#### Math - 2019-20

# 8.2 - Real Number System

8.2The student willdescribethe relationships between the subsets of the real number system.

*Adopted: 2016*

### BIG IDEAS

- I can communicate with others about various kinds of numbers
on the number line.

- I will
understand that the set of Real numbers has infinite subsets and recognize the
relationships among various ones.

### UNDERSTANDING THE STANDARD

· The subsets of real numbers include natural numbers (counting numbers), whole numbers, integers, rational and irrational numbers.

· Some numbers can belong to more than one subset of the real numbers (e.g., 4 is a natural number, a whole number, an integer, and a rational number). The attributes of one subset can be contained in whole or in part in another subset. The relationships between the subsets of the real number system can be illustrated using graphic organizers (that may include, but not be limited to, Venn diagrams), number lines, and other representations.

· The set of natural numbers is the set of counting numbers {1, 2, 3, 4...}.

· The set of whole numbers includes the set of all the natural numbers and zero {0, 1, 2, 3…}.

· The set of integers includes the set of whole numbers and their opposites {…-2, -1, 0, 1, 2…}. Zero has no opposite and is neither positive nor negative.

·
The set of
rational numbers includes the set of all numbers that can be expressed as
fractions in the form where *a* and *b* are integers and *b* does not equal zero. The decimal form of a rational number can be
expressed as a terminating or repeating decimal. A few examples of rational
numbers are , , -2.3, 75%,
and .

·
The set of
irrational numbers is the set of all nonrepeating, nonterminating decimals. An
irrational number cannot be written in fraction form

(e.g., π, , 1.232332333…).

### ESSENTIALS

- How are the real numbers related?

Some numbers can appear in more than one subset, e.g., 4 is an integer, a whole number, a counting or natural number and a rational number. The attributes of one subset can be contained in whole or in part in another subset.

**The student will use problem solving, mathematical
communication, mathematical reasoning, connections, and representations to**

·
8.2_{1}** Describe**
and **illustrate** the relationships
among the subsets of the real number system by using representations (graphic
organizers, number lines, etc.). Subsets include rational numbers, irrational
numbers, integers, whole numbers, and natural numbers.

·
8.2_{2}**
Classify **a given number as a member of a particular subset or
subsets of the real number system, and **explain**
why.

·
8.2_{3}** Describe**
each subset of the set of real numbers and **include**
examples and non-examples.

·
8.2_{4}** Recognize**
that the sum or product of two rational numbers is rational; that the sum of a
rational number and an irrational number is irrational; and that the product of
a nonzero rational number and an irrational number is irrational.

### KEY VOCABULARY

Real Numbers, Natural/Counting Numbers, Whole Numbers, Integers,
Rational Numbers, Irrational Numbers, subset

*Updated: Jul 30, 2019*