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6 10. ,. 9 15. 5 6. ,. 16 18. ,. 3 2. ,. Week 16, Day Four. HW # 57 - p. 234-235 # 6-30 even and 31, 32, 33 Extra Credit: Keyword : MT8CA Health Read the article, provide a 3 sentence summary, answer the math questions at the bottom of the page. Warm up.
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6 10 , 9 15 5 6 , 16 18 , 3 2 , Week 16, Day Four HW # 57 - p. 234-235 # 6-30 even and 31, 32, 33 Extra Credit: Keyword: MT8CA Health Read the article, provide a 3 sentence summary, answer the math questions at the bottom of the page. Warm up Find two ratios that are equivalent to each given ratio. Possible answers: 10 12 20 24 3 5 1. 2. 45 30 90 60 24 27 8 9 3. 4. Put your “duck” warm ups in the center of the table so that I can collect them.
Homework Check p. 230-231 # 17-29 odd 17) 14 points/game 19) 16 beats/measure 21) ~ 50 beats/minute 23) ~ 4 apples/lb 25) $3.75; $ 4.50; 2/3 lb 27) ~ $ 110/day 29)The student divided the number of shirts by the cost instead of the cost by the number of shirts
Goals for Today • 5-3 Proportions • Worksheet • Cereal- MARS task (list as CW and get a signature)
Vocabulary proportion cross products
2 3 2 3 4 6 4 6 = An equation that states that two ratios are equivalent is called a proportion. For example, the equation, or proportion, states that the ratios and are equivalent. Ratios that are equivalent are said to be proportional, or in proportion.
In the proportion , the products a ∙ d and b ∙ c are called cross products. a b a b c d c d = = Proportion a∙ d = b ∙ c Cross Products One way to find whether two ratios are equivalent is to find their cross products.
6 15 6 15 4 10 4 10 ? ? = = ? 6 10 = 4 15 Additional Example 1A: Using Cross Products to Identify Proportions Tell whether the ratios are proportional. Find the cross products. 60 = 60 Since the cross products are equal, the ratios are proportional.
4 1 15 5 ? 4 parts gasoline 1 part oil ? 15 quarts gasoline 5 quarts oil = = ? 4 5 = 1 15 Additional Example 1B: Using Cross Products to Identify Proportions A mixture of fuel for a certain small engine should be 4 parts gasoline to 1 part oil. If you combine 5 quarts of oil with 15 quarts of gasoline, will the mixture be correct? Set up equal ratios. Find the cross products. 20 15 The ratios are not equal. The mixture will not be correct.
5 10 5 10 2 4 2 4 ? ? = = ? 5 4 = 2 10 Check It Out! Example 1A Tell whether the ratios are proportional. Find the cross products. 20 = 20 Since the cross products are equal, the ratios are proportional.
3 1 12 4 ? 3 parts tea 1 part sugar ? 12 tablespoons tea 4 tablespoons sugar = = ? 3 4 = 1 12 Check It Out! Example 1B A mixture for a certain brand of tea should be 3 parts tea to 1 part sugar. If you combine 4 tablespoons of sugar with 12 tablespoons of tea, will the mixture be correct? Set up equal ratios. Find the cross products. 12 = 12 The ratios are equal. The mixture will be correct.
x 36 1 3 = 1 3 x 36 (36) = (36) Additional Example 2: Using Properties of Equality to Solve Proportions The ratio of the length of the actual height of a person to the length of the shadow cast by the person is 1:3. At the same time, a lighthouse casts a shadow that is 36 meters long. What should the length of its shadow be? 1 3 Write a ratio comparing height of a person to shadow length. height of person length of shadow Set up the proportion. Let x represent the shadow length. Since x is divided by 36, multiply both sides of the equation by 36. 12= x The length of the lighthouse’s shadow should be 12 meters.
x 20 1 5 = 1 5 x 20 (20) = (20) Check It Out! Example 2 For most cats, the ratio of the length of their head to their total body length is 1:5. If a cat is 20 inches in length, what should the total length of their head be? 1 5 Write a ratio comparing head length to total length. head length total length Set up the proportion. Let x represent the length of the cat's head. Since x is divided by 20, multiply both sides of the equation by 20. 4= x The length of the cat's head should be 4 inches.
weight 1 length 2 weight 2 length 1 = 55 5 w 4 = 220 5 5w 5 = Additional Example 3: Using Cross Products to Solve Proportions Allyson weighs 55 pounds and sits on a seesaw 4 feet away from it center. If Marco sits on the seesaw 5 feet away from the center and the seesaw is balanced, how much does Marco weigh? Set up a proportion using the information. Let w represent Marco’s weight. 55 ∙ 4 = 5w Find the cross products. Divide both sides by 5. 44 = w Simplify. Marco weighs 44 lb.
weight 1 length 2 weight 2 length 1 = 32 4 w 6 = 192 4 4w 4 = Check It Out! Example 3 Austin weighs 32 pounds and sits on a seesaw 6 feet away from it center. If Kaylee sits on the seesaw 4 feet away from the center and the seesaw is balanced, how much does Kaylee weigh? Set up a proportion using the information. Let w represent Kaylee’s weight. 32 ∙ 6 = 4w Find the cross products. Divide both sides by 4. 48 = w Simplify. Kaylee weighs 48 lbs.
30 45 x 225 = 6750 45 45x 45 = Additional Example 4: Business Application Nate has 225 envelopes to prepare for mailing. He takes 30 minutes to prepare 45 envelopes. If he continues at the same rate, how many more minutes until he has completed the job? Let x represent the number of minutes it takes to complete the job. Set up the proportion. 30 ∙ 225 = 45x Find the cross products. Divide both sides by 45. 150 = x Simplify. It will take 150 minutes to complete the job. Nate has already spent 30 minutes, so it will take him 150 – 30 = 120 more minutes to finish the job.
21 24 m 160 = 3360 24 24m 24 = Check It Out! Example 4 Nemo has to make 160 muffins for the bake sale. He takes 21 minutes to make 24 muffins. If he continues at the same rate, how many more minutes until he has completed the job? Let m represent the number of minutes it takes to complete the job. Set up the proportion. 21 ∙ 160 = 24m Find the cross products. Divide both sides by 24. 140 = m Simplify. It will take 140 minutes to complete the job. Nemo has already spent 21 minutes, so it will take him 140 – 21 = 119 more minutes to finish the job.
48 42 40 15 3 4 16 14 ? ? = = Lesson Quiz: Part I Tell whether the ratios are proportional. yes 1. 2. no 3. The ratio of violins to violas in an orchestra is 5:3. t The orchestra has 9 viola players. How many t violinists are in the orchestra? 15 4. Two weights are balanced on a fulcrum. If a 6 lb weight is positioned 1.5 ft from the fulcrum, at what distance from the fulcrum must an 18 lb weight be placed to keep the weights balanced? 0.5 ft
Lesson Quiz: Part II 5. An elevator travels 342 feet as it goes from the lobby of an office building to the top floor. It takes 7 seconds to travel the first 133 feet. If the elevator travels at the same rate, how much longer does it take to reach the top floor? 11 s