Sample questions
... Assume you have applied for two scholarships, a Merit scholarship (M) and an Athletic scholarship (A) The probability that you receive an Athletic scholarship is 0.18. The probability of receiving both scholarships is 0.11. The probability of getting at least one of the scholarships is 0.3. a. What ...
... Assume you have applied for two scholarships, a Merit scholarship (M) and an Athletic scholarship (A) The probability that you receive an Athletic scholarship is 0.18. The probability of receiving both scholarships is 0.11. The probability of getting at least one of the scholarships is 0.3. a. What ...
7 - DanShuster.com!
... THE GEOMETRIC SETTING 1. Each observation falls into one of just two categories, which for convenience we call “success” and “failure.” 2. The probability of success, call it p, is the same for each observation. 3. The observations are all independent. 4. The variable of interest is the number of tr ...
... THE GEOMETRIC SETTING 1. Each observation falls into one of just two categories, which for convenience we call “success” and “failure.” 2. The probability of success, call it p, is the same for each observation. 3. The observations are all independent. 4. The variable of interest is the number of tr ...
... 22. In a school cafeteria, the menu rotates so that P(hamburger) = P(apple pie) = and P(soup) = 4. The selection of menu items is random so that the appearance of hamburgers, apple pie, and soup are independent events. On any given day, what is the probability that the cafeteria offers hamburger, ap ...
Chapter 3
... – If the characteristic equation x2 – r1x – r2 = 0 of the recurrence relation an = r1an-1 + r2an-2 has 2 distinct roots s1 and s2, then an = us1n + vs2n (where u and v depend on initial conditions) is the explicit formula for the sequence. – If the characteristic equation x2 – r1x – r2 = 0 of the re ...
... – If the characteristic equation x2 – r1x – r2 = 0 of the recurrence relation an = r1an-1 + r2an-2 has 2 distinct roots s1 and s2, then an = us1n + vs2n (where u and v depend on initial conditions) is the explicit formula for the sequence. – If the characteristic equation x2 – r1x – r2 = 0 of the re ...
1. The discrete random variable X has a PMF described by the table
... No, P(A∩B) ≠ 0 (f) Are A and B independent? Explain your answer. No, P(A|B) ≠P(A) (g) Are A and C mutually exclusive? Explain your answer. No, P(A∩C) ≠ 0 (h) Are A and C independent? Explain your answer. Yes, P(A|C) = P(A) 19. A very short quiz has one multiple choice question with five possible cho ...
... No, P(A∩B) ≠ 0 (f) Are A and B independent? Explain your answer. No, P(A|B) ≠P(A) (g) Are A and C mutually exclusive? Explain your answer. No, P(A∩C) ≠ 0 (h) Are A and C independent? Explain your answer. Yes, P(A|C) = P(A) 19. A very short quiz has one multiple choice question with five possible cho ...
REPEATED TRIALS
... ways the two dice can land. There is only way you can get a sum of 12. The total number of ways you can have a success is then 6 × 1 and the total number of ways the two dice can land twice is 36 × 36. So the probability of a success ...
... ways the two dice can land. There is only way you can get a sum of 12. The total number of ways you can have a success is then 6 × 1 and the total number of ways the two dice can land twice is 36 × 36. So the probability of a success ...
1st Semester Final Review Quiz
... What percent of males are shorter that Danny DeVito, who is 5 feet tall? ...
... What percent of males are shorter that Danny DeVito, who is 5 feet tall? ...
Math 1101 Counting Problems Handout #19
... (c) How many different 5-member committees are possible if the committee must consist of 4 or more females? 6. How many distinct arrangements are there of the letters in the word MURDERER? 7. The 25 members of the ’I HATE MATH’ club are planning an end of quarter party. (a) How many different 4-member ...
... (c) How many different 5-member committees are possible if the committee must consist of 4 or more females? 6. How many distinct arrangements are there of the letters in the word MURDERER? 7. The 25 members of the ’I HATE MATH’ club are planning an end of quarter party. (a) How many different 4-member ...
Stats 4.1
... A industrial psychologist administered a personality inventory test for passiveaggressive traits to 150 employees. Each individual was given a score from 1 to 5, where 1 is extremely passive and 5 is extremely aggressive. A score of 3 indicated neither trait. The results are shown in the give ...
... A industrial psychologist administered a personality inventory test for passiveaggressive traits to 150 employees. Each individual was given a score from 1 to 5, where 1 is extremely passive and 5 is extremely aggressive. A score of 3 indicated neither trait. The results are shown in the give ...
