Introduction to Functions Core 3 Chapter 1

Beschreibung

Notes on classwork valid for the AQA exam in 2018.
Alain Graham
Notiz von Alain Graham, aktualisiert more than 1 year ago
Alain Graham
Erstellt von Alain Graham vor mehr als 7 Jahre
56
1

Zusammenfassung der Ressource

Seite 1

Introduction to functions 1

There are two types of functions; One-To-One functions and Many-To-One

One-To-One Functions

The substitution of any given number that gives the answer that is independent of any other number in that function. 3x-1=y If x=1 and x=-1 x=1; 3(1)-1=y y=2 x=-1 3(-1)-1=y y=-4 THIS IS A ONE-TO-ONE FUNCTION

Many-To-One Functions

The substitution of different values, of which give the same answer. For Example: 3x^4=y when x=1 and x=-1 so when x=1 3(1)^4=y y=3 AND when x=-1 3(-1)^4=y  

So with that in mind (source: My Resource: https://www.goconqr.com/en-GB/p/9367691) y=3 THIS IS A MANY-TO-ONE FUNCTION

Seite 2

Introduction to functions 1 part 2

In order for a function to exist, however, the domain must be defined or the values of which can't be in the domain must be identified.

Domains

The mapping becomes a function when the domain has been identified, this can be written in interval notation [[number ie -1],∞) or as an inequality ie x≥1 or x≠0   So the graph indicating F(x)=-x^2 that has the domain x>2 creates this graph

and the answer for finding the range would be F(x)<-4.   If we didn't add the  domain the plotted graph would look like this:

Revise tip 1 - Use Flashcards

Here are some to start you off. Feel free to edit them and add your own example. Don't forget to message me so I can have a look at them and add a link below:

Seite 3

Introduction to functions 2

As to regards to what we said in the previous page their are two types of graphical equations that ARE NOT FUNCTIONS. These are One-To-Many Graphs and Many-To-Many Graphs

We need not delve further for core 3 examinations TBC

Seite 4

Now that you have completed the notes:

Complete the test below:

More from me:

Recommended

Zusammenfassung anzeigen Zusammenfassung ausblenden

ähnlicher Inhalt

FREQUENCY TABLES: MODE, MEDIAN AND MEAN
Elliot O'Leary
HISTOGRAMS
Elliot O'Leary
CUMULATIVE FREQUENCY DIAGRAMS
Elliot O'Leary
Maths GCSE - What to revise!
livvy_hurrell
GCSE Maths Symbols, Equations & Formulae
livvy_hurrell
STEM AND LEAF DIAGRAMS
Elliot O'Leary
TYPES OF DATA
Elliot O'Leary
Fractions and percentages
Bob Read
GCSE Maths Symbols, Equations & Formulae
Andrea Leyden
GCSE Maths: Geometry & Measures
Andrea Leyden
GCSE Maths: Understanding Pythagoras' Theorem
Micheal Heffernan