A ............................................ : is a collection of objects. A = { 1, 2, 3, … }.

A ............................................ : Each object in a set.

One method of designating a set, in which elements are listed between braces, with commas between the elements. The order in which we list elements isn’t important. Name sets by using a capital letter.

A = { 1, 2, 3, … }.

One method of designating a set, in which we use a short verbal statement to describe the set.

One method of designating a set, in which we use variables, braces and a vertical bar | that is read as “such that.”.

A = { x | x ∈ N and x < 7 }

Decide whether the statement is True or False.

21 ∈ {2, 5, 8, 11, ... }.

Decide whether the statement is True or False.

map ∉ {m, a, p}.

N = {1, 2, 3, 4, … }

E = {2, 4, 6, 8, … }

O = {1, 3, 5, 7, … }

A ............................................ :

is a symbol (usually a letter) that can represent different elements of a set.

............................................ :

A set with no elements.

Which of the following sets are empty?

............................................ :

is the number of elements in the set.

Find the cardinal number of the set.

A = {z, y, x, w, v}

Find the cardinal number of the set.

B = { x | x ∈ E and 15 < x < 31}

Find the cardinal number of the set.

C = {Chevrolet}

............................................ :

A set that has no elements, or has cardinality that is a natural number.

............................................ :

A set that is not finite. It has an unlimited number of elements.

Classify the set as Finite or Infinite.

Set P is the set of numbers that are multiples of 6.

Classify the set as Finite or Infinite.

{ x | x is a member of the UAE Army}.

Classify the set as Finite or Infinite.

{3, 6, 9, ... , 24}.

Classify the set as Finite or Infinite.

The set of all possible computer passwords.

............................................ :

If they have exactly the same members or elements.

............................................ :

If they have the same number of elements, that is, n (A) = n (B).

State whether each pair of sets is Equal, Equivalent, or Neither.

{d, o, g}; {c, a, t}

State whether each pair of sets is Equal, Equivalent, or Neither.

{run}; {r, u, n}

State whether each pair of sets is Equal, Equivalent, or Neither.

{t, o, p}; {p, o, t}

State whether each pair of sets is Equal, Equivalent, or Neither.

{10, 20, 30}; {1, 3, 5}

............................................ :

If each element in the first set can be paired with exactly one element of the second set and each element of the second set can be paired with exactly one element of the first set.

Decide whether the statement is True or False.

The sets {North, South, East, West} and {sun, rain, snow, sleet} have a one-to-one correspondence.

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