SOLUTION: A distribution has a standard deviation of 12. Find the z-score for each of the following locations in the distribution. a. Above the mean by 3 points. b. Above the mean by

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Question 623802: A distribution has a standard deviation of 12.
Find the z-score for each of the following locations in
the distribution.
a. Above the mean by 3 points.
b. Above the mean by 12 points.
c. Below the mean by 24 points.
d. Below the mean by 18 points.
I understand that z= (data point- mean)/standard deviation.
What I got so far for a. is...
100(because z-scores=100)= x-3/12
Do I solve for x and that is the answer?
Answer by ewatrrr(24785) (Show Source):
You can put this solution on YOUR website!

Hi,
A distribution has a standard deviation of 12.
Find the z-score for each of the following locations in the distribution.
yes: z= (data point- mean)/standard deviation.
a. Above the mean by 3 points. z = 3/12 = 1/4
b. Above the mean by 12 points. z = 12/12 = 1
c. Below the mean by 24 points. z = -24/12 = -2
d. Below the mean by 18 points. z = -18/12 = -3/2
Important to Understand z -values as they relate to the Standard Normal curve:
Below: z = 0, z = � 1, z= �2 , z= �3 are plotted.
Note: z = 0 (x-value = the mean) 50% of the area under the curve is to the left and %50 to the right

For the normal distribution:
one standard deviation from the mean accounts for about 68.2% of the set
two standard deviations from the mean account for about 95.5%
and three standard deviations from the mean account for about 99.7%.