Respuesta :
Answer:
a) [tex]P(X>750)=P(\frac{X-\mu}{\sigma}>\frac{750-\mu}{\sigma})=P(Z<\frac{750-527}{124})=P(Z>1.798)[/tex]
[tex]P(Z>1.798)=1-P(z<1.798)= 1-0.9641 =0.0359 [/tex]
f. 3.59 %
b) [tex]P(X>750)=P(\frac{X-\mu}{\sigma}>\frac{750-\mu}{\sigma})=P(Z<\frac{750-496}{115})=P(Z>2.21)[/tex]
[tex]P(Z>2.21)=1-P(Z<2.21)= 1-0.9864 =0.0136[/tex]
d. 1.36 %
Step-by-step explanation:
Previous concepts
Normal distribution, is a "probability distribution that is symmetric about the mean, showing that data near the mean are more frequent in occurrence than data far from the mean".
The Z-score is "a numerical measurement used in statistics of a value's relationship to the mean (average) of a group of values, measured in terms of standard deviations from the mean".
Part a
Let X the random variable that represent the scores of men of a population, and for this case we know the distribution for X is given by:
[tex]X \sim N(527,124)[/tex]
Where [tex]\mu=65.5[/tex] and [tex]\sigma=2.6[/tex]
We are interested on this probability
[tex]P(X>750)[/tex]
And the best way to solve this problem is using the normal standard distribution and the z score given by:
[tex]z=\frac{x-\mu}{\sigma}[/tex]
If we apply this formula to our probability we got this:
[tex]P(X>750)=P(\frac{X-\mu}{\sigma}>\frac{750-\mu}{\sigma})=P(Z<\frac{750-527}{124})=P(Z>1.798)[/tex]
And we can find this probability using the complement rule and with the normal standard distribution table or excel:
[tex]P(Z>1.798)=1-P(Z<1.798)= 1-0.9641 =0.0359[/tex]
So then the correct answer for this case would be:
f. 3.59 %
Part b
Let X the random variable that represent the scores of women's of a population, and for this case we know the distribution for X is given by:
[tex]X \sim N(496,115)[/tex]
Where [tex]\mu=496[/tex] and [tex]\sigma=115[/tex]
We are interested on this probability
[tex]P(X>750)[/tex]
And the best way to solve this problem is using the normal standard distribution and the z score given by:
[tex]z=\frac{x-\mu}{\sigma}[/tex]
If we apply this formula to our probability we got this:
[tex]P(X>750)=P(\frac{X-\mu}{\sigma}>\frac{750-\mu}{\sigma})=P(Z<\frac{750-496}{115})=P(Z>2.21)[/tex]
And we can find this probability using the complement rule and with the normal standard distribution table or excel:
[tex]P(Z>2.21)=1-P(Z<2.21)= 1-0.9864 =0.0136[/tex]
So then the correct answer for this case would be:
d. 1.36 %
