The auto parts department of an automotive dealership sends out a mean of 5.9 special orders...

The auto parts department of an automotive dealership sends out a mean of 4.74.7 special orders...

The auto parts department of an automotive dealership sends out a mean of 4.74.7 special orders daily. What is the probability that, for any day, the number of special orders sent out will be less than 55? Round your answer to four decimal places.

The auto parts department of an automotive dealership sends out a mean of 4.4 special orders...

The auto parts department of an automotive dealership sends out a mean of 4.4 special orders daily. What is the probability that, for any day, the number of special orders sent out will be exactly 4 ? Round your answer to four decimal places.

Past records indicate that the probability of online retail orders that turn out to be fraudulent...

Past records indicate that the probability of online retail orders that turn out to be fraudulent is 0.05. Suppose​ that, on a given​ day, 18 online retail orders are placed. Assume that the number of online retail orders that turn out to be fraudulent is distributed as a binomial random variable. Complete parts​ (a) through​ (d) below. a. What are the mean and standard deviation of the number of online retail orders that turn out to be​ fraudulent? The mean...

Dawson's Repair Service orders parts from an electronic company, which advertises its parts to be no...

Dawson's Repair Service orders parts from an electronic company, which advertises its parts to be no more than 4% defective. What is the probability that Bill Dawson finds 5 or more parts out of a sample of 100 to be defective? (Round the z-value to 2 decimal places and the final answer to 4 decimal places.)

Dawson’s Repair Service orders parts from an electronic company, which advertises its parts to be no...

Dawson’s Repair Service orders parts from an electronic company, which advertises its parts to be no more than 2% defective. What is the probability that Bill Dawson finds three or more parts out of a sample of 50 to be defective? Use Appendix B.1 for the z-values. (Round the z-value to 2 decimal places and the final answer to 4 decimal places.)

Statewide Auto Parts uses a four-week periodic review system to reorder parts for its inventory stock....

Statewide Auto Parts uses a four-week periodic review system to reorder parts for its inventory stock. A one-week lead time is required to fill the order. Demand for one particular part during the five-week replenishment period is normally distributed with a mean of 20 units and a standard deviation of 8 units. Do not round intermediate calculations. At a particular periodic review, 7 units are in inventory. The parts manager places an order for 20 units. What is the probability...

According to a survey of 25,000 ​households, 59 % of the people watching a special event...

According to a survey of 25,000 ​households, 59 % of the people watching a special event on TV enjoyed the commercials more than the event itself. Complete parts a through e below based on a random sample of nine people who watched the special event. a. What is the probability that exactly three people enjoyed the commercials more than the​ event? The probability is nothing. ​(Round to four decimal places as​ needed.) b. What is the probability that less than...

Past records indicate that the probability of online retail orders that turn out to be fraudulent...

Past records indicate that the probability of online retail orders that turn out to be fraudulent is 0.06 Suppose​ that, on a given​ day, 20 online retail orders are placed. Assume that the number of online retail orders that turn out to be fraudulent is distributed as a binomial random variable. Complete parts​ (a) through​ (d) below. a. What are the mean and standard deviation of the number of online retail orders that turn out to be​ fraudulent? The mean...

Past records indicate that the probability of online retail orders that turn out to be fraudulent...

Past records indicate that the probability of online retail orders that turn out to be fraudulent is 0.05 Suppose​ that, on a given​ day, 21 online retail orders are placed. Assume that the number of online retail orders that turn out to be fraudulent is distributed as a binomial random variable. Complete parts​ (a) through​ (d) below. a. What are the mean and standard deviation of the number of online retail orders that turn out to be​ fraudulent? The mean...

Past records indicate that the probability of online retail orders that turn out to be fraudulent...

Past records indicate that the probability of online retail orders that turn out to be fraudulent is 0.07. Suppose​ that, on a given​ day, 18 online retail orders are placed. Assume that the number of online retail orders that turn out to be fraudulent is distributed as a binomial random variable. Complete parts​ (a) through​ (d) below. a. What are the mean and standard deviation of the number of online retail orders that turn out to be​ fraudulent? The mean...