Transcript CHAPTER 7

CHAPTER 7
Ratios and
Proportion
7-1 Ratios
Ratio – quotient of two
numbers and can be
expressed as:
1. As a quotient using a
division sign
2. As a fraction
3. As a ratio using a colon
Write each ratio in
simplest form
 32:48
25x:20x
2
2
9x y:6xy
To write the ratio of two
quantities of the same
kind:
 First express the
measures in the same unit
 Then write their ratio
Write each ratio in
simplest form
 3 hr: 15 min
9 in: 5 ft
 10 cm: 1 m
7-2 Proportions
PROPORTION – is an
equation that states that
two ratios are equivalent.
a:b=c:d
a=c
b d
TERMS – the four
numbers a, b, c, and
d that are related in
the proportion.
EXTREMES – the first
and last terms
a : b= c : d
a and d are
extremes
MEANS – the second
and third terms
a:b=c:d
b and c are means
CROSS PRODUCTS –
the product of the
extremes equals the
product of the
means.
ad= bc
EXAMPLE 1
Find x: x = 12
18 27
Use cross products to
write an equation.
EXAMPLE 2
Find x: x-4 = 2
5
3
Use cross products to
write an equation.
EXAMPLE 3
Sam paid $10.50 for 5
blank video tapes. At the
same rate, how much
would he pay for 12
blank tapes.
Write a proportion.
Let x = the cost of 12
blank tapes.
EXAMPLE 4
Fine Photo charges $3 for
2 enlargements. How
much does the company
charge for 5
enlargements?
Write a proportion.
Let x = the cost of 5
enlargements.
7-3 Equations with
Fractional Coefficients
To eliminate the fractional
coefficients:
 Find the LCD
 Multiply both sides of the
equation by the LCD
 Solve the remaining
equation
EXAMPLE 1
x + x = 10
2 3
EXAMPLE 2
x–x+2=2
3
5
EXAMPLE 3
2n + n = n + 5
3
4
EXAMPLE 4
x+1–x+2=1
3
4
2
7-4 Fractional
Equations
Definition
Fractional
equation – an
equation in
which a variable
occurs in a
denominator.
Definition
Extraneous root –
a root of the
transformed
equation but
not a root of the
original
equation.
To Solve:
Multiply both sides of the
equation by the LCD
Solve the remaining
equation
Check all roots to see that
they work in the original
equation, and are not
extraneous roots
EXAMPLE 1
3- 1= 1
x
4
12
EXAMPLE 2
2-x = 4
3-x
9
EXAMPLE 3
2 - 2
=1
b2 – b b - 1
7-5 Percents
Definition
Percent – means
hundredths or
divided by 100.
The symbol for
percent is %.
EXAMPLES
29 percent =
2.6 percent =
637 percent=
0.02 percent=
Examples
Write each number as a
percent:
3/5
1/3
4.7
EXAMPLES
15% of 180 is what number?
23 is 25% of what number?
What percent of 64 is 48?
Solving Equations
To solve an equation
with decimal
coefficients, multiply
both sides by a power
of 10
Examples
Solve.
1.2x = 36 + 0.4x
94 = 0.15x + 0.08(1000 – x)
7-6 Percent
Problems
Definition
Percent of change
100
= change in price
original price
EXAMPLE 1
Find the percent increase:
Jerry originally paid $600
per month to rent his
apartment. It now costs
him $650.
EXAMPLE 2
To attract business, the
manager of a musical
instruments store
decreased the price of an
alto saxophone from $500
to $440. What was the
percent decrease?
EXAMPLE 3
Ricardo paid $27 for
membership in the Video
Club. This was an
increase of 8% from last
year. What was the price
of membership last year?
EXAMPLE 4
Sheila invested part of
$6000 at 6% interest and
the rest at 11% interest.
Her total annual income
from these investments is
$460. How much is
invested at 6% and how
much at 11%.
7-7 Mixture
Problems
EXAMPLES
A health food store sells a
mixture of raisins and
roasted nuts. Raisins sell
for $3.50/kg and nuts sell
for $4.75/kg. How many
kilograms of each should
be mixed to make 20 kg of
this snack worth $4.00/kg
Solution
Make a chart
7-8 Work Problems
EXAMPLES
An installer can carpet a
room in 3 hr. An assistant
takes 4.5 hr to do the
same job. If the assistant
helps for 1 hr and then is
called away, how long will
it take the installer to
finish?
Solution
Make a chart
7-9 Negative
Exponents
DEFINITION
If a is a nonzero real
number and n is a
positive integer,
-n
n
a = 1/a
EXAMPLES
-3
10
=
5-4 =
-7
X
=
DEFINITION
If a is a nonzero real
number
0
a = 1.
The expression
no meaning
0
0
has
Rules for Exponents
bmbn = bm+n
bm ÷bn =bm
- n
(bm)n =bmn
(ab)m = ambm
(a/b)m =am/bm
7-10 Scientific
Notation
Scientific Notation
To write a positive
number in scientific
notation, you express it
as the product of a
number greater than or
equal to 1 but less than
10 and an integral
power of 10.
EXAMPLES
58,120,000 =
0.0000072 =
123,134,135 =
12.0233 =
EXAMPLES
4.95 x 104 =
7.63 x 10-5 =
9.3 x 102 =
1.032 x 10-3=
Examples
3.2 x 107
2.0 x 104
(2.5 x 103)(6.0 x 102)
END