In: Statistics and Probability
In the book Advanced Managerial Accounting, Robert P.
Magee discusses monitoring cost variances. A cost variance
is the difference between a budgeted cost and an actual cost. Magee
describes the following situation:
Michael Bitner has responsibility for control of two
manufacturing processes. Every week he receives a cost variance
report for each of the two processes, broken down by labor costs,
materials costs, and so on. One of the two processes, which we'll
call process A , involves a stable, easily controlled
production process with a little fluctuation in variances. Process
B involves more random events: the equipment is more
sensitive and prone to breakdown, the raw material prices fluctuate
more, and so on.
"It seems like I'm spending more
of my time with process B than with process A,"
says Michael Bitner. "Yet I know that the probability of an
inefficiency developing and the expected costs of inefficiencies
are the same for the two processes. It's just the magnitude of
random fluctuations that differs between the two, as you can see in
the information below."
"At present, I investigate
variances if they exceed $2,789, regardless of whether it was
process A or B. I suspect that such a policy is
not the most efficient. I should probably set a higher limit for
process B."
The means and standard deviations of the cost variances of
processes A and B, when these processes are in
control, are as follows: (Round your z value to 2 decimal
places and final answers to 4 decimal places.):
Process A | Process B | |
Mean cost variance (in control) | $ 5 | $ 0 |
Standard deviation of cost variance (in control) | $5,105 | $10,342 |
Furthermore, the means and standard deviations of the cost
variances of processes A and B, when these
processes are out of control, are as follows:
Process A | Process B | |
Mean cost variance (out of control) | $7,048 | $ 6,130 |
Standard deviation of cost variance (out of control) | $5,105 | $10,342 |
(a) Recall that the current policy is to investigate a cost variance if it exceeds $2,789 for either process. Assume that cost variances are normally distributed and that both Process A and Process B cost variances are in control. Find the probability that a cost variance for Process A will be investigated. Find the probability that a cost variance for Process B will be investigated. Which in-control process will be investigated more often.
Process A = ___
Process B = ___
_(A or B)__ Process is investigated more often
(b) Assume that cost variances are normally distributed and that both Process A and Process B cost variances are out of control. Find the probability that a cost variance for Process A will be investigated. Find the probability that a cost variance for Process B will be investigated. Which out-of-control process will be investigated more often.
Process A = ___
Process B = ___
_(A or B)__ Process is investigated more often
(c) If both Processes A and B are almost always in control, which process will be investigated more often.
_(A or B)__ Process is investigated more often
(d) Suppose that we wish to reduce the probability that Process B will be investigated (when it is in control) to .2912. What cost variance investigation policy should be used? That is, how large a cost variance should trigger an investigation? Using this new policy, what is the probability that an out-of-control cost variance for Process B will be investigated?
Process A = ___
Process B = ___