1-6 multiplying and dividing integers course 3 warm up warm up problem of the day problem of the day...
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1-6 Multiplying and Dividing Integers
Course 3
Warm Up
Problem of the Day
Lesson Presentation
Warm UpMultiply or divide.
Course 3
1-6 Multiplying and Dividing Integers
40 72
7
12
4
126
1. 5(8) 2. 6(12)
3.36
94.
49
7
192
165. 18(7) 6.
Problem of the Day
Complete the pyramid by filling in the missing numbers. Each number is the sum of the numbers in the two boxes below it.
Course 3
1-6 Multiplying and Dividing Integers
–9 8
–7 –1 5
–4
–8
–32
4
Learn to multiply and divide integers.
Course 3
1-6 Multiplying and Dividing Integers
Insert Lesson Title Here
Course 3
1-6 Multiplying and Dividing Integers
A positive number multiplied by an integer can be written as repeated addition.
3(–200) = –200 + (–200) + (–200) = –600
From what you know about adding and subtracting integers, you can see that a positive integer times a negative integer is negative.
Insert Lesson Title Here
Course 3
1-6 Multiplying and Dividing Integers
You know that multiplying two positive integers together gives you a positive answer. Look for a pattern in the integer multiplication at right to understand the rules for multiplying two negative integers.
3(–200) =
2(–200) =
1(–200) =
0(–200) =
–1(–200) =
–2(–200) =
–3(–200) =
–600
–400+ 200
–200
0
200
400
600
+ 200
+ 200
The product of two negative integers is a positive integer.
Insert Lesson Title Here
Course 3
1-6 Multiplying and Dividing Integers
MULTIPLYING AND DIVIDING TWO INTEGERS
If the signs are the same, the sign of the answer is positive.
If the signs are different, the sign of the answer is negative.
Course 3
1-6 Multiplying and Dividing Integers
Additional Example 1: Multiplying and Dividing Integers
A. –6(4)
B. –8(–5)
= 40
= –24
Signs are different.
Signs are the same.
Answer is negative.
Answer is positive.
Multiply or divide.
Course 3
1-6 Multiplying and Dividing Integers
Additional Example 1: Multiplying and Dividing Integers
C.
= –9
Signs are different.
Answer is negative.
Multiply or divide.
–182
D.
= 5
Signs are the same.
Answer is positive.
–25–5
Course 3
1-6 Multiplying and Dividing Integers
Check It Out: Example 1
A. 5(–2)
B. –3(–2)
= 6
= –10
Signs are different.
Signs are the same.
Answer is negative.
Answer is positive.
Multiply or divide.
Course 3
1-6 Multiplying and Dividing Integers
Check It Out: Example 1
C.
= –8
Signs are different.
Answer is negative.
Multiply or divide.
–243
D.
= 6
Signs are the same.
Answer is positive.
–12–2
Course 3
1-6 Multiplying and Dividing Integers
Order of Operations
1. Parentheses
2. Exponents
3. Multiply and divide from left to right.
4. Add and subtract from left to right.
Remember!
Course 3
1-6 Multiplying and Dividing Integers
Additional Example 2: Using the Order of Operations with Integers
A. 3(–6 – 12)
= –54
= 3(–18)Subtract inside the parentheses.
Think: The signs are different.
The answer is negative.
Simplify.
B. –5(–5 + 2)
= 15
= –5(–3)Subtract inside the parentheses.
Think: The signs are the same.
The answer is positive.
Course 3
1-6 Multiplying and Dividing Integers
Additional Example 2: Using the Order of Operations with Integers
C. –2(14 – 5)
= –18
= –2(9)Subtract inside the parentheses.
Think: The signs are different.
The answer is negative.
Simplify.
Course 3
1-6 Multiplying and Dividing Integers
Check It Out: Example 2
A. 2(1 – 8)
= –14
= 2(–7)Subtract inside the parentheses.
Think: The signs are different.
The answer is negative.
Simplify.
B. 4(–3 – 8)
= –44
= 4(–11)Subtract inside the parentheses.
Think: The signs are different.
The answer is negative.
Course 3
1-6 Multiplying and Dividing Integers
Check It Out: Example 2
C. –3(6 – 9)
= 9
= –3(–3)Subtract inside the parentheses.
Think: The signs are the same.
The answer is positive.
Simplify.
Course 3
2-3 Multiplying and Dividing Integers
The order of operations can be used to find ordered pair solutions of integer equations. Substitute an integer value for one variable to find the value of the other variable in the ordered pair.
Course 3
1-6 Multiplying and Dividing Integers
Additional Example 3: Sports Application
A golfer plays 5 holes. On 3 holes, he has a gain of 4 strokes each. On 2 holes, he has a loss of 4 strokes each. Each gain in strokes can be represented by a positive integer, and each loss can be represented by a negative integer. Find the total net change in strokes.
3(4) + 2(–4)
= 4
= 12 + (–8)
Add the losses to the gains.
Multiply.
Add.
The golfer changed by a total gain of 4 strokes.
Course 3
1-6 Multiplying and Dividing Integers
Check It Out: Example 3
A golfer plays 9 holes. On 3 holes, he has a gain of 3 strokes each. On 4 holes, he has a loss of 3 strokes each. Each gain in strokes can be represented by a positive integer, and each loss can be represented by a negative integer. Find the total net change in strokes.
3(3) + 4(–3)
= -3
= 9 + (–12)
Add the losses to the gains.
Multiply.
Add.
The golfer changed by a total loss of 3 strokes.
Lesson Quiz: Part I
Insert Lesson Title Here
Course 3
1-6 Multiplying and Dividing Integers
Multiply or Divide.
1. –8(4)
2.
–32
6–12(5)–10
Simplify.
3. –2(13 – 4)
4. 6(-5 – 3)
– 18
– 48
Lesson Quiz: Part II
Insert Lesson Title Here
Course 3
1-6 Multiplying and Dividing Integers
5. Evin completes 11 transactions in his bank account. In 6 transactions, he withdraws $10. in 5 transaction, he deposits $20. Find the total net change in dollars.
$40
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