Answer:
A) the probability that a randomly selected score is greater than 29 points is 0.1587
B) The percentage of students scores are between 31 and 23 is 95.44%
C) A student who scores 31 is in the 97.72% percentile
Step-by-step explanation:
ACT mathematics score for a particular year are normally distributed with a mean of 27 and a standard deviation of 2 points.
Part A: What is the probability that a randomly selected score is greater than 29 points?
Part B: What percentage of students scores are between 31 and 23?
Part C: A student who scores 31 is in the ______ percentile.
A) Given that:
Mean (m) = 27 and standard deviation (s) = 2 points
Since the ACT mathematics score is normally distributed, we can use z score. To calculate Z score we use the equation:
[tex]Z=\frac{x-m}{s}[/tex]
substituting values:
[tex]Z=\frac{x-m}{s}==\frac{29-27}{2}=1\\Z=1\\[/tex]
P(X > 29) = P(Z > 1) = 1 - P(Z<1)
Using Z tables
P(X > 29) = P(Z > 1) = 1 - P(Z<1) = 1 - 0.8413 = 0.1587 = 15.87%
P(X > 29) = 0.1587
the probability that a randomly selected score is greater than 29 points is 0.1587
B) For score of 31
[tex]Z=\frac{x-m}{s}==\frac{31-27}{2}=2\\Z=2\\[/tex]
For score of 23
[tex]Z=\frac{x-m}{s}==\frac{23-27}{2}=-2\\Z=-2\\[/tex]
P(23 < X < 31) = P(-2 < Z < 2) = P(Z < 2) - P(Z < -2) = 0.9772 - 0.0228 = 0.9544
P(23 < X < 31) = 0.9544 = 95.44%
The percentage of students scores are between 31 and 23 is 95.44%
C) For score of 31
[tex]Z=\frac{x-m}{s}==\frac{31-27}{2}=2\\Z=2\\[/tex]
P(X < 31) = P(Z < 2) = 0.9772 = 97.72%
A student who scores 31 is in the 97.72% percentile
