Answer:
0.346
Step-by-step explanation:
Given:
Number of machines, n = 10
Average run time before servicing, R= 44 minutes
Service time, T= 6 minutes per machine
Required:
Find the probability that a machine will have to wait for service with two operators.
First find the service factor using the formula below:
[tex] X = \frac{T}{R + T} [/tex]
[tex]= \frac{6}{44 + 6}[/tex]
[tex]= \frac{6}{50}[/tex]
[tex]= 0.12[/tex]
X = 0.12
Given number of service operators,S = 2.
Using the finite queuing table, efficiency factor at S=2 & X=0.12 is 0.346.
Therefore, the probability that a machine will have to wait for service with two operators is 0.346
The probability that a machine will have to wait for service with two operators is 0.3455
The given parameters are:
[tex]\mathbf{n = 10}[/tex] --- number of machines
[tex]\mathbf{T = 6}[/tex] --- service time
[tex]\mathbf{R = 44}[/tex] --- average run time
[tex]\mathbf{S = 2}[/tex] --- number of service operator
Start by calculating the service factor (X)
[tex]\mathbf{X = \frac{T}{R + T}}[/tex]
So, we have:
[tex]\mathbf{X = \frac{6}{44 + 6}}[/tex]
[tex]\mathbf{X = \frac{6}{50}}[/tex]
[tex]\mathbf{X = 0.12}[/tex]
Next, we determine the efficiency factor from the finite queuing table, a
The efficiency factor at [tex]\mathbf{X = 0.12}[/tex] and [tex]\mathbf{S = 2}[/tex], is 0.3455
Hence, the probability is 0.3455
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