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DO NOW 12.6.13DIRECTIONS
The following ratios are proportional. Find the value of the missing variable term.
Can you determine your solution in a different way?
m = 8
k = 5
QUIZ # 1 Thursday, December 5, 2013 Name: ____________________ Period: __
DIRECTIONS: Write a proportion, then solve for x.
DIRECTIONS: Solve for the variable in each proportion below:
DIRECTIONS: State whether the two ratios form a proportion (Yes or No)
DIRECTIONS: Calculate the UNIT RATE for each problem below:
Mr. Sedar runs 5 miles in 45 minutes. What is his average speed per mile?
$15 U.S. will exchange for 195 Pesos when entering Mexico. What is the unit rate per U.S. Dollar ($)?
6
8
10
Yes
Yes
No
9 minutes per 1 mile
13 Pesos per 1 U.S. Dollar
6 54
What are we going to do?
What does solve mean?Solve means __________.
CFU
Students, you already know how to write a situation as a ratio. Now, we will use ratios to solve problems involving proportional relationships.
Make Connection
1 find the answer
Vocabulary
We will solve1 problems involving proportional relationships.
Learning Objective
Activate Prior Knowledge
A ratio is a relationship between two quantities.• A ratio can be written with words or
numbers.Write each situation as a ratio.
1. At the park, there are five ducks for every six geese.
2. On a piano, there are five black keys for every seven white keys.
57
56 5:6
5:7
or
or
NAME: __________________ 12.6.13
If there are 5 black keys then there are 7 white keys.
Concept Development
A proportional relationship is a set of equivalent ratios.Equivalent ratios have different values, but are in the same ratio.• To generate2 an equivalent ratio, multiply or divide each quantity in a
ratio by the same value.Proportional Relationship
If there are 10 black keys then there are 14 white keys.
black keys 5 10 15 20 25 30 35
white keys 7 14 21 28 35 42 49
Equivalent Ratios
× 2
× 2
Explain why the ratios
are equivalent ratios.
In your own words, what is a proportional relationship?A proportional relationship ___________.
CFU
57
2535
and
On a piano, the ratio of black keys to white keys is 5 to 7.
× 3
× 3
× 4
× 4
If there are 15 black keys then there are 21 white keys.
If there are 20 black keys then there are 28 white keys.
Animated
2 create
Vocabulary
Read the problem carefully.Identify3 the given ratio. (underline)Identify information about the unknown ratio. (circle)
Represent4 the proportional relationship. Hint: Use a table.
Generate an equivalent ratio to solve for the unknown. Hint: Multiply or divide by the same value.Interpret5 the solution.
Solve problems involving proportional relationships.1
23
4
ab
3 find (synonym)4 show (synonym)5 explain (synonym)
Vocabulary
How did I/you identify information about the given ratio?How did I/you identify information about the unknown ratio?How did I/you represent the proportional relationship?How did I/you solve for the unknown?
CFU
2
1a
1b
3
Skill Development/Guided PracticeA proportional relationship is a collection of equivalent ratios.Equivalent ratios have different values, but are in the same ratio.
1. Neil’s recipe for walnut spice cake calls for two cups of flour for every cup of walnuts. If Neil uses six cups of flour, how many cups of walnuts should he use?
_____________________________________________
2. Selena is buying gas at four dollars for every gallon of gas. If Selena spent 16 dollars, how many gallons of gas did she buy?
_____________________________________________
flour walnuts
2 cups 1 cup
6 cups ? cups× 3
If Neil uses six cups of flour, he should use 3 cups of walnuts.3 cups
× 3
dollars gallons
$4 1
$16 ?× 4
If Selena spent 16 dollars, she bought 4 gallons of gas. 4
× 4
Skill Development/Guided Practice (continued)
Read the problem carefully.Identify the given ratio. (underline)Identify information about the unknown ratio. (circle)
Represent the proportional relationship. Hint: Use a table.
Generate an equivalent ratio to solve for the unknown. Hint: Multiply or divide by the same value.Interpret the solution.
Solve problems involving proportional relationships.1
23
4
ab
How did I/you identify information about the given ratio?How did I/you identify information about the unknown ratio?How did I/you represent the proportional relationship?How did I/you solve for the unknown?
CFU
2
1a
1b
3
A proportional relationship is a collection of equivalent ratios.Equivalent ratios have different values, but are in the same ratio.
3. A grocery store is selling three melons for seven dollars. If Harold spent $28 on melons, how many did he buy?
_____________________________________________
4. In Maya’s marble collection, she has three red marbles for every four blue marbles. If Maya has 28 blue marbles, how many red marbles are in her collection?
