(or reciprocal)
For each real number a, except 0,
there is a unique real number  such
that  |
In other words, when you multiply a number by its
multiplicative
inverse the result is 1.
A more common term used to indicate a
multiplicative inverse is
the reciprocal.
A multiplicative inverse or reciprocal of a real number a (except 0) is found by “flipping” a upside
down. The numerator of a becomes the
denominator of the reciprocal of a and
the
denominator of a becomes the numerator
of the
reciprocal of a.
|
 Example
1: Write the reciprocal (or multiplicative
inverse)
of -3. |
The reciprocal of -3 is -1/3, since -3(-1/3) =
1.
When you take the reciprocal, the sign of the original
number stays
intact.
Remember that you need a number that when you multiply
times the given
number you get 1. If you change the sign when you take the
reciprocal,
you would get a -1, instead of 1, and that is a no no.
|
| Example
2: Write the reciprocal (or multiplicative
inverse)
of 1/5. |
The reciprocal of 1/5 is 5, since 5(1/5) = 1.
|
b is not 0, then  |
Since dividing is the same as multiplying by the
reciprocal, dividing
and multiplying have the same sign rules.
Step 1: Multiply or
divide their absolute
values.
Step 2: Put the correct
sign.
|
| Example
3: Find the product (-4)(3). |
(-4)(3) = -12.
The product of the absolute values 4 x 3 is 12 and they
have opposite
signs, so our answer is -12.
|
Example
4: Find the product  . |
 |
*Mult. num. together
*Mult. den. together *(-)(-) = (+) *Reduce fraction |
The product of the absolute values 2/3 x 9/10 is 18/30
= 3/5 and they
have the same sign, so that is how we get the answer 3/5.
Note that if you need help on fractions go to Tutorial
3: Fractions
|
Example
5: Find the product  |
Working this problem left to right we get:
|
 |
*(3)(-2) = -6 *(-6)(-10) = 60 |
| Example
6: Divide (-10)/(-2). |
(-10)/(-2) = 5
The quotient of the absolute values 10/2 is 5 and they
have the same
signs, so our answer is 5.
|
Example
7: Divide  . |
 |
*Div. is the same as mult. by
reciprocal
*Mult. num. together
*Mult. den. together *(+)(-) = -
*Reduce fraction
|
The quotient of the absolute values 4/5 and 8 is 4/40 =
1/10 and they
have opposite signs, so our answer is -1/10.
Note that if you need help on fractions go to Tutorial
3: Fractions
|
Dividing into Zero a(0) = 0 and 0/a = 0 (when a does not equal 0) |
In other words, zero (0) times any real number is zero
(0) and zero
(0) divided by any real number other than zero (0) is zero (0).
|
| Example
8: Multiply 0(½). |
0(½) = 0.
Multiplying any expression by 0 results in an answer
of 0.
|
| Example
9: Divide 0/5. |
0/5 = 0.
Dividing 0 by any expression other than 0 results in
an answer of
0.
|
Zero (0) does not go into any number, so whenever you
are dividing
by zero (0) your answer is undefined.
Example
10: Divide 5/0. |
5/0 = undefined.
Dividing by 0 results in an undefined answer.
|
Example
11: Simplify  . |
Since we have several operations going on in this
problem, we will
have to use the order of operations to make sure that we get the
correct
answer.
|
 |
*Evaluate inside the absolute
values
*Subtract
*(-)/(-) = +
|
Example
12: Evaluate the expression 
if x = -2 and y = - 4. |
To review evaluating
an expression
go to Tutorial 4: Introduction to Variable Expressions and Equations.
Plugging -2 for x and -
4 for y and
simplifying we get:
|
 |
*Plug in -2 for x and -4 for y
*Exponent *Multiply *Add |
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