Hypothesis Testing Definition 1: Let x 1,,x n be an ordered sample with x 1 ≤ ≤ x n and define S n( x) as follows: Now suppose that the sample comes from a population with cumulative distribution function F( x) and define D n as follows: Observation: It can be shown that D n doesn’t depend on F. Since S n(x) depends on the sample chosen, D n is a random variable. Our objective is to use D nas a way of estimating F( x). The distribution of D n can be calculated (see ), but for our purposes now the important aspect of this distribution are the critical values. These can be found in the. If D n,α is the critical value from the table, then P( D n ≤ D n,α) = 1 – α.

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Copy the example data in the following table, and paste it in cell A1 of a new Excel worksheet. For formulas to show results, select them, press F2, and then press Enter. If you need to, you can adjust the column widths to see all the data. Results 121 - 150 of 152 - Svodnye tablitsy v Microsoft Excel 2016. Bill Dzhelen, Majkl Aleksander. Published by Viljams (2017). ISBN 10: / ISBN 13:.

D n can be used to test the hypothesis that a random sample came from a population with a specific distribution function F( x). If then the sample data is a good fit with F( x). Also from the definition of D n given above, it follows that Thus S n( x) ± D n,α provides a confidence interval for F(x) Example 1: Determine whether the data represented in the following frequency table is normally distributed. Figure 1 – Frequency table for Example 1 This means that 8 elements have an x value less than 100, 25 elements have an x value between 101 and 200, etc. We need to find the mean and standard deviation of this data.

Since this is a frequency table, we can’t simply use Excel’s AVERAGE and STDEV functions. Instead we first use the midpoints of each interval and then use an approach similar to that described in as follows: Figure 2 – Calculating mean and standard deviation for data in frequency table Thus, the mean is 481.4 and the standard deviation is 155.2. We can now build the table that allows us to carry out the KS test, namely: Figure 3 – Kolmogorov-Smirnov test for Example 1 Columns A and B contain the data from the original frequency table. Column C contains the corresponding cumulative frequency values and column D simply divides these values by the sample size ( n = 1000) to yield the cumulative distribution function S n( x) Column E uses the mean and standard deviation calculated previously to standardize the values of x from column A.

The formula in cell E4 is =STANDARDIZE(A4,N$5,N$10), where cell N5 contains the mean and cell N10 contains the standard deviation. Column F uses these standardized values to calculate the cumulative distribution function values assuming that the original data is normally distributed. Cell F4 contains the formula =NORMSDIST(E4). Finally column G contains the differences between the values in columns D and F. Cell G4 contains the formula =ABS(F4—D4). If the original data is normally distributed these differences will be zero. Now D n = the largest value in column G, which in our case is 0.0117.

If the data is normally distributed then the critical value D n,α will be larger than D n. From the we see that D n,α = D 1000.05 = 1.36 / SQRT(1000) = 0.043007 Since D n= 0.0117.2), and so once again we can’t reject the null hypothesis that the data is normally distributed. If the value of D n had been.35 in Example 2, then D n =.35 >.338 = D crit, and so we would have rejected the null hypothesis that the data is normally distributed. In this case we would have seen that p-value = KSPROB(.35,15) =.0427, which once again leads us to reject the null hypothesis. Kolmogorov Distribution As referenced above, the Kolmogorov distribution can be useful in conducting the Kolmogorov-Smirnov test. For more information about this distribution, including some useful functions provided by the Real Statistics Resource Pack. Lilliefors Test When the population mean and standard deviation for the Kolmogorov-Smirnov Test is estimated from the sample mean and standard deviation, as was done in Example 1 and 2, then the Kolmogorov-Smirnov Table yields results that are too conservative. More accurate results can be derived from the as described in the.