A dairy processing company claims that the variance of the amount of fat in the whole...

The Foster Insurance company developed standard times for processing claims. When a claim was received at...

The Foster Insurance company developed standard times for processing claims. When a claim was received at the processing center, it was first reviewed and classified as simple or complex. The standard time for processing was: Simple claim 60 minutes Complex claim 3.5 hours Employees were expected to be productive 8 hours per day. Compensation costs were $93 per day per employee. During April, which had 21 working days, the following number of claims were processed: Simple claims 3,100 processed Complex...

A yogurt company claims that their 8-oz low fat yogurt contains an average, at most, 150...

A yogurt company claims that their 8-oz low fat yogurt contains an average, at most, 150 calories per cup. A random sample of 10 cups produced a mean of 152.7 calories with a standard deviation of 7.38 calories. Test the yogurt company's claim with a 2.5% level of significance.

A company claims that the variance of the sugar content of its yogurt is less than...

A company claims that the variance of the sugar content of its yogurt is less than or equal to 25. (The sugar content is measured in milligrams per ounce.) A sample of 20 servings is selected, and the sugar content is measured. The variance of the sample is found to be 36. To test the claim, a) State the null and alternative hypothesis. b) What is the value of the test statistic?

A fitness trainer claims that high intensity power training decreases the body fat percentages of females....

A fitness trainer claims that high intensity power training decreases the body fat percentages of females. The table below shows the body fat percentages of 8 females before and after 10 weeks of high intensity power training. At alpha equals0.05​, is there enough evidence to support the​ trainer's claim? Assume the samples are random and​ dependent, and the population is normally distributed. Complete parts​ (a) through​ (e) below. Body fat percentage​ (before) 24.5 25.4 27.6 28.8 25.3 23.1 25.3 28.6...

A fitness trainer claims that high intensity power training decreases the body fat percentages of females....

A fitness trainer claims that high intensity power training decreases the body fat percentages of females. The table below shows the body fat percentages of eight females before and after 10 weeks of high intensity power training. At alphaαequals=0.10 is there enough evidence to support the​trainer's claim? Assume the samples are random and​ dependent, and the population is normally distributed. Complete parts​ (a) through​ (e) below. Female Body_Fat_%_(before) Body_Fat_%_(after) 1 27.2 27.1 2 23.6 23 3 23.9 23.8 4 23.5...

A employees claims that the population mean of weight of ANC company is NOT 58kg. A...

A employees claims that the population mean of weight of ANC company is NOT 58kg. A random sample of 25 is tested and the sample mean is 62kg. Assume the weight is normally distributed with the population standard deviation 2.8kg. We will do a hypothesis testing at 5% level of significance to test the claim. (a) (10) Set up the null hypothesis and alternative hypothesis. (b) (5) Which test should we use? Upper-tailed test? Lower-tailed test? Two-tailed test? (c) (10)...

A laboratory claims that the mean sodium level, μ , of a healthy adult is 141...

A laboratory claims that the mean sodium level, μ , of a healthy adult is 141 mEq per liter of blood. To test this claim, a random sample of 26 adult patients is evaluated. The mean sodium level for the sample is 144 mEq per liter of blood. It is known that the population standard deviation of adult sodium levels is 11 mEq. Assume that the population is normally distributed. Can we conclude, at the 0.05 level of significance, that...

A leasing firm claims that the mean number of miles driven annually, μ , in its...

A leasing firm claims that the mean number of miles driven annually, μ , in its leased cars is less than 12620 miles. A random sample of 30 cars leased from this firm had a mean of 11399 annual miles driven. It is known that the population standard deviation of the number of miles driven in cars from this firm is 2660 miles. Assume that the population is normally distributed. Is there support for the firm's claim at the 0.05...

A credit card company claims that the mean credit card debt for individuals is greater than...

A credit card company claims that the mean credit card debt for individuals is greater than $ 5 comma 000. You want to test this claim. You find that a random sample of 36 cardholders has a mean credit card balance of $ 5 comma 168 and a standard deviation of $ 575. At alpha equals 0.05?, can you support the? claim? Complete parts? (a) through? (e) below. Assume the population is normally distributed. ?(a) Write the claim mathematically and...

A car company claims that the mean gas mileage for its luxury sedan is at least...

A car company claims that the mean gas mileage for its luxury sedan is at least 24 miles per gallon. A random sample of 7 cars has a mean gas mileage of 23 miles per gallon and a standard deviation of 2.4 miles per gallon. At α=0.05, can you support the company’s claim assuming the population is normally distributed? Yes, since the test statistic is not in the rejection region defined by the critical value, the null is not rejected....