1P-Exponential Data Analysis with No Failures: Difference between revisions
Jump to navigation
Jump to search
Kate Racaza (talk | contribs) (Created page with '{{Reference Example}} This example compares the calculation for the case when no failures are observed. {{Reference_Example_Heading1}} The formulas on page 168 in the book ''…') |
Kate Racaza (talk | contribs) No edit summary |
||
| Line 11: | Line 11: | ||
where ''TTT'' is the total test time and <math>x^{2}_{(1-\alpha; 2)}\,\!</math> is the <math>1 - \alpha \,\!</math> of a chi-squared distribution with degree of freedom of 2. <math>1 - \alpha \,\!</math> is also the confidence level. The equation above gives the lower 1-sided confidence bound for <math>\theta \,\!</math>. | where ''TTT'' is the total test time and <math>x^{2}_{(1-\alpha; 2)}\,\!</math> is the <math>1 - \alpha \,\!</math> percentile of a chi-squared distribution with degree of freedom of 2. <math>1 - \alpha \,\!</math> is also the confidence level. The equation above gives the lower 1-sided confidence bound for <math>\theta \,\!</math>. | ||
| Line 22: | Line 22: | ||
::<math> | ::<math>\theta = \frac{2TTT}{X^{2}_{1-\alpha; 2}} = \frac{28000}{5.99146} = 4673.31\,\!</math> | ||
Revision as of 15:50, 9 June 2014
 |
New format available! This reference is now available in a new format that offers faster page load, improved display for calculations and images and more targeted search.
As of January 2024, this Reliawiki page will not continue to be updated. Please update all links and bookmarks to the latest references at Weibull examples and Weibull reference examples.
