordinate grid for transformations
Remember horizontal shift direction
Learn asymptote finding techniques
Practice curve sketching regularly
Understand composition order
Test inverse by composition
Identify symmetry in functions

Functions​

Function Notation​

Domain and Range​

Types of Functions​

Inverse Functions​

Finding Inverse​

Conditions for Inverse​

Property​

Graph Transformations​

Translations (Shifts)​

Reflections​

Stretches and Compressions​

Curve Sketching​

Key Features to Identify​

Sketching Process​

Special Functions​

Absolute Value Function​

Piecewise Functions​

Modulus Function​

Composition of Functions​

Key Points​

Practice Questions​

Revision Tips​