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Section 9.4: Normal Distributions

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Presentation on theme: "Section 9.4: Normal Distributions"— Presentation transcript:

1 Section 9.4: Normal Distributions

2 Objective(s): By following instructions, students will be able to: Use characteristics of a normal distribution to make estimates and probability predictions about the population that the data represents.

3 Def: A bell shaped symmetric distribution with a tail on each end is called a normal distribution.

4 Explore Use a graphing calculator and the infant birth mass data in the table below to determine if the set represents a normal distribution.

5 Explore B

6 explain 2A

7 explain 2B Sketch a relative frequency histogram. The heights of the bars now indicate relative frequencies.

8 explain 2C Recall from the first Explore that the mean of this data set is 3.5 and the standard deviation is By how many standard deviations does a birth mass of 3.2 kg differ from the mean? Round to one decimal place. Justify your answer.

9

10

11 explain 1A The masses (in grams) of pennies minted in the United
States after 1982 are normally distributed with a mean of 2.50 g and a standard deviation of 0.02 g. explain 1A Find the percent of these pennies that have a mass between 2.46 g and 2.54 g.

12 explain 1B The masses (in grams) of pennies minted in the United
States after 1982 are normally distributed with a mean of 2.50 g and a standard deviation of 0.02 g. explain 1B Find the percent of these pennies that have a mass between 2.48 g and 2.52 g.

13 Your-Turn #1 Find the percent of these pennies that have a mass between 2.44 g and 2.56 g.

14 explain 2A The masses (in grams) of pennies minted in the United States after 1982 are normally distributed with a mean of 2.50 g and a standard deviation of 0.02 g. Estimate the probability that a randomly chosen penny has a mass greater than 2.52 g.

15 explain 2B The masses (in grams) of pennies minted in the United States after 1982 are normally distributed with a mean of 2.50 g and a standard deviation of 0.02 g. Estimate the probability that a randomly chosen penny has a mass greater than 2.56 g.

16 Your-Turn #2 Find the probability that a randomly chosen penny has a mass less than 2.54 g.

17 HW: Sec 9.4 #s 1-17 ALL

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