Template:Determining test time for available units: Difference between revisions

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'''Determining Test Time for Available Units'''
'''Determining Test Time for Available Units'''


The way that one determines the test time for the available number of test units is quite similar to the process described previously.  In this case, one knows beforehand the number of units,  <math>n</math> , the number of allowable failures,  <math>f</math> , and the confidence level,  <math>CL</math> . With this information, the next step involves solving the binomial equation for  <math>{{R}_{TEST}}</math> . With this value known, one can use the appropriate reliability equation to back out the value of  <math>{{t}_{TEST}}</math> , since  <math>{{R}_{TEST}}=g({{t}_{TEST}};\theta ,\phi )</math> , and  <math>{{R}_{TEST}}</math> ,  <math>\theta </math>  and  <math>\phi </math>  have already been calculated or specified.
The way that one determines the test time for the available number of test units is quite similar to the process described previously.  In this case, one knows beforehand the number of units,  <math>n</math>, the number of allowable failures,  <math>f</math>, and the confidence level,  <math>CL</math>. With this information, the next step involves solving the binomial equation for  <math>{{R}_{TEST}}</math>. With this value known, one can use the appropriate reliability equation to back out the value of  <math>{{t}_{TEST}}</math>, since  <math>{{R}_{TEST}}=g({{t}_{TEST}};\theta ,\phi )</math>, and  <math>{{R}_{TEST}}</math>,  <math>\theta</math>  and  <math>\phi</math>  have already been calculated or specified.

Revision as of 00:31, 9 March 2012

Determining Test Time for Available Units

The way that one determines the test time for the available number of test units is quite similar to the process described previously. In this case, one knows beforehand the number of units, [math]\displaystyle{ n }[/math], the number of allowable failures, [math]\displaystyle{ f }[/math], and the confidence level, [math]\displaystyle{ CL }[/math]. With this information, the next step involves solving the binomial equation for [math]\displaystyle{ {{R}_{TEST}} }[/math]. With this value known, one can use the appropriate reliability equation to back out the value of [math]\displaystyle{ {{t}_{TEST}} }[/math], since [math]\displaystyle{ {{R}_{TEST}}=g({{t}_{TEST}};\theta ,\phi ) }[/math], and [math]\displaystyle{ {{R}_{TEST}} }[/math], [math]\displaystyle{ \theta }[/math] and [math]\displaystyle{ \phi }[/math] have already been calculated or specified.