When converting percentiles into z scores, it is essential to know
A) the value of the mean
B) the value of the standard deviation
C) the value of the raw score
D) the percentage of cases falling between the given percentile and the mean
Correct Answer:
Verified
Q10: Whenever the percentage values in the z
Q11: Whenever the value of the z score
Q12: A percentile rank of 95 indicates that
A)
Q13: Whenever the z score equation is used
Q14: Any percentile which is greater than 50
Q16: All z scores falling to the left
Q17: A z score of +3.00, means that
A)
Q18: If someone were to score at the
Q19: If the mean of a normal distribution
Q20: A z score of -1.50 indicates that
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