FM orientation Intro FM2014
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Transcript FM orientation Intro FM2014
An Introduction to
Further Mathematics -2014
Year 12 Further Maths
November 2013
Further Maths 3 & 4 includes
Core material
(unit 3)
3 modules selected from the 6 modules below
Module 1:
Number Patterns & Applications
Module 2:
Geometry and Trigonometry
Module 3:
Graphs & Relations
Module 4:
Business Mathematics
Module 5:
Networks & Decision Mathematics
Module 6:
Matrices & Applications
Planned Timeline
Term 1
Weeks 1-8
Core
Chapter 1- 8
Term 2
Weeks 1-2
SAC for Core
Weeks 3-8
1st module
Weeks 9-10
SAC
End of Unit 3
Weeks 11-12
Start of Unit 4
2nd Module
Term 3
Weeks 1-4
2nd Module continued
Weeks 4-5
SAC
Weeks 6-9
3rd Module
Week 10
SAC
November
Exams 1 & 2
End of Unit 4
Your VCE result consists of
34% from your 4 SACs
SAC 1:
Based on Core material
40 marks
SAC 2:
Application tasks
20 marks
SAC 3:
Application tasks
20 marks
SAC 4:
Application tasks
20 marks
66% from your exams
Exam 1
Exam 2
Exams 1 & 2
(1 bound book permitted & a CAS calculator is required)
Exam 1
40 multiple choice questions (13 core, 9 from each of 3
modules)
Total 40 marks
Exam 2
1 set of questions from each of the Core and 3 modules
Each set of questions worth 15 marks
Total 60 marks
Outcome tests
There are 4 x 45 minutes outcome tests in
class.
Each is done before a SAC.
They provide feedback on student’s
progress.
They will be good practices before SACs.
Want an “S” not “N”?
Complete all outcome questions.
Pass 40% on each outcome test.
Have at least 80% of attendance.
Failure to satisfy
the outcome requirements above
Letters sent home
Resit the tests
May cause you to drop
out of the subject!
Absent from a lesson?
Catch up with the lesson yourself
Miss a SAC or an outcome test?
Bring
A medical certificate
Do the test at an arranged time
What to prepare?
A textbook:
Essential Further Maths 3 &4
CAS (Enhanced 4th edition – Evans)
A CAS calculator
A 20 page Display Folder
One binder book for class notes
Several binder books for completion of set
exercises from text book
Any questions?
Holiday Homework
Complete the following questions from your
textbook: All working out must be shown
Ex 1A (Categorical and Numerical Data) – Nos 1- 4
Ex 1B (Categorical Data display) – Nos 1 - 8
Ex 1C (Displaying Numerical Data) – Nos 1 - 9
Ex 1D (Histograms) – Nos 1 - 4
Ex 1E (Dot plots and Stem & leaf plots) – No 1 - 8
Ch 1 – Organising & Displaying
Data
CLASSIFYING DATA
Categorical: a category is recorded when
the data is collected. Examples of
categorical data include gender,
nationality, occupation, shoe size.
Numerical: when data is collected a
number is recorded. The data is
measured or counted.
Numerical Data
Two types of numerical data
Discrete: the numbers recorded are distinct values,
often whole numbers and usually the data comes from
counting. Examples include number of students in a
class, pages in a book.
Continuous: any number on a continuous line is
recorded; usually the data is produced by measuring
to any desired level of accuracy. Examples include
volume of water consumed, life of a battery.
Q1: Answer True or False
The age of my car is numerical data
True
False
Q2: Answer True or False
The colour of my car is categorical data
True
False
Q3: Answer True or False
The number of cars in the car park would
be considered numerical & continuous
data.
True
False
Q4: Answer True or False
If I rate my driving experience of some test cars
between one and ten, this is considered
numerical & discrete data.
True
False
This is an example of
categorical data
Q5: Answer True or False
Continuous numerical data can be
measured
True
False
Q6: Answer True or False
If 1 = satisfied, 2 = indifferent & 3 =
dissatisfied, I am collecting categorical
data
True
False
WARNING
It is not the Variable NAME itself that
determines whether the data is
Numerical or Categorical
It is the WAY the DATA for the
VARIABLE is recorded
Eg: weight in kgs
Eg: weight recorded as 1 = underweight,
2 + normal weight, etc
Univariate Data
Summarising data
Frequency tables: may be used with both
categorical and numerical data.
Class intervals are used to group
continuous numerical data or to group
discrete data where there is a large range of
values.
Categorical Data
FAVOURITE TEAM FREQUENCY
% FREQUENCY
Collingwood
12
Essendon
5
15
12/35 * 100 =
34%
14%
43%
3
35
9%
100%
Bulldogs
Carlton
TOTAL
Categorical Data
Bar Graph / Column Graph
Preferred Football Team
16
14
Frequency
12
10
8
6
4
2
0
Collingwood
Essendon
Bulldogs
Team
Carlton
Percentaged Segmented Bar
Chart
Percentaged Segmented Barchart of Favourite Teams
100%
Carlton
Percentage Frequency
90%
80%
Bulldogs
70%
60%
50%
40%
Essendon
30%
20%
Collingwood
10%
0%
Team
Describing a Bar Chart
We focus on 2 things:
The presence of a DOMINANT Category
in the distribution – given by the Mode
The order of Occurrence of each
category and its relative importance
REPORT – where you comment on
features. Use percentages to support
any conclusions
Organising & Displaying
Numerical Data
Group the DATA
Guidelines for choosing the number of
Intervals:
Usually use between 5 and 15 intervals
Numerical Data
NUMBER OF
SIBLINGS
FREQUENCY
PERCENTAGE
FREQUENCY
0
2
1
2
3
4
12
7
25
2/25*100 =
8%
16%
48%
28%
100%
How has forming a Frequency
Table helped?
Orders the data
Displays the data in compact form
Shows a pattern – way the data values
are distributed
Helps us to identify the mode
Numerical Data
Histogram
There are no spaces between the
columns of a histogram
Numerical Data
Stem and Leaf Plots
Stem and Leaf Plots display the
distribution of numerical data (both
discrete and continuous) as well as the
actual data values
An ordered stem and leaf plot is obtained
by ordering the numbers in the leaf in
ascending order.
A stem and leaf plot should have at least
5 numbers in the stem
Numerical Data
Stem and Leaf Plots
Stem
20
21
22
23
24
Leaf
12256
012
238
02
24 0
represents 240
Numerical Data
Describing a distribution
Shape
Generally one of three types
Symmetric
Positively Skewed
Negatively Skewed
Numerical Data
Shape Symmetric
Symmetric (same shape either
side of the centre)
Numerical Data
Shape: Positively Skewed
Positively skewed : tails off to the right
Numerical Data
Shape: Negatively Skewed
Negatively skewed : tails off to the left
Centre
The centre as measured by the Median is the
value which has the same number of scores
above as below.
The centre as measured by the Mean is the
value which is equal to the sum of the data
divided by n
The centre as measured by the Mode is the
value which has the highest frequency
Spread
The maximum and minimum values
should be used to calculate the range.
Range = Maximum Value – Minimum Value
Outliers
Outliers are extreme values well away
from the majority of the data
Outlier
Which Graph??
TYPE OF DATA
GRAPH
CATEGORICAL
Bar Chart
NUMERICAL
WHEN TO USE
Segmented Bar Chart
Not too many
Categories Max 4-5
Histogram
Med to Large
Stem Plot
Small to Medium
Dot Plot
Only small data sets
Good luck with your holiday
homework
It is a good idea to do this before school
finishes so if you get stuck you can ask us.