1) The manufacturing of a ball bearing is normally distributed with a meandiameter of 22 millimeters and a standard deviationof .016 millimeters. To be acceptable the diameter needs to be between 21.97 and 22.03 millimeters.
a. What is the probabilitythat a randomly selected ball bearing will be acceptable ? (Round to tenth of a percent)
b. What does the acceptable rangeof the diameter need to be if you wanted to accept 98% of the ball bearings ? (Round to thousandths)
2) A final exam in Sociologyhas a mean of 72 and a standard deviation of 9.2. If 35 students are randomly selected, find the probability that that the mean of their test scores will be greater than 76. (Round to tenth of a percent)
3) In a preliminary study, the sample standard deviation for the duration of a particular back pain suffered by patients was 18.0 months. How large a random sampleis needed to construct a 90% confidence intervalso that an estimate can be made within 2 months of the actual duration ?
The solution provides step by step method for the calculation of probability using Z score. Formula for the calculation and Interpretations of the results are also included.