ZuoTi.Pro
Question

Parts arrive at a two-machine system according to an exponential interarrival distribution with mean 20 minutes....

Parts arrive at a two-machine system according to an exponential interarrival distribution with mean 20 minutes. Upon arrival, the parts are sent to Machine 1 and processed. The processing-time distribution is TRIA (4.5, 9.3, 11) minutes. The parts are then processed at Machine 2 with a processing-time distribution as TRIA (16.4, 19.1, 21.8) minutes. The parts from Machine 2 are directed back to Machine 1 to be processed a second time (same processing-time distribution ). The completed parts then exit the system. Run the simulation for a single replication of 20,000 minutes to observe the average number in the machine queues and the average part cycle time.  

NOTE:

a: You must add the content of each module.

b: When you run it, you should give an image of the first page of the report you see.

math   Advanced-Math   
0 0
Add a comment Improve this question Transcribed image text
Next > < Previous
Sort answers by oldest

Homework Answers

Request Professional Answer

Request Answer!

We need at least 10 more requests to produce the answer.

0 / 10 have requested this problem solution

The more requests, the faster the answer.

Request! (Login Required)

All students who have requested the answer will be notified once they are available.
Know the answer?
Add Answer to:
Parts arrive at a two-machine system according to an exponential interarrival distribution with mean 20 minutes....
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Log In

Sign Up

Similar Homework Help Questions

  • Jobs arrive at a single-CPU computer facility with interarrival times the are IID exponential ran...

    Jobs arrive at a single-CPU computer facility with interarrival times the are IID exponential random variables with mean 1 minute. Each job specifies upon arrival the maximum amount of processing time it requires, and the maximum times for successive jobs are IID exponential random variable with mean 1.1 minutes. However, if m is the specified maximum processing time for a particular job, the actual processing time is distributed uniformly between 0.55m and 1.05m. The CPU will never process a job...

  • Travelers arrive at the main entrance door of an airline terminal according to an exponential int...

    Travelers arrive at the main entrance door of an airline terminal according to an exponential interarrival-time distribution with 1.6 minutes, with the first arrival at time 0. The travel time from the entrance to the check-in queue location is distributed uniformly between 2 and 3 minutes. At the check-in counter, travelers wait in a single line until one of five agents is available to serve them. The check-in time (in minutes) follows a Weibull distribution with parameters ß = 7.76...

  • questions uses Arena. Question 3: (Objective: To Exercise the Modeling Concepts) Sequences, Advance Set. Set a. Simulate the following real time scenario using ARENA. Three different parts are proces...

    questions uses Arena. Question 3: (Objective: To Exercise the Modeling Concepts) Sequences, Advance Set. Set a. Simulate the following real time scenario using ARENA. Three different parts are processed via 3 different machines. Parts are moved via a transporter and follow the given sequences. Transporter speed is 1 foot/minute. b.Machine 3 fails sometimes, uptime is expo(50) and down time is expo (2). c. Use the frequency statistics to tabulate /plot the number of parts waiting in front ofPart3 the machine...

  • Arena Simulation Modeling In Model 3-1, suppose that instead of having a single source of parts,...

    Arena Simulation Modeling In Model 3-1, suppose that instead of having a single source of parts, there are three sources of arrival, one for each of three different kinds of parts that arrive: blue (as before), Green, and Red. For each color of arriving part, inter-arrival times are exponentially distributed with a mean of 16 minutes. Run the simulation for 480 minutes, and compute the same performance measures as for Model 3-1. Once the parts are in the system, they...

  • Consider a simple queuing system in which customers arrive randomly such that the time between successive...

    Consider a simple queuing system in which customers arrive randomly such that the time between successive arrivals is exponentially distributed with a rate parameter l = 2.8 per minute. The service time, that is the time it takes to serve each customer is also Exponentially distributed with a rate parameter m = 3 per minute. Create a Matlab simulation to model the above queuing system by randomly sampling time between arrivals and service times from the Exponential Distribution. If a...

  • QUESTION 1 Customers arrive at a hair salon according to a Poisson process with an average of 1...

    QUESTION 1 Customers arrive at a hair salon according to a Poisson process with an average of 16 customers per hour. Which of the following is most likely true, based on this information: a. The hair salon serves customers on a walk-in basis (rather than by appointment times) b. If 10 customers arrive in the first hour, it is likely that 22 customers will arrive in the next hour. c. If the salon can serve an average of 20 customers...

ADVERTISEMENT
Free Homework Help App
Download From Google Play
Scan Your Homework
to Get Instant Free Answers
Need Online Homework Help?
Ask a Question
Get Answers For Free
Most questions answered within 3 hours.
ADVERTISEMENT
ADVERTISEMENT
ADVERTISEMENT