Answer:
a) 0.3125 per hour
b) 2.225 hours
c) 8.9 hours
d) 12.1 hours
e) 80%
Step-by-step explanation:
Given that:
mean time = 3.2 hours, standard deviation (σ) = 2 hours
The mean service rate in jobs per hour (λ) = 2 jobs/ 8 hour = 0.25 job/hour
a) The average number of jobs waiting for service (μ)= 1/ mean time = 1/ 3.2 = 0.3125 per hour
b) The average time a job waits before the welder can begin working on it (L) is given by:
[tex]L=\frac{\lambda^2\sigma^2+(\lambda/\mu)^2}{2(1-\lambda/\mu))} =\frac{0.25^2*0.2^2+(0.25/0.3125)^2}{2(1-0.25/0.3125)}=2.225\ hours[/tex]
c) The average number of hours between when a job is received and when it is completed (Wq) is given as:
[tex]W_q=\frac{L}{\lambda}=2.225/0.25=8.9\ hours[/tex]
d) The average number of hours between when a job is received and when it is completed (W) is given as:
[tex]W=W_q+\frac{1}{\mu} =8.9+\frac{1}{0.3125}=12.1 \ hours[/tex]
e) Percentage of the time is Gubser's welder busy (P) is given as:
[tex]P=\frac{\lambda}{\mu}=0.25/0.3125=0.8=80\%[/tex]
