Answer:
12.55 days
Explanation:
Provided information
Number of employees 2
Average production time=1.8 days
Standard deviation=2.7 days
Inter-arrival time= 1 day
Coefficient of variation= 1 day
Standard deviation of inter-arrival time= 1 day
The coefficient of variations
Inter-arrival coefficient of variation
[tex]C_{vi}=\frac {\sigma}{T}[/tex] where [tex]\sigma[/tex] is standard deviation of inter-arrival time, T is inter-arrival time and [tex]C_v[/tex] is coefficient of variation of inter-arrival time
[tex]C_{vi}=\frac {1 day}{1 day}=1[/tex]
Production time coefficient of variation
[tex]C_{vp}=\frac {2.7}{1.8}=1.5[/tex]
Total utilization time
[tex]U=\frac {T}{n*T_i}[/tex] where T is the time of production, n is number of employees, U is utilization, [tex]T_i[/tex] is inter-arrival time
[tex]U=\frac {1.8}{2*1}=0.9[/tex]
Therefore, utilization time by 2 employees is 0.9
Expected average waiting time
[tex]T_e=(\frac {T}{n*T_i})*0.5(C_{vi}^{2}+C_{vp}^{2})*(\frac{U^{\sqrt{2(n+1)}-1}}{1-U})[/tex]
Where [tex]T_e[/tex] is expected average waiting time and the other symbols as already defined
Substituting 1.5 for [tex]C_{vp}[/tex], 1 for [tex]C_{vi}[/tex], 0.9 for U, 2 for n, 1 for [tex]T_i [/tex]and 1.8 for T
[tex]T_e=(\frac {1.8}{2*1})*0.5(1^{2}+1.5^{2})*(\frac{0.9^{\sqrt{2(2+1)}-1}}{1-0.9})[/tex]
[tex]T_e=0.9*1.625*8.583709=12.55367 days[/tex] and rounding off to 2 decimal places we obtain 12.55 days
Therefore, expected duration between order received and beginning of production is approximately 12.55 days
