QUESTION 5 All rms struggle with the question of how to limit the number of defective items produced One rm believes that the number of defectives depends upon three factors the variation in temperature at the time of production, the rate at which items are being produced, and which shift produces the items (the morning shift believes the afternoon shift are less experienced and the afternoon shift believes the morning shift is less capable). The quality control ofcer collected data over thirty (30) shifts on four variables: The number of defective items (per 1000 produced) The variation in the temperature during the shift 1. 2. 3. The rate at which items were produced during the shift (number per hour) 4. Whether or not the shift was the AM or PM shift (AM =1, PM = 0) The resulting regression output is provided in the table below: Summag Output Regression Statistics Multiple R R Squared Adjusted R Squared Standard Error Observations Intercept Temperature Rate AM/PM 0.948 0.899 0.883 6.644 30 (If SS 3 9825.?6 26 1103.54 29 10929.29 Coefcient Std. Errors -28.756 60.147 26.242 9.051 0.0508 0.126 -1.746 0.803 MS F P value 3275.25 7?.16 0.0001 42.44 t P value (Two Tail) -0.448 0.658 2.899 0.008 0.403 0.682 -2.176 0.039 (a) State clearly the model which is to be tested as well as the estimated equation. Interpret all values. (5 marks) (b) Conduct allof the necessary hypothesis tests to determine the usefulness of the model and variables. Write a brief report in NDNIECHNICAL language Summarising the results of these tests and what it means for maintaining quality. (11 marks) (c) To what extent does the model n_ot explain the variation in the production of defectives. What statistic did you use to answer this question? I\"! ......._'l -...\\ Question 5 continued (d) What number of defectives would you expect (per 1000 items produced) for a PM shift in which the temperature variation was half a degree and the rate of production was 500 units per hour. (1 mark) (e) State the assumptions of the model and describe a simple test we could use to test some of the assumptions of the model. (2 marks) (f) Temperature is likely to be affected by the time of day. Suppose the correlation coefficient measuring the degree of relationship between the temperature and shift variables was equal to 0.9. Would this cause any problems for our estimation of the model and what is that called? What would you recommend as a possible action to take