Suppose my personal probability for rain tomorrow is 30 %, and my personal probability for snow...

Please answer with method or formula used. A) Puenaa is getting married tomorrow, at an outdoor...

Please answer with method or formula used. A) Puenaa is getting married tomorrow, at an outdoor ceremony in the desert. In recent years, it has rained only 5 days each year. Unfortunately, the weatherman has predicted rain for tomorrow. When it actually rains, the weatherman correctly forecasts rain 90% of the time. When it doesn't rain, he incorrectly forecasts rain 10% of the time. What is the probability that it will rain on the day of Puenaa's wedding? B) A...

Suppose Alana has personal wealth of $10,000 and there is a probability of 0.2 of losing...

Suppose Alana has personal wealth of $10,000 and there is a probability of 0.2 of losing her car worth $6,400 in an accident.   Her utility (of wealth) function is given by  u(w) =  w0.5, where  w  is wealth.      (a) What is Alana's expected wealth, expected utility, and utility of expected wealth? If she can insure "fully", and if this insurance is fair, how much would it cost her? (b) What is the maximum amount Alana would be prepared to pay for full insurance?...

MC0402: Suppose there are two events, A and B. The probability of event A is P(A)...

MC0402: Suppose there are two events, A and B. The probability of event A is P(A) = 0.3. The probability of event B is P(B) = 0.4. The probability of event A and B (both occurring) is P(A and B) = 0. Events A and B are: a. 40% b. 44% c. 56% d. 60% e. None of these a. Complementary events b. The entire sample space c. Independent events d. Mutually exclusive events e. None of these MC0802: Functional...

Suppose that a large corporation offers its employees two health plans: a 70/30 plan with high...

Suppose that a large corporation offers its employees two health plans: a 70/30 plan with high deductible and an 80/20 plan with low deductibles. Every employee has one plan or the other. Of all employees, 75% are production workers and 25% are administrative workers. Of all employees, 35% choose 70/30 plan. Of all production workers, 40% choose the 70/30 plan. A. What is the probability that randomly selected employee will be administrative employee? B. What is the probability that a...

Suppose it is a particularly hot summer day and you want to make some popsicles to...

Suppose it is a particularly hot summer day and you want to make some popsicles to help cool off. You fill a popsicle mold with 0.15kg of juice (suppose it is the same thermal energy as water). The juice starts out at a temperature of 30 °C and the freezer will cool it to -20 °C. a. How much heat must be removed from the popsicles in order to bring them to their final temperature. b. Draw an energy flow...

Conditional Probability Activity 1: CHC Student Survey Suppose a survey of 100 randomly selected CHC students...

Conditional Probability Activity 1: CHC Student Survey Suppose a survey of 100 randomly selected CHC students resulted in a sample of 60 male and 40 female students. Of the males, 2/3 graduated from a high school in Philadelphia, while the remainder had high school diplomas from out-of-the-city. Of the females, 3/4 were from Philadelphia high schools. This information is represented in the following contingency table: Phila. HS Out-of-City Totals Male 40 20 60 Female 30 10 40 Totals 70 30...

Slipshod Plastic Corp. produces both plastic materials and water pollution. Suppose that Slipshod currently produces 30...

Slipshod Plastic Corp. produces both plastic materials and water pollution. Suppose that Slipshod currently produces 30 gallons per minute of polluted water. Company officials estimate that the marginal cost of reducing pollution is: MC(h) = 40 - h, where h is measured in gallons of polluted water per minute. Health officials estimate that the marginal benefits of reducing emissions from Slipshod are: MB(h) = 3h (a) What would be the level of per unit tax on pollution that would yield...

The question assumes the standard formalism with projector-valued measures rather than POVMs. Suppose a measurement has...

The question assumes the standard formalism with projector-valued measures rather than POVMs. Suppose a measurement has two possible outcomes, and the corresponding probabilities are greater than 0 and less than 1. Neither outcome is therefore certain. Then why is it certain that either outcome is obtained (as it seems, if the probabilities add up to 1)? Added after four answers: All the answers provided so far elaborate on the comment by @Vladimir: "It is not a 'quantum mechanical' feature but...

Suppose there's a radioactive material and a 1/2 quantum probability of detecting it by a Geiger...

Suppose there's a radioactive material and a 1/2 quantum probability of detecting it by a Geiger counter. This puts the system in a superposition. Also suppose you are in the same room, and the walls of the room are perfectly decoherence-proof. You observe the Geiger counter and get a definite result. Either it had gone off, or it hadn't. The Copenhagen interpretation tells you the decay or nondecay only became real when it was measured, and the result reached you....

My topic is Apple (Mac Pro) ECON 207 – Fall 2020 Managerial Economics Term Presentation Suppose...

My topic is Apple (Mac Pro) ECON 207 – Fall 2020 Managerial Economics Term Presentation Suppose you are the manager of one of the following products: Smartphone (such as iPhone, Samsung Galaxy, etc) Social networking website (such as Facebook, Instagram, Twitter, etc) Some other product that is familiar to most students Make a presentation analyzing how to sustain and improve your company’s profit. You should consider (Using a smartphone as an example): Market structures: competition from other companies Consumers’ preferences:...