You were asked to find the p-value associated with the test statistic, given the following information:
A medical researcher wants to compare the pulse rates of smokers and non-smokers. He believes that the pulse rate for smokers and non-smokers is different and wants to test this claim at the 0.01 level of significance. A sample of 74 smokers has a mean pulse rate of 87, and a sample of 76 non-smokers has a mean pulse rate of 8484. The population standard deviation of the pulse rates is known to be 88 for smokers and 77 for non-smokers.
In the previous step, you determined that to find the p-value, you need the area under the normal curve to the left of z= −2.44 and to the right of z= 2.44. Using the normal distribution table or technology, enter the p-value for this hypothesis test below.
You were asked to find the p-value associated with the test statistic, given the following information:...
A medical researcher wants to compare the pulse rates of smokers and non-smokers. He believes that the pulse rate for smokers and non-smokers is different and wants to test this claim at the 0.01 level of significance. A sample of 74 smokers has a mean pulse rate of 87, and a sample of 76 non-smokers has a mean pulse rate of 84. The population standard deviation of the pulse rates is known to be 8 for smokers and 7 for...
Step 2 of 4: Compute the value of the test statistic. Round your answer to two decimal places. Step 3 of 4: Determine the decision rule for rejecting the null hypothesis H0. Round the numerical portion of your answer to three decimal places. Step 4 of 4: Make the decision for the hypothesis test. A medical researcher wants to compare the pulse rates of smokers and non-smokers. He believes that the pulse rate for smokers and non-smokers is different and...
A medical researcher wants to compare the pulse rates of smokers and non-smokers. He believes that the pulse rate for smokers and non-smokers is different and wants to test this claim at the 0.05 level of significance. A sample of 72 smokers has a mean pulse rate of 81, and a sample of 59 non-smokers has a mean pulse rate of 79. The population standard deviation of the pulse rates is known to be 99 for smokers and 88 for...
Question 10 of 24 Step 3 of 5 02:04:11 A medical researcher wants to compare the pulse rates of smokers and non-smokers. He believes that the pulse rate for smokers and non-smokers is different and wants to test this claim at the 0.01 level of significance. A sample of 72 smokers has a mean pulse rate of 82, and a sample of 78 non-smokers has a mean pulse rate of 79. The population standard deviation of the pulse rates is...
A medical researcher wants to compare the pulse rates of smokers and non-smokers. He believes that the pulse rate for smokers and non-smokers is different and wants to test this claim at the 0.05 level of significance. A sample of 68 smokers has a mean pulse rate of 87, and a sample of 64 non-smokers has a mean pulse rate of 83. The population standard deviation of the pulse rates is known to be 7 for smokers and 8 for...
02:05:10 A medical researcher wants to compare the pulse rates of smokers and non-smokers. He believes that the pulse rate for smokers and non-smokers is different and wants to test this claim at the 0.01 level of significance. A sample of 72 smokers has a mean pulse rate of 82, and a sample of 78 non-smokers has a mean pulse rate of 79. The population standard deviation of the pulse rates is known to be 9 for smokers and 10...
3. A medical researcher wishes to see whether the pulse rates of smokers are higher than the pulse rate for non-smokers. Random samples of 65 smokers and 74 non-smokers are selected, and the pulse rate results are shown below. Test the researchers claim at a 0.01. Assume the d.f. = 137 Nonsmokers Smokers Sample Mean Sample Standard Deviation Sample Size 90 88 6.3 74 5.2 65
UZ:03:09 Amedical researcher wants to compare the pulse rates of smokers and non smokers. He believes that the pulse rate for smokers and non-smokers is different and wants to test this claim at the 0.01 level of significance. A sample of 72 smokers has a mean pulse rate of 82, and a sample of 78 non-smokers has a mean pulse rate of 79. The population standard deviation of the pulse rates is known to be 9 for smokers and 10...
Question 10 JACQUELINE PEOPLES of 24 Step 1 of 5 02:07:24 A medical researcher wants to compare the pulse rates of smokers and non-smokers. He believes that the pulse rate for smokers and non-smokers is different and wants to test this claim at the 0.01 level of significance. A sample of 72 smokers has a mean pulse rate of 82, and a sample of 78 non-smokers has a mean pulse rate of 79. The population standard deviation of the pulse...
Question 10 - of 24 Step 4 of 5 02:03:44 A medical researcher wants to compare the pulse rates of smokers and non-smokers. He believes that the pulse rate for smokers and non-smokers is different and wants to test this claim at the 0.01 level of significance. A sample of 72 smokers has a mean pulse rate of 82 and a sample of 78 non-smokers has a mean pulse rate of 79. The population standard deviation of the pulse rates...