Introduction to functions (Chapter 19) 385We can also use set notation to describe mappings.
For example, consider the set f 0 ,§ 1 ,§ 2 ,§ 3 g under the mapping ‘square the number’.f 0 ,§ 1 ,§ 2 ,§ 3 g maps onto f 0 , 1 , 4 , 9 gWe could write this mapping as x 7 !x^2This is a many-one mapping, and is an example of afunction.Afunctionis a mapping in which each element of the domain maps ontoexactly oneelement of the range.is amany-one
mapping and is a
function.is aone-many
mapping and isnot
a function.We can see that functions can only be one-one or many-one mappings. One-many and many-many mappings
arenotfunctions.Example 1 Self Tutor
For the domainf 0 , 1 , 2 , 3 gand the function ‘subtract 2 ’, find the range.So, the range is f¡ 2 ,¡ 1 , 0 , 1 gSuppose a function maps setAonto setB. We say that:
² Ais thedomainof the function ² Bis therangeof the function.To help describe the domain and range of a function, we can use interval notation:For numbersbetweenaandbwe write a<x<b.For numbers ‘outside’aandbwe writex<aor x>b:would be written as a 6 x<b.
A filled in circle indicates the inclusion of the end point.
An open circle indicates the non-inclusion of that point.B FUNCTIONS [3.1, 3.2]
0
1
2
3
¡ 2
¡ 1
0
1
2
4
6
8
xy10
1
2
3
0
¡ 1
1
¡ 2
2
¡ 3
3
x0 1 4 9 y 1 2 3 4xy5
0
1
ab
xab
xab
xab
xWe say that: f 0 ,§ 1 ,§ 2 ,§ 3 g is the domain and
f 0 , 1 , 4 , 9 g is the range.IGCSE01
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Y:\HAESE\IGCSE01\IG01_19\385IGCSE01_19.CDR Friday, 14 November 2008 10:43:43 AM PETER