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Example 1: Kyesha was in math class with her friend Angie. She whispered to Angie that she had just bought a set of winter clothes. The outerwear collection includes a coat, a hat, a scarf, gloves, and boots. Their teacher, Mrs. Glosser, overheard the conversation and asked them: What is a set?

Solution: Luckily for Kyesha and Angie, their classmate Eduardo had a math dictionary with him! He quickly looked up the word 'set' and defined it for the class as shown below.

A set is a collection of objects that have something in common or follow a rule. The objects in the set are called its elements. Set notation uses curly braces, with elements separated by commas. So the set of outwear for Kyesha would be listed as follows:

A = {coat, hat, scarf, gloves, boots}, where A is the name of the set, and the braces indicate that the objects written between them belong to the set.

Every object in a set is unique: The same object cannot be included in the set more than once.

Let's look at some more examples of sets.

Example 2: What is the set of all fingers?

Solution: P = {thumb, index, middle, ring, little}

Note that there are others names for these fingers: The index finger is commonly referred to as the pointer finger; the ring finger is also known as the fourth finger, and the little finger is often referred to as the pinky. Thus, we could have listed the set of fingers as:

P = {thumb, pointer, middle, fourth, pinky}

Example 3: What is the set of all even whole numbers between 0 and 10?

Solution: Q = {2, 4, 6, 8} Note that the use of the word between means that the range of numbers given is not inclusive. As a result, the numbers 0 and 10 are not listed as elements in this set.

Example 4: Eduardo was in art class when the teacher wrote this on the chalkboard: In fine arts, primary colors are sets of colors that can be combined to make a useful range of colors. Then she asked the class: What is the set of primary colors?

Solution: Eduardo answered: red, blue and yellow. Angie answered: We can use set notation to list the set of all primary colors.Kyesha went to the chalkboard and wrote:

X = {red, blue, yellow}

The teacher said: Good work everyone. This is a nice combination of art and math!

In examples 1 through 4, each set had a different number of elements, and each element within a set was unique. In these examples, certain conventions were used.

The following conventions are used with sets:

• Capital letters are used to denote sets.
• Lowercase letters are used to denote elements of sets.
• Curly braces { } denote a list of elements in a set.

So for examples 1 through 4, we listed the sets as follows:

1. A = {coat, hat, scarf, gloves, boots}
2. P = {thumb, index, middle, ring, little}
3. Q = {2, 4, 6, 8}
4. X = {red, blue, yellow}

These sets have been listed with roster notation. Roster notation is a list of elements, separated by commas, enclosed in curly braces. The curly braces are used to indicate that the elements written between them belong to that set. Let's look at some more examples of sets listed with roster notation.

Example 5: Let R be the set of all vowels in the English alphabet.

Solution: R = {a, e, i, o, u}

Example 6: Let G be the set of all whole numbers less than ten.

Solution: G = {0, 1, 2, 3, 4, 5, 6, 7, 8, 9}

Example 7: Let T be the set of all days in a week.

Solution: T = {Monday, Tuesday, Wednesday, Thursday, Friday, Saturday, Sunday}

Example 8: Let X be the set of odd numbers less than 12.

Solution: X = {1, 3, 5, 7, 9, 11}

Example 9: Let Y be the set of all continents of the world.

Solution: Y = {Asia, Africa, North America, South America, Antarctica, Europe, Australia}

There are times when it is not practical to list all the elements of a set. In this case, it is better to describe the set. The rule that the elements follow can be given in the braces. For example,:

R = {vowels} means Let R be the set of all vowels in the English alphabet.

This is especially useful when working with large sets, as shown below.

When describing a set, It is not necessary to list every element in that set. Thus, there are two methods for indicating a set of objects: 1) listing the elements and 2) describing the elements. We will distinguish between these two methods in examples 10 and 11 below.

Example 10: What is the set of all letters in the English alphabet?

Listing Elements: D = {a, b, c, d, e, f, g, h, i, j, k, l, m, n, o, p, q, r, s, t, u, v, w, x, y, z}

Describing Elements: D = {letters in the English alphabet}

Example 11: What is the set of all states in the Unites States?

Solution: R = {all states in the US}

In example 10, set D has 26 elements, so it is easier to describe its elements than to list them. Similarly, in example 11, set R has 50 elements, so it is easier to describe its elements.

Summary: A set is a collection of objects that have something in common or follow a rule. The objects in the set are called its elements. Curly braces are used to indicate that the objects written between them belong to a set. Every object in a set is unique. It is not necessary to list every object in the set. Instead, the rule that the objects follow can be given in the braces. We can define a set by listing its elements or by describing its elements. The latter method is useful when working with large sets.

Exercises

Directions: Read each question below. Select your answer by clicking on its button. Feedback to your answer is provided in the RESULTS BOX. If you make a mistake, rethink your answer, then choose a different button.

We often deal with groups or collection of objects in real life, such a set of books, a group of students, a team of basketball players, a list of states in a country, a collection of baseball cards, etc.

Sets may be thought of as a mathematical way to represent collections or groups of objects. The concept of sets is an essential foundation for various other topics in mathematics.

This series of lessons cover the essential concepts of math set theory - the basic ways of describing sets, use of set notation, finite sets, infinite sets, empty sets, subsets, universal sets, complement of a set, basic set operations including intersection and union of sets, using Venn diagrams and simple applications of sets.

Introduction To Sets

• Set Notations

  Describing Sets
  Set Notation
  Finite & Infinite Sets
  Empty Set Or Null Set
  Set Equality
  

• Venn Diagrams

  Venn Diagrams
  Subsets
  Universal Set
  Complement Of A Set
  

Set Operations

• Intersection & Union of Sets

  Intersection of Two Sets
  Intersection of Three Sets
  Complement of an Intersection
  Union Of Sets
  Combined Operations Of Sets
  

• Venn Diagrams

  Drawing Venn Diagrams
  De Morgan’s Theorem
  Shading Venn Diagrams
  

Lessons On Sets

• Lessons On Sets

  Set Notation
  Universal Sets & Subsets
  Set Operations
  Venn Diagrams I
  Venn Diagrams II
  Venn Diagram Word Problems
  

A Series Of Lectures On Sets

These are at an advanced level, suitable for undergraduate studies.

Sets And Reps

• More Advanced Topics on Sets

  Definition of a Set
  Operations on Sets
  De Morgan’s law & Logic
  Power Sets
  

Try the free Mathway calculator and problem solver below to practice various math topics. Try the given examples, or type in your own problem and check your answer with the step-by-step explanations.

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