Answer:
[tex]0.950[/tex]
Step-by-step explanation:
a) Probability that the commute time of Carly is greater than 25 minute when the weather is good
This is writtesn as [tex]P( x > A)[/tex], where A represents a numerical value or a condition.
Substituting the value of A, we get -
[tex]P( x > 25)[/tex]
Here mean [tex]= 20[/tex] and standard deviation [tex]= 2[/tex]
Now we will find the z value for give x value -
As we know -
[tex]z = (x - u) / sigma[/tex]
Substituting the available values , we get -
[tex]A = (25-20) / 2 = 2.5 \\\\[/tex]
Now, probability that the commute time of Carly is greater than 25 minute when the weather is good is equal to probability value as compared to the corresponding z values
Thus, probability that the commute time of Carly is greater than 25 minute when the weather is good [tex]= 0.0062[/tex]
b) Probability that the commute time of Carly is greater than 25 minute when the weather is not good
[tex]z = (x - u) / sigma[/tex]
Substituting the available values , we get -
[tex]A = (25-30) / 4 = -1.25 \\\\[/tex]
Now, probability that the commute time of Carly is greater than 30 minute when the weather is good is equal to probability value as compared to the corresponding z values
Thus, probability that the commute time of Carly is greater than 25 minute when the weather is good [tex]= 0.0062[/tex]
[tex]P(x > 25) \\= P( z > (25-30) / 4) \\= P(z > -1.25) \\= 0.8944[/tex]
Final Probability -
[tex]P( x > 25) \\= P( x > 25, weather good) + P( x > 25 , weather not good) \\= P( x > 25) \\= (0.0062)(0.9) + (0.8944)(0.10) \\= 0.0950[/tex]
