A lumber company is making doors that are 2058.0 millimeters tall. If the doors are too...
A lumber company is making doors that are 2058.0 millimeters tall. If the doors are too long they must be trimmed, and if the doors are too short they cannot be used. A sample of 5 is made, and it is found that they have a mean of 2047.0 2047.0 millimeters with a standard deviation of 20.0 . A level of significance of 0.1 will be used to determine if the doors are either too long or too short. Assume the population distribution is approximately normal. Find the value of the test statistic. Round your answer to three decimal places.
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A lumber company is making doors that are 2058.0 millimeters
tall. If the doors are too...
A lumber company is making doors that are 2058.0 millimeters tall. If the doors are too...
A lumber company is making doors that are 2058.0 millimeters tall. If the doors are too long they must be trimmed, and if the doors are too short they cannot be used. A sample of 11 is made, and it is found that they have a mean of 2043.0 millimeters with a standard deviation of 25.0 A level of significance of 0.05 will be used to determine if the doors are either too long or too short. Assume the population...
A lumber company is making boards that are 2509.0 millimeters tall. If the boards are too...
A lumber company is making boards that are 2509.0 millimeters tall. If the boards are too long they must be trimmed, and if the boards are too short they cannot be used. A sample of 19 is made, and it is found that they have a mean of 2510.8 millimeters with a variance of 256.00. A level of significance of 0.1 will be used to determine if the boards are either too long or too short. Assume the population distribution...
A lumber company is making boards that are 2772.0 millimeters tall. If the boards are too...
A lumber company is making boards that are 2772.0 millimeters tall. If the boards are too long they must be trimmed, and if the boards are too short they cannot be used. A sample of 16 is made, and it is found that they have a mean of 2769.9 millimeters with a standard deviation of 15.0. A level of significance of 0.05 will be used to determine if the boards are either too long or too short. Assume the population...
A lumber company is making boards that are 2697.0 millimeters tall. If the boards are too...
A lumber company is making boards that are 2697.0 millimeters tall. If the boards are too long they must be trimmed, and if the boards are too short they cannot be used. A sample of 25 is made, and it is found that they have a mean of 2697.4 millimeters with a standard deviation of 10.0. A level of significance of 0.1 will be used to determine if the boards are either too long or too short. Assume the population...
A lumber company is making boards that are 2714.0 millimeters tall. If the boards are too...
A lumber company is making boards that are 2714.0 millimeters tall. If the boards are too long they must be trimmed, and if the boards are too short they cannot be used. A sample of 23 is made, and it is found that they have a mean of 2718.4 millimeters with a standard deviation of 10.0. A level of significance of 0.05 will be used to determine if the boards are either too long or too short. Assume the population...
A lumber company is making boards that are 2843.0 millimeters tall. If the boards are too...
A lumber company is making boards that are 2843.0 millimeters tall. If the boards are too long they must be trimmed, and if they are too short they cannot be used. A sample of 29 boards is made, and it is found that they have a mean of 2840.1 millimeters with a variance of 121.00 . Is there evidence at the 0.01 level that the boards are too short and unusable? Assume the population distribution is approximately normal. Step 2...
A lumber company is making boards that are 2951.0 millimeters tall. If the boards are too...
A lumber company is making boards that are 2951.0 millimeters tall. If the boards are too long they must be trimmed, and if they are too short they cannot be used. A sample of 20 boards is made, and it is found that they have a mean of 2947.4 millimeters with a standard deviation of 14.0. Is there evidence at the 0.025 level that the boards are too short and unusable? Assume the population distribution is approximately normal. Step 1...
A carpenter is making doors that are 2058 millimeters tall. If the doors are too long...
A carpenter is making doors that are 2058 millimeters tall. If the doors are too long they must be trimmed, and if they are too short they cannot be used. A sample of 39 doors is taken, and it is found that they have a mean of 2048 millimeters. Assume a population standard deviation of 21. Is there evidence at the 0.01 level that the doors are too short and unusable? Step 2 of 6 : Find the value of...
A carpenter is making doors that are 2058 millimeters tall. If the doors are too long...
A carpenter is making doors that are 2058 millimeters tall. If the doors are too long they must be trimmed, and if they are too short they cannot be used. A sample of 14 doors is made, and it is found that they have a mean of 2044 millimeters with a variance of 81. Is there evidence at the 0.05 level that the doors are either too long or too short? State the null and alternative hypotheses for the above...
A lumber company is making boards that are 2708 2708 millimeters tall. If the boards are...
A lumber company is making boards that are 2708 2708 millimeters tall. If the boards are too long they must be trimmed, and if they are too short they cannot be used. A sample of 48 48 boards is taken, and it is found that they have a mean of 2705.6 2705.6 millimeters. Assume a population standard deviation of 11 11 . Is there evidence at the 0.05 0.05 level that the boards are too short and unusable? State the...
A lumber company is making boards that are 2951.0 millimeters tall. If the boards are too long they must be trimmed, and if they are too short they cannot be used. A sample of 20 boards is made, and it is found that they have a mean of 2947.4 millimeters with a standard deviation of 14.0. Is there evidence at the 0.025 level that the boards are too short and unusable? Assume the population distribution is approximately normal. Step 1...
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