Do Now: 1) Given triangle UAF with coordinates
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Transcript of Do Now: 1) Given triangle UAF with coordinates
Do Now:1) Given triangle UAF with coordinatesU(O, 4), A(8, -9), and F(-IO, -12), find the image of point A after a reflection in the y-axis.
2) After a reflection in the y-axis, (-1,-1) is the image of point B. What is the original location of point B?
EQ: How do I use ratios to compare numbers
HWK: WB p 42, even, p43, odd:
Learn to identify, write, and compare ratios and find units and compare unit rates, such as average speed and unit price. .
Course 2
5-1 Ratios, Rates and Unit Rates
M7P1.b Solve problems that arise in mathematics and in other contexts; M7P1.d Monitor and reflect on the processof mathematical problem solving
Vocabulary
A ratio is a comparison of two quantities by division.
Insert Lesson Title Here
Course 2
5-1 Ratios
A rate is a ratio that compares two quantities measured in different units.
A unit rate is a rate whose denominator is 1. To change a rate to a unit rate, divide both the numerator and denominator by the denominator.
Course 2
5-1 Ratios
Sometimes a ratio can be simplified. To simplify a ratio, first write it in fraction form and then simplify the fraction.
Course 2
5-1 Ratios
To compare ratios, write them as fractions with common denominators. Then compare the numerators.
Course 2
5-2 Rates
An average rate of speed is the ratio of distance traveled to time. The ratio is a rate because the units in the numerator and denominator are different.
In basketball practice. Kathlene made 17 baskets in 25 attempts. She compared the number of baskets she made to the total number of attempts she made by using the
ratio . A ratio is a comparison of two
quantities by division.
1725
Kathlene can write her ratio of baskets madeto attempts in three different ways.
1725
17 to 25 17:25
Course 2
5-1 Ratios
Twenty students are asked to choose their favorite music category. Eight chose pop, seven chose hip hop, and five chose rock. Write each ratio in all three forms.
Course 2
5-1 Ratios
A. rock to hip hop
57
, 5 to 7, 5:7
The ratio of rock to hip hop is 5 to 7, which can be written as follows:
B. hip hop to popThe ratio of hip hop to pop is 7 to 8, which can be written as follows:78
, 7 to 8, 7:8
Twenty students are asked to choose their favorite music category. Eight chose pop, seven chose hip hop, and five chose rock. Write each ratio in all three forms.
Course 2
5-1 Ratios
C. rock to pop and hip hop
The ratio of rock to pop is 5 to 8 and rock to hip hop is 5 to 7, which can be written as follows:
515
, 5 to 15, 5:15
Nineteen students are asked to choose their favorite sport. Nine chose rock climbing, four chose kite surfing, and six chose snow boarding. Write each ratio in all three forms.
Course 2
5-1 Ratios
A. snow boarding to rock climbing
69
, 6 to 9, 6:9
The ratio of snow boarding to rock climbing is 6 to 9, which can be written as follows:
B. kite surfing to snow boardingThe ratio of kite surfing to snow boarding is 4 to 6, which can be written as follows:46
, 4 to 6, 4:6
Course 2
5-1 Ratios
C. rock climbing to kite surfing and snowboarding
The ratio of rock climbing to kite surfing is 9 to 4 and rock climbing to snow boarding is 9 to 6, which can be written as follows:
910
, 9 to 10, 9:10
Nineteen students are asked to choose their favorite sport. Nine chose rock climbing, four chose kite surfing, and six chose snow boarding. Write each ratio in all three forms.
On average, most people can read about 600 words in 3 minutes. Write the ratio of words to minutes in all three forms. Write your answer in simplest form.
Course 2
5-1 Ratios
wordsminute
Write the ratio as a fraction.
600 ÷ 33 ÷ 3
= 6003
Simplify.
For every minute, there are 200 words read.
wordsminute
=
wordsminute
= 2001
The ratio of words to minutes is 200 to 1.
At Casitas Middle School there are 456 microscopes for 152 students. Write the ratio of microscopes to students in all three forms. Write your answer in simplest form.
Course 2
5-1 Ratios
microscopesstudents
Write the ratio as a fraction.
456 ÷ 152152 ÷ 152
= 456152
Simplify.
For every microscope, there are 3 children.
microscopestudents
=
microscopestudents
= 31
The ratio of microscopes to students is 3 to 1.
Honey-lemon cough drops come in packages of 30 drops per 10-ounce bag. Cherry cough drops come in packages of 24 drops per 6-ounce bag. Compare the ratio of drops per ounces for each bag of cough drops.
Course 2
5-1 Ratios
Honey-lemon Cherry
Drops 30 24
Ounces 10 6
Honey-lemon: dropsounces
= 3010
= 31
Cherry: dropsounces
= 246
= 41
Because 4 > 3 and the denominators are the same, the drops to ounces is greater in the bag of cherry cough drops.
