The table shows population statistics for the ages of Best Actor and Best Supporting Actor winners at an awards ceremony. The distributions of the ages are approximately bell-shaped. Compare the z-scores for the actors in the following situation. Best Supporting Actor Best Actor H= 44.0 o = 9.1 p= 49.0 o= 15 na particular year, the Best Actor was 65 years old and the Best Supporting Actor was 45 years old. ..... Determine the Z-scores for each. Best Actor: z = Question Viewer Best Supporting Actor: z = Round to two decimal places as needed.) 口口

MATLAB: An Introduction with Applications
6th Edition
ISBN:9781119256830
Author:Amos Gilat
Publisher:Amos Gilat
Chapter1: Starting With Matlab
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The table shows population statistics for the ages of Best Actor and Best Supporting Actor winners at an awards ceremony. The distributions of the ages are approximately bell-shaped. Compare the z-scores for the actors in the following situation.

**Best Actor:**
- Mean (μ) = 44.0
- Standard Deviation (σ) = 9.1

**Best Supporting Actor:**
- Mean (μ) = 49.0
- Standard Deviation (σ) = 15

In a particular year, the Best Actor was 65 years old and the Best Supporting Actor was 45 years old.

**Determine the z-scores for each:**

Best Actor: \( z = \) [  ]

Best Supporting Actor: \( z = \) [  ]

(Round to two decimal places as needed.)

There are no graphs or diagrams present in this image. The text provides background information and a step-by-step explanation for calculating the z-scores for the Best Actor and Best Supporting Actor based on the given means and standard deviations.
Transcribed Image Text:The table shows population statistics for the ages of Best Actor and Best Supporting Actor winners at an awards ceremony. The distributions of the ages are approximately bell-shaped. Compare the z-scores for the actors in the following situation. **Best Actor:** - Mean (μ) = 44.0 - Standard Deviation (σ) = 9.1 **Best Supporting Actor:** - Mean (μ) = 49.0 - Standard Deviation (σ) = 15 In a particular year, the Best Actor was 65 years old and the Best Supporting Actor was 45 years old. **Determine the z-scores for each:** Best Actor: \( z = \) [ ] Best Supporting Actor: \( z = \) [ ] (Round to two decimal places as needed.) There are no graphs or diagrams present in this image. The text provides background information and a step-by-step explanation for calculating the z-scores for the Best Actor and Best Supporting Actor based on the given means and standard deviations.
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