_____________________________________________
melons dollars
3 7
? × 4
If Harold spent $28, he bought 12 melons.28
× 4
If Maya has 28 blue marbles, she has 21 red marbles.
red blue
3 4
?× 7
28× 7
12
21
Skill Development/Guided Practice (continued)
Read the problem carefully.Identify the given ratio. (underline)Identify information about the unknown ratio. (circle)
Represent the proportional relationship. Hint: Use a table.
Generate an equivalent ratio to solve for the unknown. Hint: Multiply or divide by the same value.Interpret the solution.
Solve problems involving proportional relationships.1
23
4
ab
How did I/you identify information about the given ratio?How did I/you identify information about the unknown ratio?How did I/you represent the proportional relationship?How did I/you solve for the unknown?
CFU
2
1a
1b
3
A proportional relationship is a collection of equivalent ratios.Equivalent ratios have different values, but are in the same ratio.
5. A koi pond has 27 orange fish and 45 white fish. How many orange fish are there for every five white fish? A second koi pond has 20 white fish. If the fish are in the same ratio, how many orange fish are in the second koi pond?
_____________________________________________
_____________________________________________
6. Monique bought yams at the store. She spent 24 dollars on 18 yams. At this price, how much did Monique pay for every 3 yams? Martin bought yams at the same store and spent 16 dollars. How many yams did Martin buy?
_____________________________________________
_____________________________________________
orange white
27 453 ?
9 There are three orange fish for every five white fish.5
9
4 420? 12
If there are 20 white fish, there are twelve orange fish.
dollars yams
24 183?
6 Monique paid four dollars for every three yams.4
6
4 416 ? 12
If Martin spent 16 dollars, he bought twelve yams.
Skill Development/Guided Practice (continued)
How did I/you determine what the question is asking?How did I/you determine the math concept required?How did I/you determine the relevant information?How did I/you solve and interpret the problem?How did I/you check the reasonableness of the answer?
CFU
2
1
3
4
5
7. Vitor is planting flowers and bushes in his garden. He has 4 flowers for every 3 bushes to plant. He wants to have between 20 and 50 plants. Draw in the flowers ( ) and bushes ( ) on the garden to show a possible number of each.
20 15 Answers will vary.
Skill Development/Guided Practice (continued)
How did I/you determine what the question is asking?How did I/you determine the math concept required?How did I/you determine the relevant information?How did I/you solve and interpret the problem?How did I/you check the reasonableness of the answer?
CFU
2
1
3
4
5
8. The Albus Franklin City Park is going to plant some trees. They want to plant between 16 and 30 trees. There will be 2 pine trees for each oak tree. Draw in the pine trees ( ) and oak trees ( ) in the park to show a possible number of each.
8 12 Answers will vary.
Solving problems involving proportional relationships will help you solve real-world problems.
Solving problems involving proportional relationships will help you do well on tests.
1
Does anyone else have another reason why it is relevant to solve problems involving proportional relationships? (Pair-Share) Why is it relevant to solve problems involving proportional relationships? You may give one of my reasons or one of your own. Which reason is more relevant to you? Why?
CFU
2
Relevance
A proportional relationship is a collection of equivalent ratios.Equivalent ratios have different values, but are in the same ratio.
Sample Test Question:
93. Choose Yes or No to indicate whether each ratio is equivalent to .
A
B
C
D
O Yes O No
O Yes O No
O Yes O No
O Yes O No
610
57
35
25
1525
Ericka’s Flower Shop designs floral bouquets. The florist uses four tulips for every three roses in each bouquet. If a bouquet has twelve tulips, how many roses are in the bouquet?
tulips
roses
4 3
12
If a bouquet has 12 tulips, there are 9 roses in the bouquet.
? 9
Read the problem carefully.Identify the given ratio. (underline)Identify information about the unknown ratio. (circle)
Represent the proportional relationship. Hint: Use a table.
Generate an equivalent ratio to solve for the unknown. Hint: Multiply or divide by the same value.Interpret the solution.
Solve problems involving proportional relationships.1
23
4
ab
What did you learn today about solving problems involving proportional relationships? (Pair-Share) Use words from the word bank.
Skill Closure
Access Common Core
Summary Closure
A proportional relationship is a collection of equivalent ratios.Equivalent ratios have different values, but are in the same ratio.
1. There were four adults for every child in line at the movie theatre. If there were 8 children in line, how many adults were in line at the movie theatre?
_____________________________________________
adults children
4 1
8? × 8
If there were 8 children in line, there were 32 adults. 32× 8
Yuri created a table to solve the problem above. Explain the error Yuri made.
adults
children
4 1
?8
Word Bank
proportionalrelationshipequivalent
ratiogenerate
Yuri placed the total number of children in line in the wrong column. It should be in the children column.
