Answer:
Step-by-step explanation:
Given that it is assumed that a set of test scores is normally distributed with a mean of 120 and a standard deviation of 10.
If X is set of test scores, then X is N(120,10)
We can convert any x score to z score and vice versa as
[tex]z=\frac{x-100}{10} \\x=10z+100[/tex]
a) P(X<100) =P(Z<0) =0.50=50%
b) P(X<120) = P(Z<2) = [tex]\frac{95}{2} =47.5%[/tex]
c) P(X<140) = P(Z<4) = 1
d) P(X<60) = P(Z<-4)=0
e) P(X<60) = 0
f) P(X>120)=P(Z>2) = [tex]\frac{100-95}{2} =25%[/tex]
Answer:
a. 2.5%
b. 0.5
c. 97.5%
d. 0%
e. 0
f. 50%
Step-by-step explanation:
The 68-95-99.7 rule states, for this case:
See figure attached
a. Percentage of scores less than 100 = 0.15 + 2.35 = 2.5%
b. Relative frequency of scores less than 120 = 0.5
c. Percentage of scores less than 140 = 100 - (0.15 + 2.35) = 97.5%
d. Percentage of scores less than 80 = 0% (note: this value is out of the range -3 standard deviation, +3 standard deviation)
e. Relative frequency of scores less than 60 = 0 (note: this value is out of the range -3 standard deviation, +3 standard deviation)
f. Percentage of scores greater than 120 = 50%
