Homework 15: Problem1 Previous Problem List (/webwork2/wardSTAT22 user leonel r

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Homework 15: Problem1 Previous Problem List (/webwork2/wardSTAT22 user leonel r kafando%40GeorgiaSouthern edu&effectiveUser-leonel; r kafando%40GeorgiaSouthern ed Next (webwork2/wardSTAT2231F2 leonel r kafando%40GeorgiaSouthernedu&effectiveUser-leonel; r_kafando%40GeorgiaSoutherner user (1 point) In a survey of 276 people, the following data were obtained relating gender to political orientation: Republican (R) Democrat (D)independent ()Total Male (M) Female (F) Total 100 52 152 40 51 91 13 153 123 276 20 A person is randomly selected. What is the probability that the person is: a) Male? b) Male and a Democrat? c) Male given that the person is a Democrat? d) Republican given that the person is Male? e) Female given that the person is an Independent? f) Are the events Female and Independent independent? Enter yes or no Note: You can earn partial credit on this problem. Preview My Answers Submit Answers You have attempted this problem 0 times. You have unlimited attempts remaining. Email instructor

Explanation / Answer

a) Probability that the person is male

= Number of males / Total number of people

= 153 / 276

= 0.5543

Therefore 0.5543 is the required probability here.

b) Probability that the person is a male and a democrat is computed as:

= Number of males that are democrats / Total number of people

= 40/276

= 0.1449

Therefore 0.1449 is the required probability here.

c) Given that the person is a democrat, probability that the person is male is computed as:

= Total number of males that are democrats / Total number of democrats

= 40 / 91

= 0.4396

Therefore 0.4396 is the required probability here.

d) Given that the person is a male, probability that the person is a republican is computed as:

= Total number of males that are republican / Total number of males

= 100 / 153

= 0.6536

Therefore 0.6536 is the required probability here.

e) Given that the person is independent, probability that person is a female is computed as:

= Probability that a person is a female and independent / Total number of independent persons

= 20/ 33

= 0.6061

Therefore 0.6061 is the required probability here.

f) P( female ) = 123 / 276 = 0.4457

P( independent ) = 33 / 276 = 0.1196

P( female and independent ) = 20 / 276 = 0.0725

Also, P( female ) P( independent ) = 0.4457*0.1196 = 0.0533

Therefore, P( female ) P( independent ) is not equal to P( female and independent ) and therefore the 2 events are not independent.

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