Independent Practice
Read the problem carefully.Identify the given ratio. (underline)Identify information about the unknown ratio. (circle)
Represent the proportional relationship. Hint: Use a table.
Create an equivalent ratio to solve for the unknown. Hint: Multiply or divide by the same value.Interpret the solution.
Solve problems involving proportional relationships.1
23
4
ab
A proportional relationship is a collection of equivalent ratios.Equivalent ratios have different values, but are in the same ratio.
1. Jason is cooking rice for his family for dinner. The recipe calls for 2 cups of water for every 1 cup of rice. If he uses 4 cups of water, how much rice should he add?
_____________________________________________
2. Raymond is shopping for produce at the local farmer’s market. A fruit stand sells 4 avocados for $3. How much will he pay for 20 avocados?
_____________________________________________
water rice
2 cups 1 cup
4 cups ? cups× 2
If Jason adds 4 cups of water, he should add 2 cups of rice.2 cups
× 2
avocados dollars
4 3
20 ?× 4 Raymond will pay $15 for 20 avocados. 15
× 4
Independent Practice (continued)
Read the problem carefully.Identify the given ratio. (underline)Identify information about the unknown ratio. (circle)
Represent the proportional relationship. Hint: Use a table.
Create an equivalent ratio to solve for the unknown. Hint: Multiply or divide by the same value.Interpret the solution.
Solve problems involving proportional relationships.1
23
4
ab
A proportional relationship is a collection of equivalent ratios.Equivalent ratios have different values, but are in the same ratio.
3. In a box, there are 35 pencils and 10 pens. How many pens are there for every seven pencils? Another box has pencils and pens in the same ratio. If there are 20 pens, how many pencils are in the second box?
_____________________________________________
_____________________________________________
pencils pens
35 107 ?
5 There are two pens for every seven pencils.2
5
10 1020? 70 If there are 20 pens, there are 70 pencils.
Periodic Review 1
Access Common Core
1. The 6th grade classes are taking a field trip to the aviary1. There is one adult for every five students. If there are fifteen adults on the field trip, how many students are taking the field trip?
_____________________________________________
2. The aviary has three macaws for every two cockatoos. If there are twelve cockatoos at the aviary, how many macaws are there?
_____________________________________________
adults students
1 5
15 ? × 15
If there are 15 adults, there are 75 students.75× 15
macaws cockatoos
3 2
12? × 6
If there are 12 cockatoos, there are 18 macaws.18× 6
Fill in the missing values for each proportional relationship. Explain how you found the missing values.
3 6 9 184 12 16 281.
2 4 6 8 145 20 252.
14 21 358 16 40 48 563.
1 large building or cage for birds
Vocabulary
12 15 218 20 24
10 1210 15 30 35
7 28 42 4924 32
Periodic Review 2
Access Common Core
1. Choose Yes or No to indicate whether each ratio is equivalent to .6
10
O Yes O No
O Yes O No
O Yes O No
A
B
C
35
68
2135
2. Choose Yes or No to indicate whether each ratio is equivalent to .5
10
O Yes O No
O Yes O No
O Yes O No
A
B
C
12
15
1530
3. Choose Yes or No to indicate whether each ratio is equivalent to .39
O Yes O No
O Yes O No
O Yes O No
A
B
C
2163
13
16
1. A map of Seattle uses a scale of six inches for every twenty miles. How many miles are represented by twelve inches on the map?
_________________________________________
inches miles
6 20
12 ? × 2
Twelve inches on the map represents 40 miles.40× 2
Periodic Review 3
Access Common Core
1. Eddie is building an arrangement of fruit to give as a gift. He plans to use four oranges for every three apples. If he uses twelve apples, how many oranges should he use? How many pieces of fruit are in the arrangement?
2. Eddie has baskets which usually hold between 12 to 26 fruits. How many different arrangements can Eddie make with a 4:3 ratio of oranges to apples?
3. Using the same baskets, how many different arrangements can Eddie make if he changes his ratio of oranges to apples to 3:2?
1. An 18-karat1 gold necklace weighs 24 grams: 18 grams of pure gold and 6 grams of an alloy2. There is a matching bracelet that contains 6 grams of gold. How much of the alloy is in the bracelet? What is the weight of the bracelet?
_______________________________________________
gold alloy
18 grams 6 grams
6 grams ? grams 3 The bracelet contains 2 grams of the alloy. It weighs 8 grams.
2 grams 3
16 oranges : 12 apples : 28 total
12 oranges : 9 apples : 21 total8 oranges : 6 apples : 14 total
9 oranges : 6 apples : 15 total12 oranges : 8 apples : 20 total15 oranges : 10 apples : 25 total
1 measure of purity of gold2 metal made by combining two or more metals
Vocabulary