1 Should Antelope Coffee Inc. open a new shop at Montana?* Example7.4 of Newbold and Carlson and Thorne, 6th edition Ka-fu Wong & Nipun Sharma University.

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1 Should Antelope Coffee Inc. open a new shop at Montana?* Example7.4 of Newbold and Carlson and Thorne, 6th edition Ka-fu Wong & Nipun Sharma University of Hong Kong 29 March 2007 Ka-fu Wong & Nipun Sharma University of Hong Kong 29 March 2007 *The ppt is a joint effort: Nipun Sharma discussed the Example with Dr. Ka-fu Wong on 28th March 2007; Ka-fu explained the problem; Nipun drafted the ppt; Ka-fu revised it. Use it at your own risks. Comments, if any, should be sent to

2 The problem at hand:  Antelope Coffee Inc. is considering the possibility of opening a coffee shop in Montana. Previous research shows that a shop will be successful if the per capita annual income > 60,000. The standard deviation is known to be  From a random sample of 36, the mean income was 62,300.  Does this sample provide enough evidence to show that the shop will be successful?

3 Summarize the information and rewrite the question  Population Mean: 60,000  Standard Deviation: 5000  Sample Mean: 62,300  Sample size : 36  Standard deviation of the sample mean = 5000/36 1/2 = 5000/6 =  Sample mean of > Population mean of  Naturally we tend to conclude that the mean is > 60000, but we know that there is a chance we will observe a sample mean larger than or equal to even if the true population mean is or lower.  Is it rare to observe such sample mean when the true population mean is or lower?

4 Is it rare to observe a sample mean that is larger than or equal to when the true population mean is 60000?  Prob(m  | =60000) =Prob((m-60000)/  ( )/833.33) =Prob(Z  2.76) =  Yes! It is rare to observe a sample mean that is larger than or equal to when the true population mean is  That is, it is unlikely that the population mean is

5 Is it rare to observe a sample mean that is larger than or equal to when the true population mean is 59999?  Prob(m  | =59999) =Prob((m-59999)/  ( )/833.33) =Prob(Z  ) =  Yes! It is rare to observe a sample mean that is larger than or equal to when the true population mean is  That is, it is unlikely that the population mean is More unlikely than when the population mean is

6 Is it rare to observe a sample mean that is larger than or equal to when the true population mean is 59998?  Prob(m  | =59998) =Prob((m-59998)/  ( )/833.33) =Prob(Z  ) =  Yes! It is rare to observe a sample mean that is larger than or equal to when the true population mean is  That is, it is unlikely that the population mean is More unlikely than when the population mean is

7 Concluding remarks  That is, based on the sample information, it is very likely that the population mean is larger than  Opening a new coffee shop is very likely to be a success.  What we really want to get is Prob(< | m=62300) or Prob(> | m=62300) = 1- Prob(< | m=62300)  More generally, we are interested in Prob(a < < b | m=62300) Materials in Chapter 8: Confidence Intervals.