The document defines and provides examples of ratios. It discusses: - Ratios compare two quantities and can be written in different forms such as a:b, a to b, or a/b. - Order matters in ratios - a:b is not the same as b:a. - Equivalent ratios can be formed by simplifying fractions or multiplying the original ratio. - A compound ratio compares more than two quantities. - Word problems demonstrate calculating quantities from a given ratio.

1. DO NOW (not later):
 Compare the number of boys to girls
in the class.

2.  The number of boys =
 The number of girls =
 If we compare boys to girls we get
___ boys to _____ girls.

3. What do we call a comparison between
two or more quantities?
RATIO We just found the
RATIO of boys to
girls.
Is the ratio of
girls to boys
the same ?
No, when writing a ratio, ORDER matters.

4. AIM:
What is a ratio?

5. It’s Friday night and your friends are
having a party……
The ratio of girls to guys is 2 to 12.
Would you want to attend the
party?

6. How many basketballs to footballs are
there?
 For every 4 basketballs
there are 6 footballs.
 The ratio is 4 to 6.

7. What are some other ways we
can write the ratio of basketball
to footballs?
Every ratio can be written in 3 ways:
 4 to 6
 4 : 6
 4
6
First quantity to Second quantity
First quantity : Second quantity
First quantity divided by the second
quantity (as a fraction).
Careful!!
Order matters in a ratio.
4 to 6
Is NOT the same as
6 to 4

8. Write the ratio of sandwiches to coke bottles
3 different ways. 6:8 , 6 to 8, and 6
8
Since a fraction can be simplified, We can simplify the ratio 6/8
to 3/4. The ratio of sandwiches to coke bottles can also be
expressed as 3 : 4 or 3 to 4.
In other words, ratios can be simplified to form
equivalent ratios.

9. Equivalent Ratios
 Simplify the following ratios:
 4 to 8
 10 to 8
 8 to 10
4 = 4 / 4 = 1 = 1 to 2
8 8 / 4 2
GCF = 4
Step 1 – Write the ratio as a fraction
Step 2 – Simplify the fraction (Find the greatest common factor (GCF) of
both numbers and divide the numerator and denominator by the GCF).
Step 3 – Write the equivalent ratio in the same form as the question

10. Equivalent Ratios can be formed by
multiplying the ratio by any number.
 For example, the ratio 2 : 3 can also be
written as
 4 : 6 (multiply original ratio by by 2)
 6 : 9 (multiply original ratio by by 3)
 8 : 12 (multiply original ratio by by 4)
The ratio 2 : 3 can be expressed as
2x to 3x (multiply the original ratio
by any number x)

11. Compound Ratios
 A ratio that compares more than 2 quantities
is called a compound ratio.
 Example:
 A cake recipe says the ratio of cups of milk,
sugar, and batter are 1:2:4.
 This means that there is one cup of milk for every
two cups of sugar and four cups of batter.

12. A bag contains 18 yellow, blue, and red
marbles. The ratio of yellow to blue to
red marbles is 4 : 2 : 3.
1) Write the ratio of yellow to blue marbles in
simplest form.
4 : 2 can be simplified to 2 : 1
2) What is the ratio of yellow to red marbles?
3) How many yellow marbles are there?
4 : 3
Yellow : Blue : Red is 4 : 2 : 3
Since any multiple of this is an equivalent ratio, this
can also be written as 4x : 2x: 3x
Let 4x = yellow, 2x = blue , 3x = red
4x + 2x+ 3x = 18
9x = 18
X= 2
Since the question asks for yellow marbles,
there are 4x or 4 (2) = 8 yellow marbles.

13. Practice problem # 1
(1) You have 100 different shirts. The ratio
of blue to black shirts is 20 .
30
a) Write the ratio of blue to black
shirts 3 different ways.
b) Write the ratio in simplest form.
c) Explain what this ratio tells us.
d) How many black shirts do you have?

14. Solution - # 1 
You have 100 different shirts. The ratio of blue to black shirts is 20 / 30
a) Write the ratio of blue to black shirts 3 different ways.
20 to 30 , 20 : 30, 20
30
b) Write the ratio in simplest form. 2
3
c) Explain what this ratio tells us. For every two blue shirts, there are 3
black shirts.
d) How many black shirts do you have?
2x + 3x = 100
5x = 100
x = 20
There are 2x black shirts so 2 (20) = 40 black shirts

15. Practice Word Problems
1) You go to a party where the
ratio of boys to girls is 28 to
56. Express the ratio of boys
to girls in simplest form.
2) Explain what this ratio tells
us.
(1)28 / 56 = 1 / 2
The ratio of boys to girls is 1 to 2
(2) For every 1 boy there are 2
girls at the party.

16. Practice Word Problems
(1) Mindy has 72 candy bars. If
the ratio of Mars to Snickers is
8:4, Find the number of each
type of candy.
(2) Explain what this ratio tell us.

17. Challenge Question
The perimeter of a rectangle is
500 feet. The ratio of the base
and height is 3:2. What is the
measure of the height?