In a recent tennis toumament, women playing singles matches used challenges on 135 calls made by the line judges. Among those challenges, 36 were found to be successful with the ca a. Construct a \( 95 \% \) confidence interval for the percentage of successful challenges. b. Compare the results from part (a) to this \( 95 \% \) confidence interval for the percentage of successful challenges made by the men playing singles matches: \( 22.1 \%< \) p < \( 38.8 \% \). Does it appe more successful than the other?

To construct a \( 95 \% \) confidence interval for the percentage of successful challenges among women, we start by calculating the sample proportion (\( p \)) of successful challenges: \[ p = \frac{36}{135} \approx 0.2667. \] Next, we can calculate the standard error (SE) using the formula: \[ SE = \sqrt{\frac{p(1-p)}{n}} = \sqrt{\frac{0.2667(1-0.2667)}{135}} \approx 0.042. \] For a \( 95 \% \) confidence level, the z-score is approximately 1.96. Thus, the confidence interval can be calculated as follows: \[ CI = p \pm z \cdot SE. \] Calculating this gives: \[ CI = 0.2667 \pm 1.96 \cdot 0.042 \approx (0.184, 0.349). \] So, the final \( 95 \% \) confidence interval for the percentage of successful challenges among women is approximately \( (18.4\% , 34.9\%) \). In comparison, the \( 95 \% \) confidence interval for the percentage of successful challenges made by men is \( (22.1\% , 38.8\%) \). Since the women’s confidence interval \( (18.4\% , 34.9\%) \) does not overlap with men’s interval \( (22.1\% , 38.8\%) \), and the lower limit of the women’s interval is below the lower limit of the men’s interval, it would appear that men are more successful than women in this context based on the intervals provided. Wouldn't it be interesting to see how various external factors, such as playing surface or weather conditions, might influence these success rates? It’s a great topic for further research! Or, if you love delving into sports statistics, exploring how challenges are used in different sports might give you more insights into strategy and decision-making!