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Objective 2 Add and subtract integers © 2002 by R. Villar All Rights Reserved Add and subtract integers How do you add using a number line? When you add a positive number… move to the right. When you add a negative number… move to the left. Example: 3 + (–5) 1. Start at the first number. Example: 3 + (–5) 1. Start at the first number. 3 Example: 3 + (–5) 1. Start at the first number. 3 2. Move the number of spaces and the direction of the second number. Example: 3 + (–5) 1. Start at the first number. 3 2. Move the number of spaces 5 left and the direction of the second number. Example: 3 + (–5) 1. Start at the first number. 3 2. Move the number of spaces 5 left and the direction of the second number. 3. The sum is the number you end at. Example: 3 + (–5) 1. Start at the first number. 3 2. Move the number of spaces 5 left and the direction of the second number. 3. The sum is the number –2 you end at. Example: –2 + 6 1. Start at the first number. Example: –2 + 6 1. Start at the first number. –2 Example: –2 + 6 1. Start at the first number. –2 2. Move the number of spaces and the direction of the second number. Example: –2 + 6 1. Start at the first number. –2 2. Move the number of spaces 6 right and the direction of the second number. Example: –2 + 6 1. Start at the first number. –2 2. Move the number of spaces 6 right and the direction of the second number. 3. The sum is the number you end at. Example: –2 + 6 1. Start at the first number. –2 2. Move the number of spaces 6 right and the direction of the second number. 3. The sum is the number 4 you end at. Rules of Addition Sometimes, it’s not practical to use a number line to add. Here are some to add without a number line. Example –28 + (–22) Adding with the same sign: 1. add up the numbers (absolute value) 2. keep the sign –50 Ex. a. –10 + (–33) b. –6 + (–12) –43 –18 Example: 28 + (–22) Adding different signs: 1. Subtract the numbers. 2. Keep the dominant sign. 6 Ex. a. 24 + (–40) b. –12.1 + 3.8 –16 –8.3 Example: 8.1 + (–2.3) + (–1.5) + 4 Get all the positives together, get all the negatives together, then add. 12.1 + (–3.8) 8.3 Is this statement true? (1 + 2) + 3 = 1 + (2 + 3) Yes, changing the grouping (parentheses) does not change the sum. The property that allows this is called the... Associative Properties for addition: (a + b) + c = a + (b + c) Subtraction of Real Numbers Adding the opposite of a number is the same as subtracting the number. Definition of subtraction: a – b = a + (–b) Example: 25 – 47 = 25 + (–47) add the opposite Now, use the rules for addition = –22 Example: 7 – (–2) = 7 + 2 add the opposite = 9 Hint: When you have 2 negatives in a row, cross them both. Example: 2 – (–5) – 5 + 3 2 + 5 + (–5) + 3 add the opposite 7 + (–5) + 3 2 +3 5
