Objectives: The cases' numbers in statistical analysis sometimes should not be aggregated directly to recalculate the overall ratio as this, according to Simpson's paradox, can lead to reversed results. How to solve the paradox has remained an understudied issue, yet it has come to our attention that meta-analysis method seems to be a potential solution. Methods: To identify an international journal article as an example for analysis, the study used the keywords ＂Simpson's paradox＂ and ＂Simpson paradox＂ to search for journal papers published prior to October 2020 in the following databases: PubMed Medline, Cochrane, Web of Science and C.E.P.S. Results: A total of 69 articles were found, and one discussed the Simpson's paradox with analysis of Rosiglitazone trials. The study by Nissen, published in the New England Journal of Medicine had 36 small trials aggregated into one value. There were few cardiovascular events, so the Peto method was used to calculate the odds ratio (OR) and 95% confidence interval. The result was 1.45 (0.88-2.39). Together with the results of two other larger studies DREAM (OR 1.65, 0.74- 3.68) and ADOPT (1.33, 0.80-2.21), the final meta-analysis result emerged to be 1.43 (1.03-1.98), indicating that Rosiglitazone increased the risk of myocardial infarction by 43%. If all cases are combined and recalculated, an opposite result, OR 0.97 (0.71-1.32), indicated that Rosiglitazone reduced the myocardial infarction risk by 3%. Conclusion: It is not recommended to directly aggregate the cases' numbers of different studies and then recalculate the overall ratio since it may lead to the phenomenon of Simpson's paradox. Meanwhile, meta-analysis software can be used to solve the problem.