Question

In the lecture notes, we discussed the uniform distribution of decrements (UDD) between integer ages. It is important to understand that the UDD assumption is made with respect to the original full decrement model. In other words, we assumed uniform exits via all decrements simultaneously between integer ages: P = t - p, 0 ≤ t ≤ 1, integer x, for all j = 1, 2, ..., m.... 

          In the lecture notes, we discussed the uniform distribution of decrements (UDD) between integer ages. It is important to understand that the UDD assumption is made with respect to the original full decrement model. In other words, we assumed uniform exits via all decrements simultaneously between integer ages: P = t - p, 0 ≤ t ≤ 1, integer x, for all j = 1, 2, ..., m....
Show more…

Added by Brian B.

Elementary Statistics a Step by Step Approach
Elementary Statistics a Step by Step Approach
Allan G. Bluman 9th Edition
AceChat toggle button
Close icon
Ace pointing down

Please give Ace some feedback

Your feedback will help us improve your experience

Thumb up icon Thumb down icon
Thanks for your feedback!
Profile picture
In the lecture notes, we discussed the uniform distribution of decrements (UDD) between integer ages. It is important to understand that the UDD assumption is made with respect to the original full decrement model. In other words, we assumed uniform exits via all decrements simultaneously between integer ages: P = t - p, 0 ≤ t ≤ 1, integer x, for all j = 1, 2, ..., m....
Close icon
Play audio
Feedback
Powered by NumerAI
David Collins Danielle Fairburn
Kathleen Carty verified

Ameer Said and 95 other subject Intro Stats / AP Statistics educators are ready to help you.

Ask a new question
*

Labs

-

Want to see this concept in action?

NEW

Explore this concept interactively to see how it behaves as you change inputs.

View Labs
*

Key Concepts

-
Key Concept
Premium Feature
Explore the core concept behind this problem.
Play button
Key Concept
Premium Feature
Explore the core concept behind this problem.
Your browser does not support the video tag.
*

Recommended Videos

-
consider-an-infinite-server-queueing-system-in-which-customers-arrive-in-accordance-with-a-poisson-p-21694

Consider an infinite server queueing system in which customers arrive in accordance with a Poisson process and where the service distribution is exponential with rate $\mu$. Let $X(t)$ denote the number of customers in the system at time $t$. Find (a) $E[X(t+s) \mid X(s)=n]$ (b) $\operatorname{Var}[X(t+s) \mid X(s)=n]$ Hint: Divide the customers in the system at time $t+s$ into two groups, one consisting of "old" customers and the other of "new" customers.

Ameer S.
consider-an-ergodic-m-m-s-queue-in-steady-state-that-is-after-a-long-time-and-argue-that-the-numbe-2-65826

Consider an ergodic $M / M / s$ queue in steady state (that is, after a long time) and argue that the number presently in the system is independent of the sequence of past departure times. That is, for instance, knowing that there have been departures $2,3,5$, and 10 time units ago does not affect the distribution of the number presently in the system.

Ameer S.
by-largely-qualitative-arguments-exercise-37-shows-that-a-finite-well-can-hold-an-nth-state-only-if-

By largely qualitative arguments. Exercise 37 shows that a finite well can hold an nth state only if its depth $U_{0}$ is at least $h^{2}(n-1)^{2} / 8 m L^{2}$. Show that this result also follows from equation $(5-23)$ and the accompanying Figure $5.14 .$

Modern Physics

*

Recommended Textbooks

-
Elementary Statistics a Step by Step Approach

Elementary Statistics a Step by Step Approach

Allan G. Bluman 9th Edition
achievement 1,911 solutions
The Practice of Statistics for AP

The Practice of Statistics for AP

Daren S. Starnes, Daniel S. Yates, David S. Moore 4th Edition
achievement 1,504 solutions
Introductory Statistics

Introductory Statistics

Barbara Illowsky, Susan Dean 1st Edition
achievement 1,282 solutions
*

Transcript

-
00:01 All right, so from this information, we will consider an infinite server queuing system in which customers arrive in accordance with the poisson process with the rate of limba, right? so here the service distribution is exponential with rate mu, and we will consider x of t which denote the number of customers in the system at time t, right? so let's consider x and y are two random variables that represent the number of customers in the entire system at time t plus s, right? and these are present at time s and the number in the entire system at t plus s that were not in the system at time s right.
00:46 And we know that x and y are independent in the function x of s is n which follows the distribution, binomial distribution with pyramids...
Need help? Use Ace
Ace is your personal tutor. It breaks down any question with clear steps so you can learn.
Start Using Ace
Ace is your personal tutor for learning
Step-by-step explanations
Instant summaries
Summarize YouTube videos
Understand textbook images or PDFs
Study tools like quizzes and flashcards
Listen to your notes as a podcast
Continue solving this problem
Create a free account to:
  • View full step-by-step solution
  • Ask follow-up questions with Ace AI
  • Save progress and study later
Continue Free
Join the community

18,000,000+

Students on Numerade

Trusted by students at 8,000+ universities

Numerade

Get step-by-step video solution
from top educators

Continue with Clever
or



By creating an account, you agree to the Terms of Service and Privacy Policy
Already have an account? Log In

A free answer
just for you

Watch the video solution with this free unlock.

Numerade

Log in to watch this video
...and 100,000,000 more!


EMAIL

PASSWORD

OR
Continue with Clever