Question

type the correct answer in each box. 1. after the first randomization, $\bar{x}_a$ is 12, $\bar{x}_b$ is 10.95, and ($\bar{x}_a-\bar{x}_b$) is 1.05. 2. after the second randomization, $\bar{x}_a$ is 10.62, $\bar{x}_b$ is 12.42, and ($\bar{x}_a - \bar{x}_b$) is -1.8. 3. after the third randomization, $\bar{x}_a$ is 11.72, $\bar{x}_b$ is 10.62, and ($\bar{x}_a-\bar{x}_b$) is 1.1. part b question what do large differences of the means of each group indicate? select the correct answer. the large differences do not indicate any significant meaning in the given context. the peppers with different weights arent properly distributed between the two groups. there is not enough information to analyze the differences. the peppers with different weights are properly distributed between the two groups. part c question consider two groups of randomly selected peppers, where neither group has all big or all small peppers. a mean - difference of zero indicates the peppers well distributed between the two groups.

Explanation:

Large differences in group means suggest that the data (in this case peppers) are not evenly or properly distributed between the two groups. If the peppers were properly distributed, the means of the two groups would be closer. A mean - difference of zero indicates an even distribution.

Answer:

The peppers with different weights aren't properly distributed between the two groups.
A mean difference of zero indicates the peppers are well - distributed between the two groups.