Math 141 Exam 3 Review with Key 1. P(E)=0.5, P(F)=0.6 P(E F)=0.9 Find C C C a) P( E F) ) b) P( E F ) c) P( E F ) 2. A fair coin is tossed times and the sequence of heads and tails is recorded. Find a) P(HHTHTTH) b) P(at least one H) c) P(at most one H) d) P(at least 2 H's) e) P(at least 6 H's) f) P(at most 5 H's) 3. In a 3- child family, a girl is as likely as a boy at each birth. The children are born at separate times. a)what is the probability that the first two are boys and the youngest is a girl? b) What is the probability of getting two boys and one girl? c) What is the probability of getting at least two boys? 4. An urn contains 5 red, 4 blue and 3 yellow balls. Two are chosen at random. What is the probability of drawing a) at least one red? b) at least one blue? c) at least one red or at least one blue? d) two balls of the same color? e) two balls of different colors? 5. Ten friends sign up for a course and each is assigned to one of 15 different sections. What is the probability that at least 2 of them are assigned to the same section? This is like the birthday problem. 6. Each dorm room at a certain campus holds 4 people. Four friends are each assigned to one of the 20 dorm rooms. a) What is the probability that at least 2 will get the same dorm room? b) What is the probability they will all get the same room?. A student taking a 12 question true-false test is told that exactly 4 are true. If he guesses and answers exactly 4 questions true what is the probability: a) he will guess the right 4? b) he will guess exactly three of the right 4? c) he will guess 3 or 4 of the right 4? 8. A student is given 50 questions to study. His test will consist of 10 of the questions. If he knows 38 of them and does not know 12 of them, what is the probability the test will contain a) exactly 9 he knows? b) at least 9 he knows? c) at least 1 he knows?
9. a) Seven boys and 4 girls stand in a line. What is the probability that no two girls are next to each other? b) Seven blue balls and 4 white balls are placed in a line. What is the probability that no two white balls are next to each other? 10. A person tosses a fair coin 4 times. Find the probability that the first toss was heads given there were exactly two heads. b) Are the events the first toss is heads and there are exactly two heads independent? c) Repeat a) and b) with the coin tossed 5 times. 11. P(A)=0., P(B)=0.6 and P(A C B)=0.2 Are A and B independent. Show why or why not. 12. In a town in the 1920 s, 0% of the voters were farmers, 20% were merchants and 10% had some other occupation. Assume no one had two occupations. In the mayoral election, 60% of the farmers voted for the democrat, 30% of the merchants voted for the democrat and 0% of the others voted for the democrat. The rest voted republican. Find the probability that a) a farmer voted democrat. b) someone who voted democrat was a farmer. c) someone voted democrat and was a farmer.
13. A lab test tests for use of a certain drug. It is estimated that 8% of people taking the test uses the drug. The test is positive in 4% of those who do not use the drug and is positive in 93% of those who do. a) Find the probability that someone who gets a positive test actually uses the drug. b) Find the probability someone who gets two positive consecutive tests uses the drug. 14. Some mice were tested to see if listening to music improved their intelligence. Seventy five mice listened to classical music daily and 5 listened to no music. Eighty of the mice were able to finish a certain maze in less than 5 minutes. Sixty of these had listened to classical music. Are listening to classical music and finishing the maze in less than 5 minutes independent? Use probabilities to support your answer. As a note of interest, some other mice listened to heavy metal music daily. They were bumping into walls and couldn t finish the maze in 10 minutes. 15. In a voter survey 1500 respondents were asked if they had an immediate family member in the military and if they were voting for the democrat or the republican. The results were that 500 had a family member in the military and 140 of these were voting for the democrat. Overall 660 voted for the democrat and 840 voted republican. Let M be the set of all those who had a family member in the military, R those who voted republican, and D those who voted democrat. Find the probability that a) someone who had a military relative voted republican. b) someone who voted democrat does not have a military relative. c) a voter has no military relative and is voting republican. d) Are M and R independent? e) Are M and D independent? 16. Three workers work independently to solve a problem. The events that each solves it are independent. The probabilities that worker 1, 2 or 3 will solve it are 0., 0.5, and 0.8 respectively. Find the probability that a) at least one will solve it. b) at least one will not solve it. c) exactly one will solve it.
1. A coin is weighted so that P(H)=1/3. The coin is tossed 5 times. a) Find P(HHHTT). b) Find P(exactly 3 heads). c) If X is the number of heads in 5 tosses, find E(X) and the standard deviation of X. 18. Stocks I, II, and III have returns of 10%, 12% and 15% respectively. A person invests 20% of his money in stock I, 30% in stock II and 50% in stock III. Find his expected return. 19. A person plays the following game. He chooses a ball from a box containing 1 black and 9 white balls. If he draws the black ball he selects one of 3 doors. Behind one of the doors is a $21000 car. Behind each of the other two doors there is a $60 goat. He gets to keep what is behind the door. If he selects a white ball, he does not replace it but chooses another ball. If he gets the black ball, he selects one of 4 doors. Behind one of the doors is a $16000 car. Behind each of the others is a $60 goat. If he selects a white ball again he loses. Find his expected net winnings. If he pays $1120 to play the game, what is his expected net gain/loss? 20. Find the mean, median, mode, standard deviation and variance for: a) the quiz scores which are: quiz score 0 1 2 3 4 5 # students 16 21 14 15 24 10 b) the price per share of a stock: stock price in $ 20 21 22 23 24 # days 5 3 14 4 4 c) the price per share of a stock: stock price in $ 20 21 22 23 24 # days 10 6 1 3 10 Why is the standard deviation in c higher than in b? 21. A student has 36 credit hours and a gpa of 3.2. He takes four 3-credit courses and receives two A s, one B and one C. Find his new gpa. 22. Classify each random variable as finite, infinite discrete or continuous. I A person is given 30 minutes to complete a test. a) X is the time he spends taking the test. b) Y is the number of times a person takes the test until he passes. c) N is the number of correct answers a person gets. II A die is tossed. a) X is the distance the die travels upward. b)y is the top number on the die. c) N is the number of times the die is tossed until a 6 appears.
