Hi, I am having a lot of trouble with Normal Distribution. I do online school and this lesson didn't really explain how to exactly complete the following problems. My teacher said that the answers to the problems below were all incorrect. I would greatly appreciate any help given!

------------------------------------------------------------------------
Consider this scenario for questions 5 - 8.

A standardized test was given to a set of high school juniors and the distribution of the data is bell shaped. The mean score is 800 and the standard deviation is 120.

5. Between which two scores did 95% of the students score?
z = -1.96
x = μ+σ*z
x = 74+8(-1.96)
x = 58.32
z = +1.96
x = μ+σ*z
x = 74+8(1.96)
x = 89.68
95% lie between 58 and 90

6. To qualify for a special summer camp for accelerated students, a student must score within the top 16% of all scores on the test. What score must a student make to qualify for summer camp?
z = +1.96
x = μ+σ*z
x = 74+8(1.96)
x = 89.68
90

7. What score is 1/2 standard deviation above the mean?
z = 1/2
score = 800 + (1/2)120 = 860

8. A student scores 900 on the test. How many more points did the student need to qualify for summer camp?
5/
(800 - 240 , 800+240)
6/
920
7/
800-240
560

Consider the following scenario for questions 9-12.

On the average, members at a local fitness center work out for 90 minutes with a standard deviation of 15 minutes. The distribution is normal.

9. What percentage of the fitness club members work out for 45 minutes or less?
z(45) = (45-90)/15 = -45/15 = -3
P(x <= 45) = P(z <= -3) = (-100,-3)
0.3%

10. What percentage of the fitness club members work out for 2 hours and 15 minutes or more?
z = (135 - 90)/15
1. 3%

11. 68% of the fitness club members work out between which two time intervals?
P(Z < z) = 0.84
0.5+0.34
68% within 1 sd
between 75 and 105 minutes

12. We can say that 99.7% of the fitness club members work out for no more than 135 minutes.
(Mean - 3 × std) and (Mean + 3 × std)
(90 - 3 × 15) and (90 + 3 × 15)
45 – 135

1 answer