Teaching Notes 2.1: Classifying Counting Numbers, Whole
Numbers, Integers, and Rational Numbers
Classifying numbers presents problems for some students. Classifying rational numbers can pose
special problems.- Review the counting numbers, whole numbers, and integers with your students. You may
find it helpful to refer to the student worksheet for this. - Define rational numbers as any number that can be expressed as the quotient of two integers.
Rational numbers can be positive, negative, or zero. - Provide examples of rational numbers such as
3
5
,−
1
3
,− 2
1
4
, 4, 1.2, and 0.75. Remind your
students that whole numbers and decimals can be expressed as fractions.- Review the information and examples on the worksheet with your students.
EXTRA HELP:
Being able to classify numbers fosters overall understanding of numbers and their relationships.ANSWER KEY:
(Counting numbers)15, 4, 21 (Whole numbers)15, 0, 4, 21
(Integers)15,−8, 0,−7, 4,−1,−150, 21 (Rational numbers)All of them
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(Challenge)Agree. Explanations may vary. One explanation is that every integer can be
expressed as a rational number by writing the integer over 1, such as2
1
. But fractions and
decimals are rational numbers that may or may not be integers, such as 0.3.
48 THE ALGEBRA TEACHER’S GUIDE