Super bikes arrive in a 12 lot showroom. Inspections are carried out on six out of...

Every day, patients arrive at the dentist’s office. If the Poisson distribution were applied to this...

Every day, patients arrive at the dentist’s office. If the Poisson distribution were applied to this process: a.) What would be an appropriate random variable? What would be the exponential-distribution counterpart to the random variable? b.)If the random discrete variable is Poisson distributed with λ = 10 patients per hour, and the corresponding exponential distribution has x = minutes until the next arrival, identify the mean of x and determine the following: 1. P(x less than or equal to 6)...

Suppose a brewery has a filling machine that fills 12 ounce bottles of beer . It...

Suppose a brewery has a filling machine that fills 12 ounce bottles of beer . It is known that the amount of beer poured by this filling machine follows a normal distribution with a mean of 12.14 ounces and a standard deviation of 0.06 ounce. a)Find the probability that the bottle contains fewer than 12.00 ounces of beer.Label the sketch of the normal curve with the values from the problem situation. Label the mean and the desired outcome. Use a...

Suppose a brewery has a filling machine that fills 12 ounce bottles of beer. It is...

Suppose a brewery has a filling machine that fills 12 ounce bottles of beer. It is known that the amount of beer poured by this filling machine follows a normal distribution with a mean of 12.14 ounces and a standard deviation of 0.06 ounce. a) Find the probability that the bottle contains fewer than 12.00 ounces of beer. Label the sketch of the normal curve with the values from the problem situation. Label the mean and the desired outcome. Use...

3) Suppose a brewery has a filling machine that fills 12 ounce bottles of beer. It...

3) Suppose a brewery has a filling machine that fills 12 ounce bottles of beer. It is known that the amount of beer poured by this filling machine follows a normal distribution with a mean of 12.14 ounces and a standard deviation of 0.06 ounce. a) Find the probability that the bottle contains fewer than 12.00 ounces of beer. Label the sketch of the normal curve with the values from the problem situation. Label the mean and the desired outcome....

QUESTION 1 A game is played that costs $1. To play, you roll one six-sided die....

QUESTION 1 A game is played that costs $1. To play, you roll one six-sided die. If you roll a six, you win $5. What is the expected value of this game? a. $0 b. $5 c. $0.50 d. $4.50 QUESTION 2 A class room contains 32 students, 11 of whom are female. If one student is randomly chosen from the room, what is the probability the student is female? Round to the nearest thousandth. 1 points    QUESTION 3...

Question 1 ) From historical data, Harry’s Car Wash estimates that dirty cars arrive at the...

Question 1 ) From historical data, Harry’s Car Wash estimates that dirty cars arrive at the rate of 8 cars per hour all day Saturday. With a crew working the wash line, harry figures that car can be cleaned at the rate of one every 6 minutes. One car at a time cleaned in this example of a single-channel waiting line. Assuming Poisson arrival and exponential service times, find the 1- Average number of cars in line. 2- Average time...

1. Out of 180 business executives, 75 read Fortune, 70 read Time, 55 read Money, 45...

1. Out of 180 business executives, 75 read Fortune, 70 read Time, 55 read Money, 45 read exactly two of the three magazines, and 35 read none of the three magazines. How many read all three magazines? (Hint: draw a Venn Diagram, denote the number of elements in each basic region by x, y, z, etc., and find the number of those who read all three magazines from appropriate equation(s)/principle(s).) 2. A student estimates that the probability of getting any...

Jake is a district manager at Walmart, and he has had a lot of trouble keeping...

Jake is a district manager at Walmart, and he has had a lot of trouble keeping employees. He cannot increase pay, cannot increase break-times nor benefits, but Jake is known for being extremely happy. Jake is currently focused on two different “troubled” stores, and has decided to try out using verbal reinforcement to see if it can have a substantial impact on employee satisfaction. For one store, Jake tells his managers to say at least 3 positive things to every...

1. Let S be a set with n elements. By definition, the power set P(S) is...

1. Let S be a set with n elements. By definition, the power set P(S) is the set whose elements are the subsets of S. a. Find the order of P(S). b. Suppose that 0 ≤ r ≤ n. How many elements of P(S) contain exactly r elements? c. Write a clear justification (that you can understand and explain to yourself!) for the following combinatorial proof:   P(S) = n union r = 0 {A ⊆ S | |A| = r...

Q1. Part a) A bag contains 12 marbles. There are 4 marbles that are pink, 5...

Q1. Part a) A bag contains 12 marbles. There are 4 marbles that are pink, 5 are purple, and 3 are blue. A marble is randomly pulled out of the bag. What is the probability that the marble selected is pink or blue? Round to 4 decimals. Part b) A student randomly guesses on a 20 question true/false test. What is the probability that the student guesses correctly on 15 of the questions? Round to 4 decimals. Part c) A...