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Copyright 2013, 2010, 2007, 2005, Pearson, Education, Inc.
1.7
Multiplying and
Dividing Real
Numbers
Multiplying Real Numbers
Multiplying Real Numbers
1. The product of two numbers with the same
sign is a positive number.
2. The product of two numbers with different
signs is a negative number.
Examples
Multiply.
a.
4(–2) = –8
b.
‒7(‒5) = 35
c. 9(‒6.2) = ‒55.8
d.
3 1
3 1
3
  

4 7
47
28
Zero as a Factor
If b is a real number, then b · 0 = 0. Also 0 · b = 0.
Example:
Multiply. – 6 · 0
–6·0=0
Example:
Multiply. 0 · 125
0 · 125 = 0
Evaluating Exponents
Example:
Evaluate ( 3)3.
( 3)3 = ( 3)( 3)( 3) =  27
Odd exponent: Negative result
Example:
Evaluate ( 2)4.
( 2)4 = ( 2)( 2) ( 2) ( 2) = 16
Even exponent: Positive result
Example
Evaluate.
a.
(–2)4 = (–2)(–2)(–2)(–2) = 16
b.
‒72 = ‒(7 ·7) = ‒49
Finding Reciprocals
Reciprocal or Multiplicative Inverse
Two numbers whose product is 1 are called
reciprocals or multiplicative inverse of each
other.
Quotients Involving Zero
The number 0 does not have a reciprocal.
Example
Find the reciprocal.
a.
55 The reciprocal is
3
b. 
7
1
1
since 55   1.
55
55
7
3 7
The reciprocal is  since     1.
3
7 3
Quotient of Two Real Numbers
If a and b are real numbers and b is not 0,
then
a
1
a b 
b
 a
b
The product or quotient of two numbers with the
same sign is a positive number.
The product or quotient of two numbers with
different signs is a negative number.
Example
Divide.
a. 20  5
4
b. 36  12
3
56
c.
 70
0.8
Examples
36
a. Find the quotient.
12
36
 36  (12)  3
12
3
1
b. Find the quotient. 
2 6
3 5 3 6 3 6 33 2 9
   


2 6 2 5 25
25
5
Division Involving Zero
If a is a nonzero number, then
0
a
 0 and
is undefined.
a
0
5
is undefined
0
0
0
9
If a and b are real numbers, and b  0, then
a
a
a


b
b
b
Evaluating Expressions
Example: Evaluate the expression
4 + (42 – 13)4 – 3.
4 + (42 – 13)4 – 3
= 4 + (16 – 13)4 – 3 Evaluate the exponent
inside the parentheses.
= 4 + (3)4 – 3
= 4 + 81 – 3
Work inside the
parentheses.
Evaluate the exponent.
= 85 – 3
Add.
= 82
Subtract.
Example
Use order of operations to evaluate each
expression.
a. 7(9)  2(6)  63  12  75
86
14
14
8  3(2)
8  (6)

 


b.
96 3
3
 9  2(3)  9  (6)
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