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Download Homework assignments for MCBS Biostatistics I
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Exercise for Weekly GCRC Workshop March 31, 2006 Instructor: Ayumi Shintani, Ph.D., M.P.H. 3.3 Datasets paired1.sav and paired2.sav contain hypothetical data of a randomized clinical trial assessing pre- and post- measures of a continuous outcome variable comparing between two groups (GROUP: coded as 0 and 1). 3.3.a Compute power of Student t-test comparing post measurement (POST) between the two groups using paired1.sav. Answer: 32%. Explanation: SPSS was used to find the SD (mean = 0.99107) and difference of the means (0.21167). PS was then used to calculate the power, which was found to be 32% assuming an alpha of 0.05. Group Statistics post group .00 1.00 N 100 100 Mean -.0248 .1869 Std. Deviation 1.01013 .97201 Std. Error Mean .10101 .09720 Independent Samples Test Levene's Test for Equality of Variances F post Equal variances assumed Equal variances not assumed 1.367 Sig. .244 t-test for Equality of Means t df Sig. (2tailed) Mean Differenc e Std. Error Differenc e 95% Confidence Interval of the Difference Lower Upper -1.510 198 .133 -.21167 .14018 -.48811 .06478 -1.510 197.70 8 .133 -.21167 .14018 -.48812 .06478 3.3.b Compute power of Student t-test comparing change between pre and post measurements between the two groups using paired1.sav. Answer: 18.4%. Explanation: SPSS was used to find the SD (mean = 0.93924) and difference of the means (0.14180). PS was then used to calculate the power, which was found to be 18.4% assuming and alpha of 0.05. Group Statistics diff group .00 1.00 N Mean .0350 .1768 100 100 Std. Deviation .88468 .99380 Std. Error Mean .08847 .09938 Independent Samples Test Levene's Test for Equality of Variances F diff Equal variances assumed Equal variances not assumed .678 Sig. .411 t-test for Equality of Means t df Sig. (2tailed) Mean Difference Std. Error Difference 95% Confidence Interval of the Difference Lower Upper -1.066 198 .288 -.14180 .13305 -.40418 .12058 -1.066 195.381 .288 -.14180 .13305 -.40420 .12060 3.3.c Compute power of Student t-test comparing post measurement (POST) between the two groups using paired2.sav. Answer: 37%. Explanation: SPSS was used to find the SD (mean = 1.001855) and difference of the means (0.23244). PS was then used to calculate the power, which was found to be 37% assuming and alpha of 0.05. Group Statistics post group .00 1.00 N 100 100 Mean .0884 -.1441 Std. Deviation 1.00786 .99585 Std. Error Mean .10079 .09958 Independent Samples Test Levene's Test for Equality of Variances F post Equal variances assumed Equal variances not assumed .014 Sig. .908 t-test for Equality of Means t df Sig. (2tailed) Mean Differenc e Std. Error Differenc e 95% Confidence Interval of the Difference Lower Upper 1.641 198 .102 .23244 .14169 -.04696 .51185 1.641 197.97 2 .102 .23244 .14169 -.04696 .51185 3.3.d Compute power of Student t-test comparing change between pre and post measurements between the two groups using paired2.sav. Answer: 99.98%. Explanation: SPSS was used to find the SD (mean = 0.437545) and difference of the means (0. 34510). PS was then used to calculate the power, which was found to be 99.98% assuming and alpha of 0.05. Group Statistics diff group .00 1.00 N 100 100 Mean .0124 -.3327 Std. Deviation .44961 .42548 Std. Error Mean .04496 .04255 Independent Samples Test Levene's Test for Equality of Variances F diff Equal variances assumed Equal variances not assumed .010 Sig. .922 t-test for Equality of Means t df Sig. (2tailed) Mean Differen ce Std. Error Differen ce 95% Confidence Interval of the Difference Lower Upper 5.575 198 .000 .34510 .06190 .22302 .46717 5.575 197.40 1 .000 .34510 .06190 .22302 .46717 3.3.e Compare your findings in the above 4 power analyses, does the power improve using change in both datasets? If the power improves in one dataset, and does not in the other dataset, what do you think the difference between the 2 datasets in terms of SD and correlation of pre and post that may explain the difference in improvement of the power by using change? Answer: The power improves in the first but not the second data set when using the change in measurements. The main difference that explains the dramatic increase in power using change in dataset2 is that the standard deviation is markedly lower with the change rather than with the POST measurement. As the standard deviation approaches zero, the power will increase. The smaller standard deviation is due to high correlation of data in pair2, while data in pair1 might not highly correlated.
