Look at the normal curve given below, and find μ. Ο μ=2 Ο μ=11 Ο μ=10 Ο μ=1 Ο μ=13 P __ 137. 10 122 11 12 13

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**Understanding the Normal Distribution**

The image presents a question regarding a normal distribution curve, also known as a bell curve, which is a graphical representation of a normal distribution in statistics. The question asks to identify the mean (μ) of the normal curve shown in the image.

**Graph Explanation:**
- This is a typical bell-shaped curve which is symmetrical about its mean.
- Important points on the graph:
  - The x-axis values range from 10 to 13.
  - The peak of the curve aligns with the value 11 on the x-axis.
  - This peak denotes the mean (μ) of the distribution because, in a normal distribution, the mean, median, and mode are all located at the peak of the curve.

**Question:**
"Look at the normal curve given below, and find μ."

**Options:**
- ☐ μ = 2
- ☐ μ = 11
- ☐ μ = 10
- ☐ μ = 1
- ☐ μ = 13

**Solution:**
From the graph, it is clear that the peak of the normal curve occurs at 11. Therefore, the mean (μ) of the distribution is 11.

**Correct Answer:**
☑ μ = 11

This exercise helps in understanding how to read and interpret a normal distribution curve, a fundamental concept in the study of statistics.
Transcribed Image Text:**Understanding the Normal Distribution** The image presents a question regarding a normal distribution curve, also known as a bell curve, which is a graphical representation of a normal distribution in statistics. The question asks to identify the mean (μ) of the normal curve shown in the image. **Graph Explanation:** - This is a typical bell-shaped curve which is symmetrical about its mean. - Important points on the graph: - The x-axis values range from 10 to 13. - The peak of the curve aligns with the value 11 on the x-axis. - This peak denotes the mean (μ) of the distribution because, in a normal distribution, the mean, median, and mode are all located at the peak of the curve. **Question:** "Look at the normal curve given below, and find μ." **Options:** - ☐ μ = 2 - ☐ μ = 11 - ☐ μ = 10 - ☐ μ = 1 - ☐ μ = 13 **Solution:** From the graph, it is clear that the peak of the normal curve occurs at 11. Therefore, the mean (μ) of the distribution is 11. **Correct Answer:** ☑ μ = 11 This exercise helps in understanding how to read and interpret a normal distribution curve, a fundamental concept in the study of statistics.
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