Lazurus Steel Corporation produces iron rods that are supposed to be 36 inches long. The machine...

Lazurus Steel Corporation produces iron rods that are supposed to be 36 inches long. The machine...

Lazurus Steel Corporation produces iron rods that are supposed to be 36 inches long. The machine that makes these rods does not produce each rod exactly 36 inches long. The lengths of the rods are normally distributed and vary slightly. It is known that when the machine is working properly, the mean length of the rods is 36 inches. The standard deviation of the lengths of all rods produced on this machine is always equal to 0.035 inch. The quality...

steel factory produces iron rods that are supposed to be 36 inches long. The machine that...

steel factory produces iron rods that are supposed to be 36 inches long. The machine that makes these rods does not produce each rod exactly 36 inches long. The lengths of these rods vary slightly. It is known that when the machine is working properly, the mean length of the rods is 36 inches. According to design, the standard deviation of the lengths of all rods produced on this machine is always equal to .05 inches. The quality control department...

A machine at Katz Steel Corporation makes 5-inch-long nails. The probability distribution of the lengths of...

A machine at Katz Steel Corporation makes 5-inch-long nails. The probability distribution of the lengths of these nails is approximately normal with a mean of 5 inches and a standard deviation of 0.12 inch. The quality control inspector takes a sample of 36 nails once a week and calculates the mean length of these nails. If the mean of this sample is either less than 4.95 inches or greater than 5.05 inches, the inspector concludes that the machine needs an...

A machine at Katz Steel Corporation makes 5-inch-long nails. The probability distribution of the lengths of...

A machine at Katz Steel Corporation makes 5-inch-long nails. The probability distribution of the lengths of these nails is approximately normal with a mean of 5 inches and a standard deviation of 0.12 inch. The quality control inspector takes a sample of 25 nails once a week and calculates the mean length of these nails. If the mean of this sample is either less than 4.95 inches or greater than 5.05 inches, the inspector concludes that the machine needs an...

A machine at Katz Steel Corporation makes 5-inch-long nails. The probability distribution of the lengths of...

A machine at Katz Steel Corporation makes 5-inch-long nails. The probability distribution of the lengths of these nails is approximately normal with a mean of 5 inches and a standard deviation of 0.10 inch. The quality control inspector takes a sample of 16 nails once a week and calculates the mean length of these nails. If the mean of this sample is either less than 4.94 inches or greater than 5.06 inches, the inspector concludes that the machine needs an...

A rods manufacturer makes rods with a length that is supposed to be 14 inches. A...

A rods manufacturer makes rods with a length that is supposed to be 14 inches. A quality control technician sampled 33 rods and found that the sample mean length was 14.05 inches and the sample standard deviation was 0.27 inches. The technician claims that the mean rod length is more than 14 inches. What type of hypothesis test should be performed? What is the test statistic? What is the number of degrees of freedom? Does sufficient evidence exist at the...

1) A company produces steel rods. The lengths of the steel rods are normally distributed with...

1) A company produces steel rods. The lengths of the steel rods are normally distributed with a mean of 183.4-cm and a standard deviation of 1.3-cm. Find the probability that the length of a randomly selected steel rod is between 179.9-cm and 180.3-cm. P(179.9<x<180.3)=P(179.9<x<180.3)= 2) A manufacturer knows that their items have a normally distributed length, with a mean of 6.3 inches, and standard deviation of 0.6 inches. If 9 items are chosen at random, what is the probability that...

The lengths of steel rods produced by a shearing process are normally distributed. A random sample...

The lengths of steel rods produced by a shearing process are normally distributed. A random sample of 10 rods is selected; the sample mean length is 119.05 inches; and the sample standard deviation is 0.10 inch. The 90% confidence interval for the population mean rod length is __________. Select one: A. 118.99 to 119.11 B. 118.57 to 119.23 C. 119.00 to 119.30 D. 118.89 to 119.51

1) A company produces steel rods. The lengths of the steel rods are normally distributed with...

1) A company produces steel rods. The lengths of the steel rods are normally distributed with a mean of 120.4-cm and a standard deviation of 1.4-cm. Find the probability that the length of a randomly selected steel rod is less than 120.1-cm. P(X < 120.1-cm) = 2) A company produces steel rods. The lengths of the steel rods are normally distributed with a mean of 236.7-cm and a standard deviation of 2.4-cm. For shipment, 10 steel rods are bundled together....

A machine produces metal rods with an average length of 100 cm. A quality control carried...

A machine produces metal rods with an average length of 100 cm. A quality control carried out on one of 80 stems allowed to calculate an average length of 99.5 cm and a standard deviation of 1 cm. We want to establish whether the machine needs to be adjusted: with a significance level of 2%, we do a hypothesis test to determine whether the length of the rods produced by the machine is different from 100 cm. a) State the...