Concepts in Probability and Statistics (8/26/13) Course Outline
... • Pr(year that polar ice cap melts ≤ 2020) • Pr(a new email is spam) • Pr(a person is at risk for a disease) There are two main paradigms in statistics: • Frequentist: probabilities are long run frequencies – flip a coin a million times to determine if it’s fair • Bayesian: probabilities quantify ou ...
... • Pr(year that polar ice cap melts ≤ 2020) • Pr(a new email is spam) • Pr(a person is at risk for a disease) There are two main paradigms in statistics: • Frequentist: probabilities are long run frequencies – flip a coin a million times to determine if it’s fair • Bayesian: probabilities quantify ou ...
+ P(B)
... Journal subscribers, what is the chance that they also subscribe to the Beacon News? If independent, the P(B|A) = P(B). Is P(B|A) = P(B)? Know that P(B) = 0.50. Just calculated that P(B|A) = 0.3846. 0.50 ≠ 0.3846, so P(B|A) ≠ P(B). B is not independent of A. A and B are said to be dependen ...
... Journal subscribers, what is the chance that they also subscribe to the Beacon News? If independent, the P(B|A) = P(B). Is P(B|A) = P(B)? Know that P(B) = 0.50. Just calculated that P(B|A) = 0.3846. 0.50 ≠ 0.3846, so P(B|A) ≠ P(B). B is not independent of A. A and B are said to be dependen ...
Probability interpretations
The word probability has been used in a variety of ways since it was first applied to the mathematical study of games of chance. Does probability measure the real, physical tendency of something to occur or is it a measure of how strongly one believes it will occur, or does it draw on both these elements? In answering such questions, mathematicians interpret the probability values of probability theory.There are two broad categories of probability interpretations which can be called ""physical"" and ""evidential"" probabilities. Physical probabilities, which are also called objective or frequency probabilities, are associated with random physical systems such as roulette wheels, rolling dice and radioactive atoms. In such systems, a given type of event (such as the dice yielding a six) tends to occur at a persistent rate, or ""relative frequency"", in a long run of trials. Physical probabilities either explain, or are invoked to explain, these stable frequencies. Thus talking about physical probability makes sense only when dealing with well defined random experiments. The two main kinds of theory of physical probability are frequentist accounts (such as those of Venn, Reichenbach and von Mises) and propensity accounts (such as those of Popper, Miller, Giere and Fetzer).Evidential probability, also called Bayesian probability (or subjectivist probability), can be assigned to any statement whatsoever, even when no random process is involved, as a way to represent its subjective plausibility, or the degree to which the statement is supported by the available evidence. On most accounts, evidential probabilities are considered to be degrees of belief, defined in terms of dispositions to gamble at certain odds. The four main evidential interpretations are the classical (e.g. Laplace's) interpretation, the subjective interpretation (de Finetti and Savage), the epistemic or inductive interpretation (Ramsey, Cox) and the logical interpretation (Keynes and Carnap).Some interpretations of probability are associated with approaches to statistical inference, including theories of estimation and hypothesis testing. The physical interpretation, for example, is taken by followers of ""frequentist"" statistical methods, such as R. A. Fisher, Jerzy Neyman and Egon Pearson. Statisticians of the opposing Bayesian school typically accept the existence and importance of physical probabilities, but also consider the calculation of evidential probabilities to be both valid and necessary in statistics. This article, however, focuses on the interpretations of probability rather than theories of statistical inference.The terminology of this topic is rather confusing, in part because probabilities are studied within a variety of academic fields. The word ""frequentist"" is especially tricky. To philosophers it refers to a particular theory of physical probability, one that has more or less been abandoned. To scientists, on the other hand, ""frequentist probability"" is just another name for physical (or objective) probability. Those who promote Bayesian inference view ""frequentist statistics"" as an approach to statistical inference that recognises only physical probabilities. Also the word ""objective"", as applied to probability, sometimes means exactly what ""physical"" means here, but is also used of evidential probabilities that are fixed by rational constraints, such as logical and epistemic probabilities.It is unanimously agreed that statistics depends somehow on probability. But, as to what probability is and how it is connected with statistics, there has seldom been such complete disagreement and breakdown of communication since the Tower of Babel. Doubtless, much of the disagreement is merely terminological and would disappear under sufficiently sharp analysis.