The Birth-Death Process | Queuing Theory | Operations Research | Markov Chain | Balance Equation
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- Опубликовано: 5 фев 2025
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The Birth-Death Process explains the characteristics of the inter arrival and service to customers in a continuous time Markov Chain. The balance equation derived for state dependent Queuing system helps to find the Queuing parameters.
Fantastic video! Clear explanation
Glad you liked it
really great teacher you are.Superb sir
Thanks a lot
super explanation sir Thank you very much
Clear explanation sir.. thank you so much
You are welcome
Great video sir
So nice of you
Very useful explanation 😁😁😃😁😁😁😁😁😁🎉
Glad you liked it
Best lecture sir ❤
Thank you very much
Helped a lot. Thanks!
Thanks for your feedback
thanku sir very nicely explained
Most welcome
As the birth and death can occur simultaneously, shouldn't there be a self loop for each of the states?
Yes, however the state remain same as the number of customers is unchanged.
Sir in some othee videos it is different sir
Which video?
This is the theory collected from international edition. Is my explanation clear or not?
@@dr.madhusudhanaraocuddapah9352 please clarify how the difference between expected is less than one. Let expected arrivals are 200 and departures are 250?
Dear friend,
The state of the system is described in the video in terms of arrival and departure of customers. The system can move from a state n to n+1 or n-1 with a single birth or death. If you observe the system over infinite time, the difference between entry into a particular state 'n' to exit from state'n' is one.
It's not the number of customers, it is the difference between the number of times a system enters and leaves a particular state 'n'.
honestly I can't understand
Which part of the content you want to get more explanation?