Sets and Real Numbers Crash Course

SETS AND THE REAL
NUMBER SYSTEM
A Crash Course for Algebra Dummies

Lesson One: The Basics
Why the concept of sets is actually hated by
most humans – and why it has become one
of the most reasonable widely-accepted
theories.

What is a set?
A SET is a well-defined collection of objects.


Sets are named using capital letters.


The members or objects are called


ELEMENTS. Elements of a set may be
condoms, dildos, dick wads, as long as they
herald a common TRUTH.
Denoting a set would mean enclosing the


elements in BRACES { }.

S = {3, 6, 9, 12, 15}

Ways To Define Sets
Rule Method – defining a set by describing the
1.

elements. Also called the descriptive method.
 A = {first names of porn stars Chad
knows}
 B = {counting numbers}

Roster Method – defining a set by
2.

enumerating the members of the set in braces.
Common elements are only written once. Each
element is seperated by a comma. Also called
the listing method.
 A = {Brent, Dani, Jean, Jeff, Luke, Chloe}

Ways to Define Sets
Set-builder Notation – commonly used in
3.

areas of quantitative math to be short. Like
the rule method. This definition assigns a
variable to an element such that all values of
the variable share the truths of the elements
of the set.
A = {m|m is a porn star Chad knows}

Set of all m such that m is a porn star Chad

knows
B = {x|x is a counting number}

Set of all x such that x is a counting number


Set Membership
This is the relation telling us that a thing is


an element of a particular set.
∈ is the symbol for “is an element of”. This

is a symbol used in set-builder notation.

P = {yellow, red, blue}
yellow ∈ P
green ∉ P

Cardinality
The CARDINALITY of a set states the number


of elements a set contains. The cardinality is
expressed as n(A), wherein A is the given set.
G = {a, s, s, h, o, l, e}
n(G)= 7
R = {fucking, sucking, rimming, ramming}
n(R)=4
A = {how many balls a person has}
n(A) = 2

Exercise One: Defining Sets
Set H is the set of letters in the word
1.

PORNOGRAPHY. Write it using the roster
method.
 H = {P, O, R, N, G, A, H, Y}

X = {I, V, X, C, L, D, M}. Describe the set and
2.
state its cardinality.
 X = {letters used to denote Roman numerals}.
n(X)= 7.
Set Z is the set of all condom brands. Write it
3.
using the set-builder notation method.
 Z = {x|x ∈ condom brands}

Kinds of Sets
Empty Sets or Null Sets – sets with no


elements.
 A = {girls in New York St. that have dicks}

 A = { } or A = Ø. The set has 0 cardinality.

Infinite Sets – sets with an infinite number of


elements. Unlisted elements are denoted by
ellipses.
 F = {x|x is a number}

Finite Sets – sets with an exact number of


elements.
 H = {penises Chad has}. n(H)= 27.

Exercise Two: Kinds of Sets
Write the set of whole numbers less than 0.
1.

Define what kind of set it is.
 A = Ø. It’s a null set.

Explain which of the following is finite: the set
2.

of the vowels in the English alphabet or the
set of cum shots all the boys in the world
make.
 The first set is finite. There are only five
vowels, as compared to the expanding
number of cum shots, which makes the
second set infinite.

Set Relations
Equal Sets – sets having the exact same

elements.
 If A = {F, U, C, K}, B = {letters in “FUCK”},
and C = {F, C, U, K}, then A = B = C.
Equivalent Sets – sets with equal number of

elements. All equal sets are equivalent. But
not all equivalent sets are equal.
 F = {x|x is a letter of “CUM”} & G = {W, A,
D}
 Both sets have 3 elements, making them
equivalent.
Groups of equivalent sets and groups of


Set Relations
Joint Sets – sets having common elements.


 If A = {body parts of girls},

 B = {body parts of Rosie O’Donell}, then

 A and B are joint sets since both contain
vagina.
Disjoint Sets – sets having no common


elements.
 F = {penis} & G = {body parts of girls}

 They are disjoint because penis is not a body
part of girls.

Universal Sets and Subsets
The UNIVERSAL SET (U) is the set containing


all elements in a given discussion. It contains
every other set that is related to the
discussion.
SUBSETS are sets whose elements are


members of another set. It is formed using the
elements of a given set. The symbol ⊂
denotes “is a subset of”.
G = {d, i, c, k, h, e, a}
Y = {d, i, c, k}
Y⊂ G

Subsets
Every set is a subset of the universal set. (S ⊂


U)
There are two types of subsets.


Proper Subset – a set whose elements are
1.
members of another set, but is not equal to that
set.
 Given W as the set of whole numbers and E
as the set of even numbers, then E ⊂ W.
2. Improper Subset – a set whose elements are
members of another set, but is equal to the set.
 Given M as the set of multiples of 2 and E as

Subsets
Every set is an improper subset of itself. (S ⊆

S)
The null set is a proper subset of any set. (Ø ⊆

S)
For any two sets A and B, if A ⊂ B and B ⊂ A,


then it means A = B.
The number of subsets for a finite set A is given

by:

n(A)
2

Subsets
The subsets of the set The number of
M = {x, y, z} are: subsets is given by:
• Subsets = 2n(M)
• Ø
• • Since n(M) = 3, then
{x}
n(M) 3
• 2 =2
{y}
• 23 is equal to 8.
• {z}
• You will see that the
• {x, y}
number of subsets on
• {y, z}
the left is 8 too.
• {z, x}
• {x, y, z}

Exercise Three: Subsets
Write all the SUBSETS of the set N = {s, h, i,


t} in one set. Name this set NS. This is called
the POWER SET of the set N. State the
cardinality of set NS.
One: NS = {Ø, {s}, {h}, {i}, {t}, {s, h},
 Answer
{s, i}, {s, t}, {h, i}, {h, t}, {i, y}, {s, h, i}, {s, h,
t}, {h, i, t}, {s, i, t}, {s, h, i, t}}
 The cardinality of this set is given by the
n(N)
formula 2 . Since N had four elements, the
expression became 24, which led to n(NS) =
16.

Quiz One: Basic Concepts
For every slide you are given five minutes
to answer. Points depend on the difficulty of
the question. Do not cheat or I’ll kick your
ass.

Two-Point Items

Write what is asked.
• The set of numbers greater than 0. Use Set
Builder Notation. State the type of set.
• The set of months of the year ending in
“ber”. Use listing. State cardinality of set.
• The set of all positive integers less than
ten. Create another set to disjoin with this
set.
• The set of the letters in SEX. Provide an
equivalent set.

Three-Point Items

Write the power set of set P = {i, l, y}. State
the cardinality of the power set.

Given that W is the set of days in a week.
How many subsets does this set have? Is
there any improper subset in those sets? If
so, write down that improper subset of W.

Sets and Real Numbers Crash Course

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