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Warm Up: Divide using a calculator. 1. 14 ÷ ÷ 0.17 ÷ ÷ 2.7 8 200 3.5 3
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7-1 Rates MCC7.RP.1 Compute unit rates associated with ratios of fractions, including ratios of lengths, areas and other quantities measured in like or different units. How do you find and compare unit rates?
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A rate is a ratio that compares two quantities measured in different units.
A unit rate is a rate whose denominator is 1 when it is written as a fraction. To change a rate to a unit rate, first write the rate as a fraction and then divide both the numerator and denominator by the denominator.
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Ratio is a comparison of 2 quantities by division
You can write ratios in 3 ways: Ex: 5 to 7 Ex: Ex: 5:7 5 7
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Unit rate is the rate for 1 unit
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How to find Unit Rate Step 1: Write as a fraction Step 2: Divide top and bottom by the denominator Step 3: Label
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A Ferris wheel revolves 35 times in 105 minutes
A Ferris wheel revolves 35 times in 105 minutes. How many minutes does 1 revolution take? What are you comparing??? 35 Revolves : 105 minutes 105 minutes 35 revolutions What is the 1???
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Sooo…..Put the 1 unit on the bottom!!!
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Yes Write me Find the rate.
A Ferris wheel revolves 35 times in 105 minutes. How many minutes does 1 revolution take? 105 minutes 35 revolutions Write a rate that compares minutes and revolutions. 105 minutes ÷ 35 35 revolutions ÷ 35 Divide the numerator and denominator by 35. 3 minutes 1 revolution Simplify. The Ferris wheel revolves 1 time in 3 minutes.
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Make the bottom 1 Make the bottom 1 Make the bottom 1 Unit Rate Video
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Additional Example 1B: Finding Unit Rates
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 lights 6 yards Write a rate that compares security lights and yards. 24 lights ÷ 6 6 yards ÷ 6 Divide the numerator and denominator by 6. 4 lights 1 yard Simplify. Sue passes 4 security lights in 1 yard.
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Check It Out: Example 1A Find the rate. A dog walks 696 steps in 12 minutes. How many steps does the dog take in 1 minute? 696 steps 12 minutes Write a rate that compares steps and minutes. 696 steps ÷ 12 12 minutes ÷ 12 Divide the numerator and denominator by 12. 58 steps 1 minute Simplify. The dog walks 58 steps per minute.
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Check It Out: Example 1B 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 ice 12 smoothies Write a rate that compares cups of ice and smoothies. 30 cups of ice ÷ 12 12 smoothies ÷ 12 Divide the numerator and denominator by 12. 2.5 cups of ice 1 smoothie Simplify. Henry needs 2.5 cups of ice per smoothie.
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An average rate of speed is the ratio of distance traveled to time
An average rate of speed is the ratio of distance traveled to time. The ratio is a rate because the units being compared are different.
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Additional Example 2: Finding Average Speed
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 miles 4 hours Write the rate as a fraction. 68 miles ÷ 4 4 hours ÷ 4 17 miles 1 hour Divide the numerator and denominator by the denominator = Danielle’s average speed should be 17 miles per hour.
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Check It Out: Example 2 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 miles 3 hours Write the rate as a fraction. 1191 miles ÷ 3 3 hours ÷ 3 397 miles 1 hour Divide the numerator and denominator by the denominator = Rhett’s average speed should be 397 miles per hour.
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A unit price is the price of one unit of an item
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. Bottle, container, carton Any item Ounces, pounds, grams, kilograms Solid Ounces, quarts, gallons, liters Liquid Example of Units Type of Item
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Additional Example 3: Consumer Math Application
A 12-ounce sports drink costs $0.99, and a 16- ounce sports drink costs $1.19. Which size is the best buy? Price per 1 oz $1.19 16 ounces $0.99 12 ounces Price Size Divide the price by the number of ounces (oz) to find the unit price of each size. $0.99 12 oz $0.08 oz $1.19 16 oz $0.07 oz ≈ ≈ Since $0.07 < $0.08, the 16 oz sports drink is the best buy.
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Since $2.50 < $2.68, the 3.5 gallon container is the best buy.
Check It Out: Example 3 A 1.5 gallon container of milk costs $4.02, and a 3.5 gallon container of milk costs $ Which size is the best buy? Price per 1 gal $8.75 3.5 gal $4.02 1.5 gal Price Size Divide the price by the number of gallons (g) to find the unit price of each size. $4.02 1.5 gal $2.68 gal $8.75 3.5 gal $2.50 gal = = Since $2.50 < $2.68, the 3.5 gallon container is the best buy.
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Workbook pg 177 Ratey Cat Video
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Workbook pg 178
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Complete HW Workbook Pg. 179
Homework Help Video
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