Question

Lower whisker: 23
Lower quartile: 24.5
Median: 26
Upper quartile: 27.5
Upper whisker: 28

Apologies for the confusion. Here are the values to complete the box plot for the dataset 23, 24, 25, 26, 27, 28:

Lower whisker: 23
Lower quartile: 24
Median: 26
Upper quartile: 27
Upper whisker: 28

These values represent the different parts of the box plot. Let me know if you need further clarification.

I apologize for the confusion. Let me simplify it.

To create a box plot for the dataset 23, 24, 25, 26, 27, 28, you need to find the following values:

1. Min value (Lower whisker): 23
2. Lower quartile (Q1): 24
3. Median: 26
4. Upper quartile (Q3): 27
5. Max value (Upper whisker): 28

These values determine the different parts of the box plot - the whiskers, the box, and the median line. If you have any specific questions or need further explanation, feel free to ask.

Of course, I'll provide a more detailed explanation of how to create a box plot for the dataset 23, 24, 25, 26, 27, 28.

A box plot is a visual representation of a dataset that shows the distribution of values. Here's how you can construct a box plot for the given dataset:

1. Arrange the data in ascending order: 23, 24, 25, 26, 27, 28

2. Find the minimum value (Lower whisker): The minimum value in the dataset is 23. This will be the beginning point on the number line for the box plot.

3. Find the quartiles:
- Lower quartile (Q1): The median of the lower half of the dataset, which falls between 24 and 25 (average of 24 and 25 = 24.5).
- Median: The middle value of the dataset, which is 26.
- Upper quartile (Q3): The median of the upper half of the dataset, which falls between 27 and 28 (average of 27 and 28 = 27.5).

4. Find the maximum value (Upper whisker): The maximum value in the dataset is 28. This will be the ending point on the number line for the box plot.

5. Plot the box plot:
- The box plot consists of a box (from Q1 to Q3) representing the interquartile range (values between Q1 and Q3).
- A line inside the box represents the median.
- Two lines (whiskers) extend from the box to the minimum value (Lower whisker) and maximum value (Upper whisker).

By following these steps and using the values provided above, you can construct a box plot for the dataset 23, 24, 25, 26, 27, 28. Let me know if you need further clarification or assistance.

I see, my apologies for the confusion. In that case, you can represent the box plot values for the dataset 23, 24, 25, 26, 27, and 28 as follows:

1. Lower whisker and Lower quartile: 23, 24
2. Median: 26
3. Upper quartile and Upper whisker: 27, 28

This representation simplifies the box plot to four values while still capturing the key components - the lower whisker, lower quartile, median, upper quartile, and upper whisker. You can use these values to draw a box plot accordingly. Let me know if you need further assistance or have any other questions.

I apologize for the confusion earlier. Since you have only 4 boxes to put numbers in, here's how you can represent the box plot for the dataset 23, 24, 25, 26, 27, 28:

1. Box 1 (Leftmost box):
- Lower Whisker: 23
- Lower Quartile: 24

2. Box 2:
- Median: 26

3. Box 3:
- Upper Quartile: 27

4. Box 4 (Rightmost box):
- Upper Whisker: 28

These values distribute the key components of the box plot (lower whisker, lower quartile, median, upper quartile, and upper whisker) across the 4 boxes you have available. You can now use these values to create your box plot representation. If you have any further questions or need clarification, please let me know.