Difference between revisions of "Rasch Notes"
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Summarized from - Linacre J.M. (2007) How to Simulate Rasch Data … Rasch Measurement Transactions 21:3 p. 1125 | |||
[[Category:Rasch Analysis]] | [[Category:Rasch Analysis]] |
Latest revision as of 18:14, 5 October 2011
Links
See rasch.org - How to Simulate Rasch Data
Dichotomous data: 1. Decide about the items. They are usually uniformly distributed. How many items? How wide the interval? The item mean is usually set at 0 logits. Simulate the item difficulties. 2. Decide about the person sample. This is usually normally distributed. How big a sample? What is the mean? What is the standard deviation? Simulate the person abilities. 4. For each response by a person to an item: 4A. Generate a random number U = uniform [0,1] 4B. Probability of failure = 1/(1 + exp(ability - difficulty)) 4C. If U > Probability of failure, then X=1 else X=0. 4D. X is the simulated observation. 5. Check this by simulating data for a very high ability person (logit = 10): the data should all be "1". Simulate data for a very low ability person (logit = -10): the data should all be "0" Polytomous (rating scale or partial credit) data: 1. Decide about the items. They are usually uniformly distributed. How many items? How wide the interval? The item mean is usually set at 0 logits. Simulate the item difficulties. 2. Decide about the person sample. This is usually normally distributed. How big a sample? What is the mean? What is the standard deviation? Simulate the person abilities. 3. Decide about the number of categories, m. The higher categories, 2 to m, have Rasch-Andrich threshold values that are usually ascending and sum to zero across all the categories. Simulate the threshold values. 4. For each response by a person to an item: 4A. Generate a random number U = uniform [0,1] 4B. Compute the cumulative exponential of observing each category: measure = 0 cumexp(1) = 1 Compute for category j = 2 to m measure = measure + ability - difficulty - threshold(j) cumexp(j) = cumexp(j-1) + exponential(measure) Next category 4C. Identify the simulated observation: U = U * cumexp(m) For category j = 1 to m if U <= cumexp(j) then X = j: exit Next category 4D. X is the simulated observation. 5. Check this by simulating data for a very high ability person (logit = 10): the data should all be "m" (the top category). Simulate data for a very low ability person (logit = -10): the data should all be "1" (the bottom category). John M. Linacre
Summarized from - Linacre J.M. (2007) How to Simulate Rasch Data … Rasch Measurement Transactions 21:3 p. 1125