Introduction: Sets And Functions Flashcards
Define what is meant by set
A set is a collection of distinct objects, considered as a unit.
What is “Z” notation?
The set of integers {…-3, -2, -1, 0, 1, 2, 3…}
What is “N” notation?
The set of natural numbers {1, 2, 3…}
To include 0: N subscript 0
What is “Q” notation?
The set of rational numbers {a/b: a,b € Z, b#0}
To include positive numbers do superscript + (0 is not positive)
What is “R” notation?
The set of real numbers (including surds)
To include positive numbers do superscript + (0 is not positive)
What is “C” notation?
The set of complex numbers C = {a+ib: a,b € R}
What is “{}” or “Ø” notation?
The empty set, with no elements
Define what is meant by subset
A set a is a subset of a set X, denoted by A C [underlined] X, if every element of A is also an element of X. We write A C/ [underlined and through] B when A is not a subset of B
Define what is meant by proper subset
A set A is a proper subset of a set X, denoted by A C X, if A is a subset of X but A#X
What notation is the only subset of itself?
Ø
What is the order of subsets R, C, Z and Q?
Z C [underlined] Q C [underlined] R C [underlined] C
How do you show A=X using sets?
A C [underlined] X and X C [underlined] A
Define what is meant by linearly ordered
A set X which is linearly ordered satisfies the following properties. For x,y,z € X
Either x=y or y=x
If x=y and y=x then x=y
If x=y and y=z then x=z
Any subset of the real numbers are linearly ordered
Define what is meant by bounded above
We say a (non empty) subset A of R is bounded above is there exists some M€R such that a=M, for all a€A. Then M contains a maximal element.
If there is a (maximal) value greater than or equal to every number in the range.
Define what is meant by bounded below
We say that A is bound below is there is some N€R such that N=a. For all a€A. Then N contains a minimal element.
If there is a (minimal) value less than or equal to every number in the range.