1P-Exponential MLE Solution for Interval Data: Difference between revisions
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{{Reference Example}} | {{Reference Example}} | ||
This example validates the calculations for the MLE solution, likelihood ratio bound and Fisher Matrix bound for a 1-parameter exponential distribution with interval data in Weibull++ standard folios. | |||
{{Reference_Example_Heading1}} | {{Reference_Example_Heading1}} | ||
Example 7.1 on page 154 in book ''Statistical Methods for Reliability Data'' by Dr. Meeker and Dr. Escobar, John Wiley & Sons, 1998. The sample size of 200 data is used here. | Example 7.1 on page 154 in the book ''Statistical Methods for Reliability Data'' by Dr. Meeker and Dr. Escobar, John Wiley & Sons, 1998. The sample size of 200 data is used here. | ||
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{{Reference_Example_Heading3}} | {{Reference_Example_Heading3}} | ||
The cumulative distribution function for an exponential distribution is: | The cumulative distribution function for an exponential distribution is: | ||
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The ML estimate <math>\hat{\theta}\,\!</math> = 572.3, and the standard deviation is <math>se_{\hat\theta}\,\!</math> = 41.72. Therefore the variance is 1740.56. | The ML estimate <math>\hat{\theta}\,\!</math> = 572.3, and the standard deviation is <math>se_{\hat\theta}\,\!</math> = 41.72. Therefore the variance is 1740.56. | ||
The 95% 2-sided confidence interval for <math>{\theta}\,\!</math> are: | |||
* Based on the likelihood ratio, the confidence interval is [498, 662]. The calculation is based on | * Based on the likelihood ratio, the confidence interval is [498, 662]. The calculation is based on | ||
::<math>-2ln\left [ \frac{L(\theta)}{L(\hat{\theta})} \right ] = X^{2}_{(0.90,1)}\,\!</math> | |||
::<math>-2ln\left [ \frac{L(\theta)}{L(\hat{\theta})} \right ] = | |||
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::<math>\begin{alignat}{2} | ::<math>\begin{alignat}{2} | ||
[\theta_{L},\theta_{U}]&= \hat{\theta}exp(\pm 1.96\times \frac{se_{\hat{\theta}}}{\hat{\theta}})\\ | [\theta_{L},\theta_{U}]&= \hat{\theta}exp\left(\pm 1.96\times \frac{se_{\hat{\theta}}}{\hat{\theta}}\right)\\ | ||
&=\left [572.3\times exp(-1.96\times\ | &= \left[572.3\times exp \left(-1.96\times\frac{41.72}{572.3}\right),572.3\times exp \left(1.96\times\frac{41.72}{572.3}\right)\right]\\ | ||
&= [496,660]\\ | &= [496,660]\\ | ||
\end{alignat}</math> | \end{alignat}</math> | ||
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The ML estimator for <math>\theta\,\!</math> and its variance are 572.27 and | The ML estimator for <math>\theta\,\!</math> and its variance are 572.27 and 1740.52, respectively. They are given below. | ||
[[Image:1PE_interval_data.png|center]] | [[Image:1PE_interval_data.png|center]] | ||
The ML estimator for <math>\theta\,\!</math> and the variance are the same as the values given in the book | The ML estimator for <math>\theta\,\!</math> and the variance are the same as the values given in the book. | ||
The 95% 2-sided confidence interval for <math>\theta\,\!</math> are: | The 95% 2-sided confidence interval for <math>\theta\,\!</math> are: | ||
* Based on the likelihood ratio (Select LRB for the confidence bound), the confidence interval is | * Based on the likelihood ratio (Select LRB for the confidence bound), the confidence interval is: | ||
[[Image:1PE_interval_data_qcp.png|center|550 px]] | |||
* Based on lognormal approximation (select FM for the bound method), the confidence bounds are: | |||
[[Image:1PE_interval_data_qcp_FM.png|center|550 px]] |
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