23. Three balls are drawn all at once without replacement from a box containing 5 red and blue balls. X is the number of red balls drawn. a) Write the probability distribution of X. b) Write the probability distribution of X given there is at least one red ball. 24.a) If the odds you will win a raffle are 5:20, what is the probability you will win? b) If the chance of rain is 30%, what are the odds it will not rain? 25. Which of the following are binomial? If binomial give n and p. If not binomial say why not. a) A box contains 5 red, 6 blue and 4 yellow balls. A person draws one ball and notes whether or not the ball is red. Then the ball is returned to the box. This is repeated 10 times. X is the number of red balls drawn. b) A person draws 1 card from a deck and notes the suit. The card is not returned to the deck. This is repeated 15 times. X is the number of hearts. c) A certain gene occurs in % of the general population. Seven people from one family and 6 people from another family are selected. X is the number of people who have the gene. d) Same as c) but 50 people are selected at random. 26. Heights of males have been found to be normally distributed with mean 0 inches and standard deviation 3 inches. a) Find a height which 30% of males are below. b) Find a height which 80% are above. 2. X is a normal random variable with mean 50 and unknown standard deviation. Given that P(X<5)=.62, use symmetry to find a) P(50<X<5) b) P(X>25)
28. It is estimated that 15% of cars on a certain highway are going over the speed limit. If 500 cars are observed and X is the number over the speed limit, find a) E(X) and (X). (The st dev is very close to a whole number and you can use this or round to 4 decimal places, it won t make much difference.) b) Find P(60 < X < 90) c) Find the normal approximation to the probability in b. 29. If only % of cars are speeding and only 20 cars are observed, a) Find P(1 X 3) b) Find the normal approximation to the probability in a. Why is this estimate not as good as the estimate in problem 16? 30. Lengths of babies at a certain hospital are normally distributed with mean of 20 inches and a standard deviation of 2.6 inches. a) Find the probability that a randomly selected baby is less than 18 inches rounded to two decimal places. bfifty babies are selected at random and X is the number which are less than 18 inches long. Find the expected value and standard deviation of X. c) Find the probability that X is at least 8 and at most 14. d) Find the normal approximation to the probability in c. You must use the answer to b. Key: 1. a) 0.2 b) 0.3 c) 0.1 1 2. a) 2 1 8 b) 1 c) 2 2 8 8 d) 1 e) 2 2 8 f) 1 2 3. a) 1/8 b) 3/8 c) ½ 4. a) C(,2) C(8,2) 1 = 15/22 b) 1 = 19/33 C (12,2) C (12,2) c) 21/22 d) 19/66 e) 1-(19/66)=4/66
P(15,10) 5. 1 10 15 P(20,4) 6. a) 1 b) 4 20 20 20 4 1 8000. a) 1/C(12,4) = 1/495 b) 32/495 c) 1/15 C(38,9) x12 C(38,9)12 C(38,10) C(12,10) 8. a) b) c) 1 C(50,10) C(50,10) C (50,10)! P(8,4) P(8,4) C(8,4) 9. a) b) 11! P (11,4) 33 C(11,4) 33 10.a) 0.5 b) yes, independent c) 0.4 not independent 11. no P( A B) =0.4 is not equal to P(A)P(B). 12. a) 0.6 b) 42/55 c) 0.42 13. a) 0.6691 b) 0.992 14. not independent 15. a) 0.2 b) 0.89 c) 0.32 d) not independent P(R)=0.56, P(R M)=0.2 e) not independent If D and M were independent, R and M would be also. 16.a) 0.9 b) 0.2 c) 0.22 1. a) 0.01646 b) 0.1646 c) E(X)=5/3 st dev = 1.0541 18. 13.1% 19. His expected winnings are $1108.50 and his expected net gain is -$11.50 ( or a loss of 11.50 per game on average.) 20. a) mean=2.4 median=2 mode=4 stdev = 1.6432 variance=2. b) mean=21.966 median=22 mode=22 stdev=1.1968 variance=1.4323 c) mean=21.9 median=21 modes are 20 and 24 stdev=1.195 variance=2.956 The standard deviation in c) is higher because the prices have higher probability of being farther from the mean. 21. 3.2125 22. Ia) continuous b) infinite discrete c) finite
IIa) continuous b) finite c) infinite discrete 23. a) x 0 1 2 3 P(X=x) /44 21/44 14/44 2/44 b) x 1 2 3 P(X A) 21/3 14/3 2/3 24. a) 1/5 b) :3 25. a) binomial n=10 p=1/3 b) not binomial Trials are not independent or identical. c) not binomial Trials are not independent or identical. d) binomial n=50 p=0.0 26. a) 68.4268 inches b) 6.451 inches 2. a) 0.12 b) 0.62 28. a) E(X)= 5 st.dev. =.9843 b) 0.9481 c) 0.948 29. a) 0.186 b) 0.520 Not as good because np<5. 30. a) 0.22 b) E(X)=11 stdev=2.9292 c) 0.694 d) 0.69