SETS

SETS Sets are lists of items that have specific members. Brackets { } are used to denote a set. The ELEMENTS of the set appear inside the { } brackets and are separated by commas.

SETS Sets are lists of items that have specific members. Brackets { } are used to denote a set. The ELEMENTS of the set appear inside the { } brackets and are separated by commas. EXAMPLE : { 1 , 2 , 3 , 4 , 5 }

SETS Sets are lists of items that have specific members. Brackets { } are used to denote a set. The ELEMENTS of the set appear inside the { } brackets and are separated by commas. EXAMPLE : { 1 , 2 , 3 , 4 , 5 } Elements are 1,2,3,4,5

SETS Sets are lists of items that have specific members. Brackets { } are used to denote a set. The ELEMENTS of the set appear inside the { } brackets and are separated by commas. EXAMPLE : { 1 , 2 , 3 , 4 , 5 } Elements are 1,2,3,4,5 { a , c , e , g }

SETS Sets are lists of items that have specific members. Brackets { } are used to denote a set. The ELEMENTS of the set appear inside the { } brackets and are separated by commas. EXAMPLE : { 1 , 2 , 3 , 4 , 5 } Elements are 1,2,3,4,5 { a , c , e , g } Elements are a,c,e,g

SETS Sets are lists of items that have specific members. Brackets { } are used to denote a set. The ELEMENTS of the set appear inside the { } brackets and are separated by commas. EXAMPLE : Is ‘A’ an element of the set { W , E , A , R } ?

SETS Sets are lists of items that have specific members. Brackets { } are used to denote a set. The ELEMENTS of the set appear inside the { } brackets and are separated by commas. EXAMPLE : Is ‘A’ an element of the set { W , E , A , R } ? YES

SETS Sets are lists of items that have specific members. Brackets { } are used to denote a set. The ELEMENTS of the set appear inside the { } brackets and are separated by commas. EXAMPLE : Is ‘A’ an element of the set { W , E , A , R } ? YES Is 4 an element of the set { 1 , 3 , 5 , 7, 9 }

SETS Sets are lists of items that have specific members. Brackets { } are used to denote a set. The ELEMENTS of the set appear inside the { } brackets and are separated by commas. EXAMPLE : Is ‘A’ an element of the set { W , E , A , R } ? YES Is 4 an element of the set { 1 , 3 , 5 , 7 , 9 } NO

Finite and Infinite sets Finite set – a set that has a definite number of members EXAMPLES : { 1 , 2 , 5 , 8 , 10 } { q , w , e , r , t , y }

Finite and Infinite sets Finite set – a set that has a definite number of members EXAMPLES : { 1 , 2 , 5 , 8 , 10 } { q , w , e , r , t , y } { 1 , 2 , 3 , 4 , … , 15 , 16 , 17 }

Finite and Infinite sets Finite set – a set that has a definite number of members EXAMPLES : { 1 , 2 , 5 , 8 , 10 } { q , w , e , r , t , y } { 1 , 2 , 3 , 4 , … , 15 , 16 , 17 } The dots show that the pattern established in the beginning of the set continues up to the end of the set.

Finite and Infinite sets Finite set – a set that has a definite number of members EXAMPLES : { 1 , 2 , 5 , 8 , 10 } { q , w , e , r , t , y } { 1 , 2 , 3 , 4 , … , 15 , 16 , 17 } The dots show that the pattern established in the beginning of the set continues up to the end of the set. So the numbers 5 thru 14 would be elements in this set.

Finite and Infinite sets Infinite set – a set that has the … at the beginning or end of the list. This set continues in that pattern before or after the dots for an infinite time. EXAMPLES : { 2 , 4 , 6 , 8 , 10 , … } - the even numbers continue to (+) infinity

Finite and Infinite sets Infinite set – a set that has the … at the beginning or end of the list. This set continues in that pattern before or after the dots for an infinite time. EXAMPLES : { 2 , 4 , 6 , 8 , 10 , … } - the even numbers continue to (+) infinity { … , - 3 , - 2 , - 1 , 0 } - this set starts at (-) infinity and the stops at zero

SUBSETS : - are a smaller version of what is contained in an original set

SUBSETS : - are a smaller version of what is contained in an original set - a set can be its own subset since the members are all contained in the original set

SUBSETS : - are a smaller version of what is contained in an original set - a set can be its own subset since the members are all contained in the original set EXAMPLES : Given the set { m , n , o , p , q , r , s , t , u }, is { m , o , r } a subset of the original set ?

