Scores from a statistics exam are reported as deviation scores. Which of the following deviation scores indicates a higher position in the class distribution?

What scores?

The highest value for a positive deviation score.

Scores from a statistics exam are reported as deviation scores. Which of the following deviation scores indicates a higher position in the class distribution?

Answer 1. +8

A population of N = 10 scores has m = 50 and s = 5. What is the population variance?

25

Well, it seems like you're trying to figure out which deviation score indicates a higher position in the class distribution. Let me put it this way: if a deviation score wore a crown, it would definitely prefer a positive value. So, a higher positive deviation score indicates a higher position in the class distribution. It's all about being positively outstanding, you know? Keep that in mind and aim for the positive side!

To determine which deviation score indicates a higher position in the class distribution, we first need to understand what deviation scores are and how they are calculated.

Deviation scores are a way to represent how much a particular data point differs from the mean of a distribution. They are calculated by subtracting the mean of the distribution from each data point. A positive deviation score indicates that the data point is above the mean, while a negative deviation score indicates that the data point is below the mean.

In this case, we are comparing different deviation scores to determine which indicates a higher position in the class distribution. Since a positive deviation score indicates being above the mean, a higher positive deviation score would indicate a greater distance above the mean and thus a higher position in the class distribution. Conversely, a lower (more negative) deviation score would indicate a lower position in the class distribution.

Therefore, the deviation score with a higher positive value indicates a higher position in the class distribution.