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Proportional Reasoning

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Presentation on theme: "Proportional Reasoning"— Presentation transcript:

1 Proportional Reasoning
Section 2.2 Proportional Reasoning

2 Homework Pg 101 #

3 If a proportion contains a variable, you can cross multiply to solve for the variable. When you set the cross products equal, you create a linear equation that you can solve by using the skills that you learned in Lesson 2-1.

4 Solving Proportions Solve each proportion. c = p A. B. = p c = = 206.4 = 24p Set cross products equal. 88c = 1848 p = 88c = Divide both sides. 8.6 = p c = 21

5 Solve each proportion. y A. = B. = x y x = = Set cross products equal. 924 = 84y 2.5x =105 y = = 2.5x Divide both sides. 11 = y x = 42

6 Because percents can be expressed as ratios, you can use the proportion to solve percent problems.
Percent is a ratio that means per hundred. For example: 30% = 0.30 = Remember! 30 100

7 Solving Percent Problems
A poll taken one day before an election showed that 22.5% of voters planned to vote for a certain candidate. If 1800 voters participated in the poll, how many indicated that they planned to vote for that candidate?

8 At Clay High School, 434 students, or 35% of the students, play a sport. How many students does Clay High School have?

9 A rate is a ratio that involves two different units
A rate is a ratio that involves two different units. You are familiar with many rates, such as miles per hour (mi/h), words per minute (wpm), or dollars per gallon of gasoline. Rates can be helpful in solving many problems.

10 Use a proportion to find the length of his stride in meters.
Fitness Application Ryan ran 600 meters and counted 482 strides. How long is Ryan’s stride in inches? (Hint: 1 m ≈ in.) Use a proportion to find the length of his stride in meters. 600 m 482 strides x m 1 stride = Write both ratios in the form meters strides 600 = 482x Find the cross products. x ≈ 1.24 m

11 Luis ran 400 meters in 297 strides. Find his stride length in inches.
Use a proportion to find the length of his stride in meters. 400 m 297 strides x m 1 stride = Write both ratios in the form meters strides 400 = 297x Find the cross products. x ≈ 1.35 m

12 Nature Application The tree in front of Luka’s house casts a 6-foot shadow at the same time as the house casts a 22-fot shadow. If the tree is 9 feet tall, how tall is the house? Sketch the situation. The triangles formed by using the shadows are similar, so Luka can use a proportion to find h the height of the house. 9 ft 6 ft = 6 9 h 22 = Shadow of tree Height of tree Shadow of house Height of house h ft 22 ft 6h = 198 h = 33 The house is 33 feet high.

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