36 Functions (Chapter 2)The charges for parking a car in a short-term car park at an airport are shown in the table below. The total
charge isdependenton the length of timetthe car is parked.Car park charges
Timet(hours) Charge
0 - 1 hours $ 5 : 00
1 - 2 hours $ 9 : 00
2 - 3 hours $ 11 : 00
3 - 6 hours $ 13 : 00
6 - 9 hours $ 18 : 00
9 - 12 hours $ 22 : 00
12 - 24 hours $ 28 : 00Looking at this table we might ask: How much would be charged forexactlyone hour? Would it be $ 5 or
$ 9?
To avoid confusion, we could adjust the table or draw a graph. We indicate that 2 - 3 hours really means
a time over 2 hours up to and including 3 hours, by writing 2 <t 63 hours.Car park charges
Timet(hours) Charge
0 <t 61 hours $ 5 : 00
1 <t 62 hours $ 9 : 00
2 <t 63 hours $ 11 : 00
3 <t 66 hours $ 13 : 00
6 <t 69 hours $ 18 : 00
9 <t 612 hours $ 22 : 00
12 <t 624 hours $ 28 : 00In mathematical terms, we have a relationship between two variablestimeandcharge, so the schedule of
charges is an example of arelation.
A relation may consist of a finite number of ordered pairs, such as f(1,5),(¡ 2 ,3),(4,3),(1,6)g,or
an infinite number of ordered pairs.
The parking charges example is clearly the latter, as every real value of time in the interval 0 <t 624
hours is represented.
The set of possible values of the variable on the horizontal axis is called thedomainof the relation.
For example: ² the domain for the car park relation is ftj 0 <t 624 g
² the domain of f(1,5),(¡ 2 ,3),(4,3),(1,6)g is f¡ 2 , 1 , 4 g.
The set of possible values on the vertical axis is called therangeof the relation.For example: ² the range of the car park relation is f 5 , 9 , 11 , 13 , 18 , 22 , 28 g
² the range of f(1,5),(¡ 2 ,3),(4,3),(1,6)g is f 3 , 5 , 6 g.
We will now look at relations and functions more formally.A RELATIONS AND FUNCTIONS
exclusion
inclusioncharge $()time hours()
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100 100
(^05255075950525507595)
100 100 4037 Cambridge
Additional Mathematics
Y:\HAESE\CAM4037\CamAdd_02\036CamAdd_02.cdr Thursday, 3 April 2014 3:59:52 PM BRIAN