5.2 Using the normal distribution -- rrc math1020  (Page 26/24)

a. Let X = a score on the final exam. X ~ N (63, 5), where μ = 63 and σ = 5

Draw a graph.

Then, find P ( x >65).

P ( x >65) = 0.3446

The probability that any student selected at random scores more than 65 is 0.3446.

z = $\frac{65\text{ – 63}}{5}$ = 0.4

Area to the left is 0.6554.

P ( x >65) = P ( z >0.4) = 1 – 0.6554 = 0.3446

b. Draw a graph.

Then find P ( x <85), and shade the graph.

Using a computer or calculator, find P ( x <85) = 1.

The probability that one student scores less than 85 is approximately one (or 100%).

c. Find the 90 ^th percentile. For each problem or part of a problem, draw a new graph. Draw the x -axis. Shade the area that corresponds to the 90 ^th percentile.

Let k = the 90 ^th percentile. The variable k is located on the x -axis. P ( x < k ) is the area to the left of k . The 90 ^th percentile k separates the exam scores into those that are the same or lower than k and those that are the same or higher. Ninety percent of the test scores are the same or lower than k , and ten percent are the same or higher. The variable k is often called a critical value .

k = 69.4

The 90 ^th percentile is 69.4. This means that 90% of the test scores fall at or below 69.4 and 10% fall at or above.

d. Find the 70 ^th percentile.

Draw a new graph and label it appropriately. k = 65.6

The 70 ^th percentile is 65.6. This means that 70% of the test scores fall at or below 65.5 and 30% fall at or above.