Uncertainty about a probability, fraction or prevalence
In risk analysis, we are frequently faced with having to estimate a probability, a fraction or a prevalence. We usually have some data that would help us produce this estimate, that come from surveys, experiments, or even computer simulations. If we can be sure that the data are collected according to a binomial process, we can use the Beta distribution to describe our uncertainty about the prevalence, fraction or probability by applying the formula:
p = Beta(s+1, n-s+1)
where n is the number of trials or samples, and s is the number of 'successes'.
The Beta distribution has a domain of [0,1] so is an immediate contender to model uncertainty or randomness about a probability, fraction or prevalence. However, there are more technical reasons for using the Beta distribution here; namely that it is the conjugate to the Binomial distribution and the above formula is the result of a Bayesian inference calculation with an uninformed prior. Translation for the layperson: the Beta distribution is the direct result of a statistical analysis where we assume that the data come from a binomial process, and where we knew nothing about the parameter p being estimated, prior to collecting these data.
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- Normal_approximation_to_the_Binomial_distribution
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- Modeling expert opinion
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- Technical subjects
- Comparison of Classical and Bayesian methods
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- Which technique should you use?
- Comparison of classic and Bayesian estimate of mean "time" beta in a Poisson process
- Classical statistics
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- Example: Parametric Bootstrap estimate of the mean of a Normal distribution with known standard deviation
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- RISK ANALYSIS SOFTWARE
- Risk analysis software from Vose Software
- ModelRisk - risk modeling in Excel
- ModelRisk functions explained
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- Tamara - project risk analysis
- Introduction to Tamara project risk analysis software
- Launching Tamara
- Importing a schedule
- Assigning uncertainty to the amount of work in the project
- Assigning uncertainty to productivity levels in the project
- Adding risk events to the project schedule
- Adding cost uncertainty to the project schedule
- Saving the Tamara model
- Running a Monte Carlo simulation in Tamara
- Reviewing the simulation results in Tamara
- Using Tamara results for cost and financial risk analysis
- Creating, updating and distributing a Tamara report
- Tips for creating a schedule model suitable for Monte Carlo simulation
- Random number generator and sampling algorithms used in Tamara
- Probability distributions used in Tamara
- Correlation with project schedule risk analysis
- Pelican - enterprise risk management