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Transcript
The Language of Sets
Set theory
Chapter 2 Sec. 1
Key Words
What is a set?
Collection of objects.
Use of capital letters to name sets.
What is a element/member?
Individual objects in a set.
Use of lowercase letters to denote
elements in a set.
How to represent a set?
Consider the set of seasons of the
year to be the set S.
S = {Spring, Summer, Fall,
Winter}.
Set Builder Notation
Set builder notation is to represent
the set, if the elements of a set all
share some common characteristics
that are satisfied by no other
objects.
Examples
C = {x:x is a carnivorous animal}
is is equivalent to =
{ is the set
x “of all x”
: is such that
We can use set builder notation for the
solution we will have to write.
C={lion, tiger, panther}
Write an alternative method.
B={y:y is a color of the state of New
Mexico flag.}
B={yellow and red}
A={a:a is counting number less than 20
and is evenly divisible by 3.}
A={3,6,9,12,15,18}
Well defined
A set is well defined if we are
able to tell whether any
particular object is an element of
the set.
Example
Here is two examples, which sets are
well defined?
A) M = {x:x is a mountain over 10,000
ft high}
Well defined
B) S={s:s is a scary movie}
Not well defined
How about this problem?
M = {m:m is in your math class and is
also a star on the Sopranos.}
This set has no elements.
Empty set or Null set
The set that contains no elements is
called the empty set. This set is
labeled by the symbol Ø. Another
notation for the empty set is {}.
Universal set
Is the set of all elements under
consideration in a given discussion.
We often denote the universal set
by the capital U.
Example
Consider U = {0, 1, 2, 3, …9, 10}
U = {x:x is a male consumer living in
the United States.}
Elemental symbol
We will use the symbol
to stand
for the phrase is an element of.
How is it used?
Example
The notation
4 A is expresses
that 4 is an element of the set A.
The notation
4 A is expresses
that 4 is not an element of the set A.
Use either
A) 3
{2, 4, 3, 5}
B) {4} {2, 3, 4, 5}
4 {x:x is an odd counting number}
Cardinal Number
The number of elements in set A and
denoted by n(A). A set is finite if its
cardinal number is a whole number. An
infinite set is one that is not finite.
Example problems
State whether the set is finite or
infinite. If it is finite, state its cardinal
number using n(A) notation.
P = {x:x is a planet in our solar
system}.
N ={1,2, 3}
