The desired percentage of Silicon Dioxide (SiO2) in a certain type of aluminous cement is 5.3. Historically the percentage of Sio2 in the cement is normally distributed with a standard deviation of 0...
The desired percentage of SiO2 in a certain type of aluminous cement is 5.5. To test whether the true average percentage is 5.5 for a particular production facility, 16 independently obtained samples are analyzed. Suppose that the percentage of SiO2 in a sample is normally distributed with ? = 0.32 and that x = 5.21. (Use ? = 0.05.) (a) Does this indicate conclusively that the true average percentage differs from 5.5? State the appropriate null and alternative hypotheses. H0:...
Q1. Q2. Uhom a tion of 0.305. To monitor this Question 13 (1 mark) Attempt 1 The desired percentage of Silicon Dioxide (SiO2) in a certain type of aluminous cement is 5.4. Historically the percentage of SiO2 in the cement is normally distributed w process, periodically an engineer takes a random sample of 16 measurements. A recent sample yielded a sample mean of 5.228 Find the p-value associated with the following hypothesis test. Ho:u=5.4 versus H,: *5.4 Your answer can...
The desired percentage of Sio2 in a certain type of aluminous cement is 5.5. To test whether the true average percentage is 5.5 for a particular production facility, 16 independently obtained samples are analyzed Suppose that the percentage of SiO2 in a sample is normally distributed with ơ=0.32 and that x̅=5.21. (Use α-0.05.) (a) Does this indicate conclusively that the true average percentage differs from 5.5? State the appropriate null and alternative hypotheses Calculate the test statistic and determine the P-value.State the...
The desired percentage of SiO2 in a certain type of aluminous cement is 5.5. To test whether the true average percentage is 5.5 for a particular production facility, 16 independently obtained samples are analyzed. Suppose that the percentage of SiO2 in a sample is normally distributed with σ = 0.32 and that x = 5.22. (Use α = 0.05.) (a) Does this indicate conclusively that the true average percentage differs from 5.5? State the appropriate null and alternative hypotheses. H0:...
The desired percentage of SiO2 in a certain type of aluminous cement is 5.5. To test whether the true average percentage is 5.5 for a particular production facility, 16 independently obtained samples are analyzed. Suppose that the percentage of SiO2 in a sample is normally distributed with σ = 0.30 and that x= 5.23. (Use α-0.05.) (a) Does this indicate conclusively that the true average percentage differs from 5.5? State the appropriate null and alternative hypotheses Hai μ < 5.5...
The target diameter of bolts from a production line is 8mm. Historically the bolt diameters are normally distributed with a standard deviation of 0.05mm. To monitor this process periodically an engineer takes a random sample of 4 measurements. Let µ be the true average bolt diameter. The rejection region is: Find the minimum value of c that yields a test with significance 0.05? zα 1.282 1.645 1.960 2.326 2.576 3.090 α(tail area) 0.1 0.05 0.025 0.01 0.005 0.001 %ile...
Question 13 (1 mark) Attempt 6 The calibration of a scale is to be checked by weighing a 30kg test specimen. A random sample of 16 measurements yielded a sample standard deviation of 0.19 kg and sample mean 29.91 kg Assuming the central limit theorem applies and s o, find the p-value associated with the following hypothesis test. Ho H 30 versus Ha: u 30 Your answer can be rounded to four decimal digit accuracy when entered. p-value- Question 13...
0.34M polnts I Previous Answers DevoreStard 3 E.021 The desired percentage of Sio in a certain type of aluminous cement is 5.5. To test whether the true average percentage is 5.5 for a particular production faclity, 16 independently obtained samples are analyzed, Suppose that the percentage at SiO2 in sample is normally distributed with ơ-0.32 and that x 5.22. (Le -0.05.) My Notes AskYour (a) Does this indicate condusively that the true average percentage differs tram 5.5 State the appropriate...
The target diameter of bolts from a production line is 10mm. Historically the bolt diameters are normally distributed with a standard deviation of 0.15mm. To monitor this process periodically an engineer takes a random sample of 6 measurements. Let µ be the true average bolt diameter. The rejection region is: Find the minimum value of c that yields a test with significance 0.01? zα 1.282 1.645 1.960 2.326 2.576 3.090 α(tail area) 0.1 0.05 0.025 0.01 0.005 0.001 %ile...
Newly purchased automobile tyres of a certain type are supposed to be filled to a pressure of 220 Nt/m. A recent random sample of 38 such Nt/m2 tyres from different cars operated by a large rental company yielded a sample standard deviation of 3.05 Nt/m and a sample mean of 221.04 Assuming the Central Limit Theorem applies and s σ, find the p-value associated with the following hypothesis test. Ho: μ-220 versus Ha: μ+ 220 Your answer can be rounded...