Ratios-and-Proportions- introductory ppt

Outline:
• Ratios!
What is a Ratio?
How to Use Ratios?
How to Simplify?
Proportions!
What is a proportion?
Properties of proportions?
How to use proportions?
• Mysterious Problems…

What is a Ratio?
• A ratio is a comparison of two numbers.
• Ratios can be written in three different ways:
a to b
a:b
Because a ratio is a fraction, b can not be zero
b
a
Ratios are expressed in simplest form

How to Use Ratios?
• The ratio of boys and girls in the class is
12 to11.
This means, for every 12 boys
you can find 11 girls to match.
• There could be just 12 boys, 11
girls.
• There could be 24 boys, 22
girls.
• There could be 120 boys, 110
girls…a huge class
•

• The ratio of length and width of this
rectangle is 4 to 1.
What is the ratio if the
rectangle is 8cm long and
2cm wide?
Still 4 to 1, because for
every 4cm, you can find 1cm
to match
1cm
4cm

• The ratio of cats and dogs at my home is 2
to 1
How many dogs and cats do I
have? We don’t know, all we
know is if they’d start a fight,
each dog has to fight 2 cats.

How to simplify ratios?
• The ratios we saw on last
slide were all simplified.
How was it done?
b
a
Ratios can be expressed
in fraction form…
This allows us to do math
on them.
The ratio of boys and girls in the
class is
The ratio of the rectangle is
The ratio of cats and dogs in my
house is
11
12
b
a 1
4
1
2

• Now I tell you I have 12 cats and 6 dogs. Can you simplify the ratio of cats and dogs
to 2 to 1?
6
12 =
6
/
6
6
/
12 =
1
2
Divide both numerator and
denominator by their
Greatest Common Factor 6.

A person’s arm is 80cm, he is 2m tall.
Find the ratio of the length of his arm to his total height
m
cm
2
80

cm
cm
200
80
200
80 
5
2
To compare them, we need to convert both
numbers into the same unit …either cm or m.
• Let’s try cm first!

height
arm

Once we have the
same units, we can
simplify them.

• Let’s try m now!
height
arm
m
cm
2
80

m
m
2
8
.
0

Once we have the
same units, they
simplify to 1.
20
8

5
2

To make both numbers
integers, we multiplied both
numerator and denominator by
10

• If the numerator and denominator do not
have the same units it may be easier to
convert to the smaller unit so we don’t
have to work with decimals…
3cm/12m = 3cm/1200cm = 1/400
2kg/15g = 2000g/15g = 400/3
5ft/70in = (5*12)in / 70 in = 60in/70in = 6/7
2g/8g = 1/4 Of course, if they are already in the same units, we
don’t have to worry about converting. Good deal

More examples…
24
8
9
27
200
40
=
=
=
5
1
3
1
50
12
=
25
6
18
27
=
2
3
1
3

Now, on to proportions!
d
c
b
a

What is a proportion?
A proportion is an equation
that equates two ratios
The ratio of dogs and cats was 3/2
The ratio of dogs and cats now is 6/4=3/2
So we have a proportion :
4
6
2
3


Properties of a proportion?
4
6
2
3

2x6=12 3x4 = 12
3x4 = 2x6
Cross Product Property

d
c
b
a

• Cross Product Property
ad = bc
means
extremes

d
c
b
a
 d
d
c
d
b
a



c
d
b
a


Let’s make sense of the Cross Product Property…
c
b
b
d
b
a




bc
ad 
For any numbers a, b, c, d:

4
6
2
3

If
Then
6
4
3
2

• Reciprocal Property
Can you see it?
If yes, can you think
of why it works?

How about an example?
6
2
7 x
 Solve for x:
7(6) = 2x
42 = 2x
21 = x

How about another example?
x
12
2
7
 Solve for x:
7x = 2(12)
7x = 24
x =
7
24
Can you solve it using
Reciprocal Property? If
yes, would it be easier?

Can you solve this one?
x
x
3
1
7


Solve for x:
7x = (x-1)3
7x = 3x – 3
4x = -3
x =
4
3

Again, Reciprocal
Property?

Now you know enough about properties,
let’s solve the Mysterious problems!
gal
x
miles
gal
miles
_
)
5
5
(
1
30 

x
10
1
30

If your car gets 30 miles/gallon, how many gallons
of gas do you need to commute to school
everyday?
5 miles to school
5 miles to home
Let x be the number gallons we need for a day:
Can you solve
it from here?
x = Gal
3
1

So you use up 1/3 gallon a day. How many gallons would
you use for a week?
5 miles to school
5 miles to home
Let t be the number of gallons we need for a week:
days
gal
t
day
gal
5
_
1
3
/
1

5
1
3
/
1 t

5
3
1 t
 t
3
)
5
(
1 
3
5

t Gal
What property
is this?

So you use up 5/3 gallons a week (which is about 1.67
gallons). Consider if the price of gas is 3.69 dollars/gal,
how much would it cost for a week?
Let s be the sum of cost for a week:
5 miles to school
5 miles to home
gallons
dollars
s
gallon
dollars
67
.
1
_
1
69
.
3

67
.
1
1
69
.
3 s

3.69(1.67) = 1s s = 6.16 dollars

So what do you think?
10 miles
You pay about 6 bucks a week just to get to school!
What about weekends?
If you travel twice as much on weekends, say drive
10 miles to the Mall and 10 miles back, how many
gallons do you need now? How much would it cost
totally? How much would it cost for a month?
5 miles
Think proportionally! . . . It’s all about proportions!

Ratios-and-Proportions- introductory ppt

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