Write the ratios as fractions with common denominators.
Jelly beans come in small packages of 25 per 5 ounce package and large packages of 56 per 8 ounce package. Compare the ratio of jelly beans per ounce for each of the packages.
Course 2
5-1 Ratios
Large Small
Jelly beans 56 25
Ounces 8 5
Large:jelly beans ounces
= 568
= 71
Small: jelly beans ounces
= 255
= 51
Because 7 > 5 and the denominators are the same, jelly beans to ounces is greater in the small package.
Write the ratios as fractions with common denominators.
Find the rate.
A Ferris wheel revolves 35 times in 105 minutes. How many minutes does 1 revolution take?
105 minutes35 revolutions
Write a rate that compares minutes and revolutions.
Simplify.
Divide the numerator and denominator by 35.
Course 2
5-2 Rates
105 minutes ÷ 35 35 revolutions ÷ 35
3 minutes1 revolution
The Ferris wheel revolves 1 time in 3 minutes.
Find the rate.
Sue walks 6 yards and passes 24 security lights set along the sidewalk. How many security lights does she pass in 1 yard?
24 lights6 yards
Write a rate that compares security lights and yards.
Simplify.
Divide the numerator and denominator by 6.
Course 2
5-2 Rates
24 lights ÷ 6 6 yards ÷ 6
4 lights1 yard
Sue passes 4 security lights in 1 yard.
Find the rate.
A dog walks 696 steps in 12 minutes. How many steps does the dog take in 1 minute?
696 steps12 minutes
Write a rate that compares steps and minutes.
Simplify.
Divide the numerator and denominator by 12.
Course 2
5-2 Rates
696 steps ÷ 12 12 minutes ÷ 12
58 steps1 minute
The dog walks 58 steps per minute.
Find the rate.
To make 12 smoothies, Henry needs 30 cups of ice. How many cups of ice does he need for one smoothie?
30 cups of ice12 smoothies
Write a rate that compares cups of ice and smoothies.
Simplify.
Divide the numerator and denominator by 12.
Course 2
5-2 Rates
30 cups of ice ÷ 12 12 smoothies ÷ 12
2.5 cups of ice1 smoothie
Henry needs 2.5 cups of ice per smoothie.
Danielle is cycling 68 miles as a fundraising commitment. She wants to complete her ride in 4 hours. What should be her average speed in miles per hour?
68 miles4 hours
Write the rate as a fraction.
68 miles ÷ 4 4 hours ÷ 4
= 17 miles1 hour
Divide the numerator and denominator by the denominator
Danielle’s average speed should be 17 miles per hour.
Course 2
5-2 Rates
Rhett is a pilot and needs to fly 1191 miles to the next city. He wants to complete his flight in 3 hours. What should be his average speed in miles per hour?
1191 miles3 hours
Write the rate as a fraction.
1191 miles ÷ 3 3 hours ÷ 3
= 397 miles1 hour
Divide the numerator and denominator by the denominator
Rhett’s average speed should be 397 miles per hour.
Course 2
5-2 Rates
A unit price is the price of one unit of an item. The unit used depends on how the item is sold. The table shows some examples.
Course 2
5-2 Rates
Type of Item Example of Units
Liquid Ounces, quarts, gallons, liters
Solid Ounces, pounds, grams, kilograms
Any item Bottle, container, carton
A 12-ounce sports drink costs $0.99, and a 16-ounce sports drink costs $1.19. Which size is the best buy?
Consumer Math Application
Size Price
12 ounces $0.99
16 ounces $1.19
Divide the price by the number of ounces (oz) to find the unit price of each size.
$0.9912 oz
≈ $0.08oz
Since $0.07 < $0.08, the 16 oz sports drink is the best buy.
Course 2
5-2 Rates
$1.1916 oz
≈ $0.07oz
A 1.5 gallon container of milk costs $4.02, and a 3.5 gallon container of milk costs $8.75. Which size is the best buy?
Size Price
1.5 gal $4.02
3.5 gal $8.75
Divide the price by the number of gallons (g) to find the unit price of each size.
$4.021.5 gal
= $2.68gal
Since $2.50 < $2.68, the 3.5 gallon container is the best buy.
Course 2
5-2 Rates
$8.753.5 gal
= $2.50gal
TOTD
A coin bank contains 16 quarters, 12 dimes, and 8 nickels.
Insert Lesson Title Here
Course 2
5-1&2 Ratios and Rates
1. nickels to quarters
2. On a school trip, Bus 1 has 3 teachers and 14 students. Bus 2 has 4 teachers and 28 students. Which bus has the greater ratio of teachers to students?
3. There are 220 calories in 5 crackers. Write the ratio of calories to crackers in all three forms. Write your answers in simplest form.