Answer:
a) For this case we can see the distribution in the figure attached is a bell shaped graph and symmetrical around 71
b) [tex] z = \frac{76-71}{6}= 0.833[/tex]
We can see the value of 76 labeled in the second picture attached
c) [tex] P(X>76)[/tex]
And using the z score we have this using the normal standard table or excel:
[tex] P(Z>0.833) = 1-P(Z<0.833) = 0.202[/tex]
d) [tex] n = 185*0.202= 154.16[/tex]
We can say that about 154 and 155 students scored higher than Angelica
Step-by-step explanation:
We know that X represent the random variable scores of knowledge test and is given by:
[tex] X \sim N (\mu = 71, \sigma =6)[/tex]
Part a
For this case we can see the distribution in the figure attached is a bell shaped graph and symmetrical around 71
Part b
For this case the z score is given by:
[tex] z = \frac{X- \mu}{\sigma}[/tex]
And replacing we got:
[tex] z = \frac{76-71}{6}= 0.833[/tex]
We can see the value of 76 labeled in the second picture attached
Part c
We want this probability:
[tex] P(X>76)[/tex]
And using the z score we have this using the normal standard table or excel:
[tex] P(Z>0.833) = 1-P(Z<0.833) = 0.202[/tex]
Part d
For this case we can find the number desired like this:
[tex] n = 185*0.202= 154.16[/tex]
We can say that about 154 and 155 students scored higher than Angelica
