(d) It turns out that there is some uncertainty about the amount of time it will take to complete activity B, which involves checking the manuscript. It is equally likely that B will take 2 hours and that B will take 8 hours. How will this affect the expected completion time of the project assuming you split task A to tasks A1 and A2 (see part (b))? How does this expected completion time compare to the completion time you calculated in part (b)? (e) Suppose that instead of activity B being the only activity for which the completion time is uncertain, there is uncertainty about the times required to complete activities B, F, and H. Moreover, suppose that the task times for these activities are independent of one another, and are approximately normally distributed with the following means and standard deviations: Task Time (Hours) Activity Description Mean Std Dev B Check the script 5 2.5 F Dress rehearsal 3 1.25 Shoot the scene 2 0.75 What is the probability that the total combined time for activities B,F, and H will not exceed 13 hours? Is this probability smaller, larger, or the same as the probability that the project can be completed in no more than 13 hours? Assume you split task A to tasks A1 and A2 (see part (b)). (Hint: The sum of three normally distributed random variables with means H1,H2, and H3 and standard deviations ou 02, and 03, respectively, is a normal random variable with mean H2 + H2 + H3 and standard deviation (o + 0 + 03)/2) (d) It turns out that there is some uncertainty about the amount of time it will take to complete activity B, which involves checking the manuscript. It is equally likely that B will take 2 hours and that B will take 8 hours. How will this affect the expected completion time of the project assuming you split task A to tasks A1 and A2 (see part (b))? How does this expected completion time compare to the completion time you calculated in part (b)? (e) Suppose that instead of activity B being the only activity for which the completion time is uncertain, there is uncertainty about the times required to complete activities B, F, and H. Moreover, suppose that the task times for these activities are independent of one another, and are approximately normally distributed with the following means and standard deviations: Task Time (Hours) Activity Description Mean Std Dev B Check the script 5 2.5 F Dress rehearsal 3 1.25 Shoot the scene 2 0.75 What is the probability that the total combined time for activities B,F, and H will not exceed 13 hours? Is this probability smaller, larger, or the same as the probability that the project can be completed in no more than 13 hours? Assume you split task A to tasks A1 and A2 (see part (b)). (Hint: The sum of three normally distributed random variables with means H1,H2, and H3 and standard deviations ou 02, and 03, respectively, is a normal random variable with mean H2 + H2 + H3 and standard deviation (o + 0 + 03)/2)