# Question

On a normal distribution of scores, four participants obtained the following deviation scores: —5, 0, +3, and +1.

(a) Which person obtained the lowest raw score? How do you know?

(b) Which person’s raw score had the lowest frequency? How do you know?

(c) Which person’s raw score had the highest frequency? How do you know?

(d) Which person obtained the highest raw score? How do you know?

(a) Which person obtained the lowest raw score? How do you know?

(b) Which person’s raw score had the lowest frequency? How do you know?

(c) Which person’s raw score had the highest frequency? How do you know?

(d) Which person obtained the highest raw score? How do you know?

## Answer to relevant Questions

In a normal distribution of scores, five participants obtained the following deviation scores: +1, —2, +5, and —10. (a) Which score reflects the highest raw score? (b) Which score reflects the lowest raw score? (c) ...(a) How do you recognize the independent variable of an experiment? (b) How do you recognize the dependent variable? In Question 11: (a) What are the scores at — 1SX and + 1SX from the mean? (b) If N is 1000, how many people do you expect will score between 1.59 and 6.61? (c) How many people do you expect will score below 1.59? Say that you conducted the experiment in question 19 on the entire population. (a) Summarize the relationship that you’d expect to observe. (b) How consistently do you expect participants to behave in each condition? (a) What is the mathematical definition of the variance? (b) Mathematically, how is a sample’s variance related to its standard deviation and vice versa?Post your question

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