Filter by
The language used throughout the course, in both instruction and assessments.
17 results for "discrete event simulation"
University of Minnesota
Skills you'll gain: Decision Making, Probability & Statistics, Probability Distribution, Statistical Analysis, Data Analysis, General Statistics
Coursera Project Network
Skills you'll gain: Data Analysis, Process Analysis, R Programming
Coursera Project Network
Skills you'll gain: Data Analysis, R Programming
Coursera Project Network
Skills you'll gain: Data Analysis, R Programming
Coursera Project Network
Skills you'll gain: Data Analysis, R Programming
Coursera Project Network
Skills you'll gain: Data Analysis, Process Analysis, R Programming
Coursera Project Network
Skills you'll gain: Data Analysis, R Programming
Coursera Project Network
Skills you'll gain: Data Analysis, R Programming
Coursera Project Network
Skills you'll gain: Data Analysis, Process Analysis, R Programming
Johns Hopkins University
Skills you'll gain: General Statistics, Probability & Statistics
- Status: Free
University of Geneva
Skills you'll gain: Python Programming
DeepLearning.AI
Skills you'll gain: General Statistics, Probability & Statistics, Statistical Analysis
In summary, here are 10 of our most popular discrete event simulation courses
- Simulation Models for Decision Making:Â University of Minnesota
- Simulation of Manufacturing Process Using R Simmer:Â Coursera Project Network
- Multi-Echelon Inventory Simulation Using R Simmer:Â Coursera Project Network
- Simulation of Inventory Replenishment Using R Simmer:Â Coursera Project Network
- Simulation of KANBAN Production Control Using R Simmer:Â Coursera Project Network
- Simulation of Covid-19 Testing Process Using R Simmer:Â Coursera Project Network
- Simulation of Drum-Buffer-Rope Control Using R Simmer:Â Coursera Project Network
- Simulation of CONWIP Production Control Using R Simmer:Â Coursera Project Network
- Simulation of Call Centre Operations Using R Simmer:Â Coursera Project Network
- What are the Chances? Probability and Uncertainty in Statistics:Â Johns Hopkins University