13 Classify the statement as an example of classical probabi

13. Classify the statement as an example of classical probability, empirical probability, or subjective probability. Explain your reasoning. olleg 77% of Choose the correct answer below obability be ple spa qually B. Subjective probability because the probability results from an estimate C. Subjective probability because each outcome in the sample space is equally likely D. C robability b prob cbservations probability experiment. E Empirical probability because the probability results from an estimate F. Empirical probability because the probability is based on observations obtained from a probability experiment. 4. The prob ype B Fi peopl Stat Compl part through (d (a) Find the probability that all fve have type B The probability that all five have type B blood is (Raund to six decimal places as needed.) Find pe B The probability that none of the five have type B blood is Round to three decimal pl s needed (c) Find the probability that at least one of the five has type B\' blood. The prob type B (Round to three decimal places as needed.) d) Whi Ex ply A. Th obability than or equal to 0.05 qual 0.0 O C. None of these events are unusual part (b 0.0 5. A st rd de ds. O d fr Compu robability of ting a king or jack crnine (b) Compu the probability of randomly Campute the probability of randomly ting a queen or spade P(king (Type an integer or a simplified fraction.) b. P NType an integer or a simplified fraction.) (Type an integer ar a simplified fracticn.) P(queen a spade) Chapter 3 Test A prob of rd prob y of rolling a number with exactly2prime factor The probability (Type an integer or decimal rounded to three decimal places as needed.) 7. A cert people. A 70% of of when the p positi et A b B b (a) Using Bayes\' Theorem, when a person tests positi probability nfected b) Using Bay obability Click the icon to the right to revew Bayes\' Theorem The prob y th Do not round until final ans ded. b) The prob y th ed wh (Round to four decimal places as needed.) Accord Bay probability of nt B ecrem P(A) P(Bl A P(A B P(A). P Bl A) P(A\') P(Bl A. key A, B C, D, E, F, G, H d. E y be y cod The number of possible codes is ding P(A). PKB A P(Al B P(A). P (BI A) PCA) PCB A Bay d P(A B P(BIA) d PCB P(A P (A The probability of event A, given that event B has occurred, is P(Al B) Round to the nearest thousandth as needed. A cert ottery y diffe nt way 6 of der of is not importan selection different way the numbers can be selected (Simplify your answ temprodpearsoncmg.com apVM printm

Solution

13. OPTION F: Empirical probability becasue the probability is based on observations obtained from a probability experiment. [ANSWER, by definition]

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14.

a)

Note that the probability of x successes out of n trials is          
          
P(n, x) = nCx p^x (1 - p)^(n - x)          
          
where          
          
n = number of trials =    5      
p = the probability of a success =    0.08      
x = the number of successes =    5      
          
Thus, the probability is          
          
P (    5   ) =    0.0000032768E-06 = 0.000003 [ANSWER]

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b)

Note that the probability of x successes out of n trials is          
          
P(n, x) = nCx p^x (1 - p)^(n - x)          
          
where          
          
n = number of trials =    5      
p = the probability of a success =    0.08      
x = the number of successes =    0      
          
Thus, the probability is          
          
P (    0   ) =    0.659081523 = 0.659 [ANSWER]

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c)

Thus, P(at least one) = 1 - P(0) =   0.340918477 = 0.341 [ANSWER]

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d)

OPTION A: The event in part a) because its probability is less than or equal to 0.05. [ANSWER]

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