To determine which histogram represents the sample distribution of the given sample proportions, we first need to analyze the sample proportions provided:
- Sample 1: 0.54
- Sample 2: 0.35
- Sample 3: 0.57
- Sample 4: 0.6
- Sample 5: 0.56
- Sample 6: 0.59
- Sample 7: 0.51
- Sample 8: 0.49
- Sample 9: 0.41
- Sample 10: 0.3
Next, we can summarize these proportions:
- The lowest proportion is 0.3 and the highest is 0.6.
- The values are clustered around the mid-range (approximately 0.5) but vary, with a range of values.
A histogram representing these proportions should show:
- A cluster around the center values (such as 0.5)
- A few lower values such as 0.3 and 0.35, and some higher proportions like 0.57 and 0.6.
Given this information, look for a histogram that reflects a moderate distribution with a slight left skew (since we have fewer lower sample proportions).
Since you mentioned that there are images (although I can't see them), choose the histogram that best represents this pattern with notable clustering around the center values (around 0.5) and tailing off toward the lower values.
If you have further specifics about the histogram images or their characteristics, I could refine my guidance.