Answer:
-0.89 is within the central 95% of the distribution, it is neither extreme or unusual.
-2.225 is outside the central 95% of the distribution, it is extreme and unusual
Step-by-step explanation:
We have to:
μ = 95
σ = 40
M = 86.1
The central 95% of the unit's normal distribution is between z = ± 1.96. Therefore if it is within this range it is not extreme, nor unusual; but if it comes out of this range it is extreme and unusual.
Case 1.
n = 16
The formula to use is the following:
z-score = (M - μ) / σS
Where σS = σ / (n ^ (1/2))
Replacing the values:
σS = 40 / (16 ^ (1/2)) = 10
z-score = (86.1 - 95) / 10 = -0.89
Since this z-score -0.89 is within the central 95% of the distribution (± 1.96), it is neither extreme or unusual.
Case 2.
n = 100
Replacing the values:
σS = 40 / (100 ^ (1/2)) = 4
z-score = (86.1 - 95) / 4 = -2.225
Since this z-score -2.225 is outside the central 95% of the distribution (± 1.96), it is extreme and unusual.
