The box-and-whisker plot shows the ages of the players on a basketball team. Basketball Roster H 18 20 22 24 26 28 30 32 34 36 38 40 Ages The box-and-whisker plot shows 50% of the players between the ages years older than the youngest player. The whiskers symmetrical. . The oldest player on the team is symmetrical, and the second and third quarters

Database System Concepts
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ISBN:9780078022159
Author:Abraham Silberschatz Professor, Henry F. Korth, S. Sudarshan
Publisher:Abraham Silberschatz Professor, Henry F. Korth, S. Sudarshan
Chapter1: Introduction
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### Basketball Team Ages: Understanding the Box-and-Whisker Plot

The box-and-whisker plot below illustrates the ages of the players on a basketball team.

#### Basketball Roster Ages

![Box-and-Whisker Plot](image url)

- The x-axis represents ages, ranging from 18 to 40.
- The box-and-whisker plot includes the following components:
  - **Minimum (Whisker Start)**: 18 years old
  - **Lower Quartile (Q1) Start of the Box**: Approximately 22 years old
  - **Median (Q2) Line inside the Box**: Approximately 27 years old
  - **Upper Quartile (Q3) End of the Box**: Approximately 32 years old
  - **Maximum (Whisker End)**: 39 years old

### Key Points

- The plot shows that 50% of the players are aged between the lower quartile (Q1) and the upper quartile (Q3). This is represented by the length of the box in the plot.
- The oldest player on the team is 39 years old.
- The first quartile (Q1) is approximately 22 years old.
- The median age (Q2) is approximately 27 years old.
- The third quartile (Q3) is approximately 32 years old.
- The youngest player on the team is probably 18 years old.
- The whiskers extend from the quartiles to the smallest and largest values, providing insights into the variability outside the upper and lower quartiles.

#### Fill in the Blanks Exercise

The box-and-whisker plot shows 50% of the players between the ages **22 and 32**. The oldest player on the team is **39** years older than the youngest player. The whiskers **are not** symmetrical, and the second and third quarters **are not** symmetrical.

### Next Steps

- Continue to the "Next Question" to explore more about box-and-whisker plots.
- If you need any assistance, use the "Ask For Help" option.

#### Submission

- Ready to submit your answers? Click on "Turn It In."

Exploring and understanding box-and-whisker plots can greatly aid in visualizing and interpreting data distributions. Keep practicing to gain better insights into data analysis!

---

**Note:** Replace "image url" with the actual URL if you plan
Transcribed Image Text:### Basketball Team Ages: Understanding the Box-and-Whisker Plot The box-and-whisker plot below illustrates the ages of the players on a basketball team. #### Basketball Roster Ages ![Box-and-Whisker Plot](image url) - The x-axis represents ages, ranging from 18 to 40. - The box-and-whisker plot includes the following components: - **Minimum (Whisker Start)**: 18 years old - **Lower Quartile (Q1) Start of the Box**: Approximately 22 years old - **Median (Q2) Line inside the Box**: Approximately 27 years old - **Upper Quartile (Q3) End of the Box**: Approximately 32 years old - **Maximum (Whisker End)**: 39 years old ### Key Points - The plot shows that 50% of the players are aged between the lower quartile (Q1) and the upper quartile (Q3). This is represented by the length of the box in the plot. - The oldest player on the team is 39 years old. - The first quartile (Q1) is approximately 22 years old. - The median age (Q2) is approximately 27 years old. - The third quartile (Q3) is approximately 32 years old. - The youngest player on the team is probably 18 years old. - The whiskers extend from the quartiles to the smallest and largest values, providing insights into the variability outside the upper and lower quartiles. #### Fill in the Blanks Exercise The box-and-whisker plot shows 50% of the players between the ages **22 and 32**. The oldest player on the team is **39** years older than the youngest player. The whiskers **are not** symmetrical, and the second and third quarters **are not** symmetrical. ### Next Steps - Continue to the "Next Question" to explore more about box-and-whisker plots. - If you need any assistance, use the "Ask For Help" option. #### Submission - Ready to submit your answers? Click on "Turn It In." Exploring and understanding box-and-whisker plots can greatly aid in visualizing and interpreting data distributions. Keep practicing to gain better insights into data analysis! --- **Note:** Replace "image url" with the actual URL if you plan
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