SUBSETS : - are a smaller version of what is contained in an original set - a set can be its own subset since the members are all contained in the original set EXAMPLES : Given the set { m , n , o , p , q , r , s , t , u }, is { m , o , r } a subset of the original set ? YES , because m , o and r are all members of the original set

SUBSETS : - are a smaller version of what is contained in an original set - a set can be its own subset since the members are all contained in the original set EXAMPLES : Given the set { m , n , o , p , q , r , s , t , u }, is { m , o , r } a subset of the original set ? YES , because m , o and r are all members of the original set Given the set { a , b , c , d , … , q , r , s ) is { s , p , o , r , t } a subset of the original set ?

SUBSETS : - are a smaller version of what is contained in an original set - a set can be its own subset since the members are all contained in the original set EXAMPLES : Given the set { m , n , o , p , q , r , s , t , u }, is { m , o , r } a subset of the original set ? YES , because m , o and r are all members of the original set Given the set { a , b , c , d , … , q , r , s ) is { s , p , o , r , t } a subset of the original set ? NO , even though s , p , o , and r are in the original set, t isn’t.

SUBSETS : Set Builder notation – described the elements in a set

SUBSETS : Set Builder notation – described the elements in a set Inequality symbols are used to describe the elements > or < - elements next to them are NOT in the set ≥ or ≤ - elements next to them ARE in the set

SUBSETS : Set Builder notation – described the elements in a set Inequality symbols are used to describe the elements > or < - elements next to them are NOT in the set ≥ or ≤ - elements next to them ARE in the set EXAMPLE # 1: The set builder is { n / n is an integer and 2 < n < 9 }

SUBSETS : Set Builder notation – described the elements in a set Inequality symbols are used to describe the elements > or < - elements next to them are NOT in the set ≥ or ≤ - elements next to them ARE in the set EXAMPLE # 1: The set builder is { n / n is an integer and 2 < n < 9 } This describes elements from 2 to 9, but 2 and 9 ARE NOT in the set. They are like edges.

SUBSETS : Set Builder notation – described the elements in a set Inequality symbols are used to describe the elements > or < - elements next to them are NOT in the set ≥ or ≤ - elements next to them ARE in the set EXAMPLE # 1: The set builder is { n / n is an integer and 2 < n < 9 } This describes elements from 2 to 9, but 2 and 9 ARE NOT in the set. They are like edges. The elements would be { 3 , 4 , 5 , 6 , 7 , 8 }

SUBSETS : Set Builder notation – described the elements in a set Inequality symbols are used to describe the elements > or < - elements next to them are NOT in the set ≥ or ≤ - elements next to them ARE in the set EXAMPLE # 2: The set builder is { n / n is an integer and n ≥ 4 }

SUBSETS : Set Builder notation – described the elements in a set Inequality symbols are used to describe the elements > or < - elements next to them are NOT in the set ≥ or ≤ - elements next to them ARE in the set EXAMPLE # 2: The set builder is { n / n is an integer and n ≥ 4 } This describes elements from 4 to infinity, and in this case 4 IS an element The elements would be { 4 , 5 , 6 , 7 , 8, … }

SUBSETS : Set Builder notation – described the elements in a set Inequality symbols are used to describe the elements > or < - elements next to them are NOT in the set ≥ or ≤ - elements next to them ARE in the set EXAMPLE # 3: The set builder is { n / n is an even integer and 2 < n ≤ 10 }

SUBSETS : Set Builder notation – described the elements in a set Inequality symbols are used to describe the elements > or < - elements next to them are NOT in the set ≥ or ≤ - elements next to them ARE in the set EXAMPLE # 3: The set builder is { n / n is an even integer and 2 < n ≤ 10 } This describes even integers from 2 to 10… 2 will not be included in the set but we will include 10. The elements would be { 4 , 6 , 8 , 10 }

ASSIGNMENT : • Open the link and print the drill problems. • Check your answers with the solution guide

SETS

SETS

Presentation Transcript

Sets

Sets

Sets

Sets

Sets

Sets

Sets

Sets

Sets

Sets

SETS

Sets

Sets

Sets

Sets

Sets

Sets

Sets

Sets

Sets

SETS

Sets