Answer:
The probability of a test taker scoring at least 1600 is equal to 0.00164.
Step-by-step explanation:
Approach 1 using Normal Distribution Tables:
As we know that for normal distribution z(x) = (x-Mu)/SD - Equation 1
Given Data:
Average scores (Mean) = Mu = 1010
Standard Deviation of scores = SD = 200
What we have to find out:
The probability of having scores at least 1600 will be equal to probability of having scores 1600 and more i.e.
P(x>=1600)
Moreover as we know that P(x<=1599) + P(x>=1600) = 1
Therefore: P(x>=1600) = 1- P(x<=1599) ; Equation 2
Therefore to calculate P(x<=1599) we have x = 1599
and using equation 1 we have: z(x) = z(1599) = (1599-1010)/200
z(1599) = 0.99836
Then using equation 2 we get:
P(x>=1600) = 1 - 0.99836
P(x>=1600) = 0.00164
Approach 2 using Excel or Google Sheets:
Probability of having scores less than or equal to 1599 will be found out by = 1 - norm.dist(1599,Mu,SD,Commutative)
Probability of having scores less than or equal to 1599 = 1 - norm.dist(135,1010,200,1)
and then again using equation 2 we can find out the probability of scoring at least 1600
PS: Standard normal distribution tables are being attached for reference.
