Answer:
To find the percentage of women with weights between 135.4 lb and 216 lb, you can use the z-score formula:
\[ Z = \frac{{X - \mu}}{{\sigma}} \]
where:
- \( X \) is the weight limit,
- \( \mu \) is the mean weight,
- \( \sigma \) is the standard deviation.
For the lower limit (135.4 lb):
\[ Z_{\text{lower}} = \frac{{135.4 - 167.9}}{{48.1}} \]
For the upper limit (216 lb):
\[ Z_{\text{upper}} = \frac{{216 - 167.9}}{{48.1}} \]
Once you have the z-scores, you can use a standard normal distribution table or calculator to find the percentage of women within those limits. Subtract the cumulative percentage corresponding to the lower z-score from the cumulative percentage corresponding to the upper z-score.
Calculate these values to find the percentage and let me know if you need further assistance.