3CH9L7

Information about 3CH9L7

Published on January 14, 2008

Author: Manuele

Source: authorstream.com

Content

Slide1:  Warm Up Problem of the Day Lesson Presentation Slide2:  Warm Up Evaluate each expression. 1. 8! 2. 3. Find the number of permutations of the letters in the word quiet if no letters are used more than once. 40,320 720 120 Slide3:  Problem of the Day The area of a spinner is 75% red and 25% blue. However, the probability of its landing on red is only 50%. Sketch a spinner to show how this can be. Possible answer: Slide4:  Learn to find the probabilities of independent and dependent events. Slide5:  Vocabulary independent events dependent events Insert Lesson Title Here Slide6:  Events are independent events if the occurrence of one event does not affect the probability of the other. Events are dependent events if the occurrence of one does affect the probability of the other. Slide7:  Determine if the events are dependent or independent. A. getting tails on a coin toss and rolling a 6 on a number cube B. getting 2 red gumballs out of a gumball machine Additional Example 1: Classifying Events as Independent or Dependent Tossing a coin does not affect rolling a number cube, so the two events are independent. After getting one red gumball out of a gumball machine, the chances for getting the second red gumball have changed, so the two events are dependent. Slide8:  Determine if the events are dependent or independent. A. rolling a 6 two times in a row with the same number cube B. a computer randomly generating two of the same numbers in a row Try This: Example 1 The first roll of the number cube does not affect the second roll, so the events are independent. The first randomly generated number does not affect the second randomly generated number, so the two events are independent. Slide10:  Three separate boxes each have one blue marble and one green marble. One marble is chosen from each box. A. What is the probability of choosing a blue marble from each box? Additional Example 2A: Finding the Probability of Independent Events The outcome of each choice does not affect the outcome of the other choices, so the choices are independent. P(blue, blue, blue) = 0.125 Multiply. Slide11:  B. What is the probability of choosing a blue marble, then a green marble, and then a blue marble? Additional Example 2B: Finding the Probability of Independent Events P(blue, green, blue) = 0.125 Multiply. Slide12:  C. What is the probability of choosing at least one blue marble? Additional Example 2C: Finding the Probability of Independent Events 1 – 0.125 = 0.875 Subtract from 1 to find the probability of choosing at least one blue marble. Think: P(at least one blue) + P(not blue, not blue, not blue) = 1. P(not blue, not blue, not blue) = 0.125 Multiply. Slide13:  Two boxes each contain 4 marbles: red, blue, green, and black. One marble is chosen from each box. A. What is the probability of choosing a blue marble from each box? Try This: Example 2A The outcome of each choice does not affect the outcome of the other choices, so the choices are independent. P(blue, blue) = 0.0625 Multiply. Slide14:  Two boxes each contain 4 marbles: red, blue, green, and black. One marble is chosen from each box. B. What is the probability of choosing a blue marble and then a red marble? Try This: Example 2B P(blue, red) = 0.0625 Multiply. Slide15:  Two boxes each contain 4 marbles: red, blue, green, and black. One marble is chosen from each box. C. What is the probability of choosing at least one blue marble? Try This: Example 2C P(not blue, not blue) = 0.5625 Multiply. Think: P(at least one blue) + P(not blue, not blue) = 1. 1 – 0.5625 = 0.4375 Subtract from 1 to find the probability of choosing at least one blue marble. Slide16:  To calculate the probability of two dependent events occurring, do the following: 1. Calculate the probability of the first event. 2. Calculate the probability that the second event would occur if the first event had already occurred. 3. Multiply the probabilities. Slide17:  The letters in the word dependent are placed in a box. A. If two letters are chosen at random, what is the probability that they will both be consonants? Additional Example 3A: Find the Probability of Dependent Events P(first consonant) = Slide18:  Additional Example 3A Continued If the first letter chosen was a consonant, now there would be 5 consonants and a total of 8 letters left in the box. Find the probability that the second letter chosen is a consonant. P(second consonant) = Multiply. Slide19:  B. If two letters are chosen at random, what is the probability that they will both be consonants or both be vowels? Additional Example 3B: Find the Probability of Dependent Events There are two possibilities: 2 consonants or 2 vowels. The probability of 2 consonants was calculated in Example 3A. Now find the probability of getting 2 vowels. Find the probability that the first letter chosen is a vowel. If the first letter chosen was a vowel, there are now only 2 vowels and 8 total letters left in the box. P(first vowel) = Slide20:  Additional Example 3B Continued Find the probability that the second letter chosen is a vowel. The events of both consonants and both vowels are mutually exclusive, so you can add their probabilities. P(second vowel) = Multiply. P(consonant) + P(vowel) Slide21:  The letters in the phrase I Love Math are placed in a box. A. If two letters are chosen at random, what is the probability that they will both be consonants? Try This: Example 3A P(first consonant) = Slide22:  Try This: Example 3A Continued P(second consonant) = Multiply. If the first letter chosen was a consonant, now there would be 4 consonants and a total of 8 letters left in the box. Find the probability that the second letter chosen is a consonant. Slide23:  B. If two letters are chosen at random, what is the probability that they will both be consonants or both be vowels? Try This: Example 3B There are two possibilities: 2 consonants or 2 vowels. The probability of 2 consonants was calculated in Try This 3A. Now find the probability of getting 2 vowels. Find the probability that the first letter chosen is a vowel. If the first letter chosen was a vowel, there are now only 3 vowels and 8 total letters left in the box. P(first vowel) = Slide24:  Try This: Example 3B Continued Find the probability that the second letter chosen is a vowel. The events of both consonants and both vowels are mutually exclusive, so you can add their probabilities. P(second vowel) = Multiply. P(consonant) + P(vowel) Slide25:  Lesson Quiz Determine if each event is dependent or independent. 1. drawing a red ball from a bucket and then drawing a green ball without replacing the first 2. spinning a 7 on a spinner three times in a row 3. A bucket contains 5 yellow and 7 red balls. If 2 balls are selected randomly without replacement, what is the probability that they will both be yellow? independent dependent Insert Lesson Title Here

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