There are three workstations available having steady-state probabilities of 0.99, 0.95, 0.85 of being available on...

There are three workstations available having steady-state probabilities of 0.99, 0.95, 0.85 of being available on...

There are three workstations available having steady-state probabilities of 0.99, 0.95, 0.85 of being available on demand. What is the probability that at least two of the three will be available at any given time? Hint: calculate the P(all three being available)+P(two of them being available: A&B and not C, A&C and not B, or B&C and not A)

A major traffic problem in the Greater Cincinnati area involves traffic attempting to cross the Ohio...

A major traffic problem in the Greater Cincinnati area involves traffic attempting to cross the Ohio River from Cincinnati to Kentucky using Interstate 75. Let us assume that the probability of no traffic delay in one period, given no traffic delay in the preceding period, is 0.85 and that the probability of finding a traffic delay in one period, given a delay in the preceding period, is 0.65. Traffic is classified as having either a delay or a no-delay state,...

A major traffic problem in the Greater Cincinnati area involves traffic attempting to cross the Ohio...

A major traffic problem in the Greater Cincinnati area involves traffic attempting to cross the Ohio River from Cincinnati to Kentucky using Interstate 75. Let us assume that the probability of no traffic delay in one period, given no traffic delay in the preceding period, is 0.85 and that the probability of finding a traffic delay in one period, given a delay in the preceding period, is 0.65. Traffic is classified as having either a delay or a no-delay state,...

Five players must vote on a trade policy, which is approved if at least three of...

Five players must vote on a trade policy, which is approved if at least three of them vote in favor. It is known that this trade policy is favorable to exactly three of those players (the “winners”) and unfavorable to exactly two of them (the “losers”). At the start, nature randomly picks three players to be winners and two to be losers in a fair way (the probability of being a winner is the same for all players). Then, if...

1. Logs purchased from a certain supplier can have three types of defect. The first two...

1. Logs purchased from a certain supplier can have three types of defect. The first two types are length defects and occur with the following probabilities: P (too much trim) = 0.02 P (too little trim) = 0.01 The third type of defect is excessive sweep and occurs with the following probability: • P (excessive sweep) = 0.05 A. What is the probability of a log having a length defect? B. What is the probability of a log not having...

BINOMIAL PROBABILITIES Big Box Store (BBS) has an annual rate of 4% of all sales being...

BINOMIAL PROBABILITIES Big Box Store (BBS) has an annual rate of 4% of all sales being returned. In a recent sample of thirty randomly selected sales the number of returns was five. BBS is concerned about the event, and your advice is solicited. FOR 4 – 9, OPEN THE EXCEL EXAM TWO FILE. THE SPREADSHEET FOR THIS PROBLEM IS FOUND ON SHEET TWO. COMPLETE AND SAVE YOUR WORK IN EXCEL AND ENTER THE SOLUTIONS BELOW. ((5) (2.5 points) What is...

The probabilities of the following three possibilities to a house is given below: Event Loss Probability...

The probabilities of the following three possibilities to a house is given below: Event Loss Probability No Loss 0 90% Small Loss 5,000 8% Large Loss 50,000 2% a. Calculate the expected value and standard deviation if the owner does not have any pooling b. Illustrate the expected value/standard deviation if two owners of similar properties pool their losses c. What is the expected value and standard deviation if 1,000 owners decided to pool their losses

Part 4: Probability In this part, you will work with probabilities. 1) Consider rolling two four...

Part 4: Probability In this part, you will work with probabilities. 1) Consider rolling two four sided dice. One die is blue and the other is green. (a) State the sample space. (b) Compute the probability of getting two even numbers. (c) Compute the probability of getting an even sum if the blue die rolls a 2. 2) What is the probability of drawing a four or a heart when drawing a single card from a standard deck of cards....

BINOMIAL PROBABILITIES Big Box Store (BBS) has an annual rate of 4% of all sales being...

BINOMIAL PROBABILITIES Big Box Store (BBS) has an annual rate of 4% of all sales being returned. In a recent sample of thirty randomly selected sales the number of returns was five. BBS is concerned about the event, and your advice is solicited. (1) (5 points) How many returns are expected in a random sample of 30 sales? What is the standard deviation for this sample? How would you explain the number of expected returns to BBS and not use...

Problem 16-05 (Algorithmic) A major traffic problem in the Greater Cincinnati area involves traffic attempting to...

Problem 16-05 (Algorithmic) A major traffic problem in the Greater Cincinnati area involves traffic attempting to cross the Ohio River from Cincinnati to Kentucky using Interstate 75. Let us assume that the probability of no traffic delay in one period, given no traffic delay in the preceding period, is 0.9 and that the probability of finding a traffic delay in one period, given a delay in the preceding period, is 0.6. Traffic is classified as having either a delay or...