A) A textile manufacturing process finds that on average, five flaws occur per every 270 yards...

A textile manufacturing process finds that on average, five flaws occur per every 90 yards of...

A textile manufacturing process finds that on average, five flaws occur per every 90 yards of material produced. a. What is the probability of exactly one flaws in a 90-yard piece of material? (Do not round intermediate calculations. Round your final answer to 4 decimal places.) b. What is the probability of no more than two flaws in a 90-yard piece of material? (Do not round intermediate calculations. Round your final answer to 4 decimal places.) c. What is the...

A textile manufacturing process finds that on average, three flaws occur per every 180 yards of...

A textile manufacturing process finds that on average, three flaws occur per every 180 yards of material produced. a. What is the probability of exactly one flaws in a 180-yard piece of material? (Round your answer to 4 decimal places.) b. What is the probability of no more than two flaws in a 180-yard piece of material? (Round your answer to 4 decimal places.) c. What is the probability of no flaws in a 72-yard piece of material? (Round your...

The number of flaws per square yard in a type of carpet material varies with mean...

The number of flaws per square yard in a type of carpet material varies with mean 1.3 flaws per square yard and standard deviation 1 flaws per square yard. This population distribution cannot be normal, because a count takes only whole-number values. An inspector studies 167 square yards of the material, records the number of flaws found in each square yard, and calculates x, the mean number of flaws per square yard inspected. Use the central limit theorem to find...

The number of flaws per square yard in a type of carpet material varies with mean...

The number of flaws per square yard in a type of carpet material varies with mean 1.8 flaws per square yard and standard deviation 0.9 flaws per square yard. This population distribution cannot be normal, because a count takes only whole-number values. An inspector studies 168 square yards of the material, records the number of flaws found in each square yard, and calculates x, the mean number of flaws per square yard inspected. Use the central limit theorem to find...

The number of flaws per square yard in a type of carpet material varies with mean...

The number of flaws per square yard in a type of carpet material varies with mean 1.8 flaws per square yard and standard deviation 0.9 flaws per square yard. This population distribution cannot be normal, because a count takes only whole-number values. An inspector studies 178 square yards of the material, records the number of flaws found in each square yard, and calculates x, the mean number of flaws per square yard inspected. Use the central limit theorem to find...

Recent crime reports indicate that 16.1 motor vehicle thefts occur every hour in Canada. Assume that...

Recent crime reports indicate that 16.1 motor vehicle thefts occur every hour in Canada. Assume that the distribution of thefts per hour can be approximated by a Poisson probability distribution. a. Calculate the probability exactly four thefts occur in an hour.(Round the final answer to 5 decimal places.) Probability             b. What is the probability there are no thefts in an hour? (Round the final answer to 5 decimal places.) Probability             c. What is the probability there are at least 20...

A manufacturing process produces 7.2% defective items. What is the probability that in a sample of...

A manufacturing process produces 7.2% defective items. What is the probability that in a sample of 56 items: a. 10% or more will be defective? (Round the z-value to 2 decimal places and the final answer to 4 decimal places.) Probability             b. less than 1% will be defective? (Round the z-value to 2 decimal places and the final answer to 4 decimal places.) Probability             c. more than 10% or less than 1% will be defective? (Round...

A manufacturing process produces 6.2% defective items. What is the probability that in a sample of...

A manufacturing process produces 6.2% defective items. What is the probability that in a sample of 48 items: a. 11% or more will be defective? (Round the z-value to 2 decimal places and the final answer to 4 decimal places.) Probability             b. less than 2% will be defective? (Round the z-value to 2 decimal places and the final answer to 4 decimal places.) Probability             c. more than 11% or less than 2% will be defective? (Round...

5.11. A manufacturing process produces 500 parts per hour. A sample part is selected about every...

5.11. A manufacturing process produces 500 parts per hour. A sample part is selected about every half hour, and after five parts are obtained, the average of these five measurements is plotted on an x control chart. (a) Is this an appropriate sampling scheme if the assignable cause in the process results in an instantaneous upward shift in the mean that is of very short duration? (b) If your answer is no, propose an alternative procedure. If your answer is...

Customers make purchases at a convenience store, on average, every ten and half minutes. It is...

Customers make purchases at a convenience store, on average, every ten and half minutes. It is fair to assume that the time between customer purchases is exponentially distributed. Jack operates the cash register at this store. a-1. What is the rate parameter λ? (Round your answer to 4 decimal places.) a-2. What is the standard deviation of this distribution? (Round your answer to 1 decimal place.) b. Jack wants to take a nine-minute break. He believes that if he goes...