Template:Parameter estimation camsaa: Difference between revisions

Latest revision as of 12:09, 23 August 2012

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Crow-AMSAA - NHPP

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+#REDIRECT [[Crow-AMSAA - NHPP]]
-==Parameter Estimation==
-{{maximum likelihood estimators camsaa-pe}}
-===Biasing and Unbiasing of Beta===
-Eqn. (6) returns the biased estimate of  <math>\beta </math> . The unbiased estimate of  <math>\beta </math>  can be calculated by using the following relationships. For time terminated data (meaning that the test ends after a specified number of failures):
-::<math>\bar{\beta }=\frac{N-1}{N}\hat{\beta }</math>
-<br>
-For failure terminated data (meaning that the test ends after a specified test time):
-<br>
-::<math>\bar{\beta }=\frac{N-2}{N}\hat{\beta }</math>
-<br>
-'''Example 1'''
-<br>
-Two prototypes of a system were tested simultaneously with design changes incorporated during the test. Table 5.1 presents the data collected over the entire test. Find the Crow-AMSAA parameters and the intensity function using maximum likelihood estimators.
-<br>
-<br>
-<center>Table 5.1 - Developmental test data for two identical systems	</center>
-{|style= align="center" border="1"
-!Failure Number
-!Failed Unit
-!Test Time Unit 1(hr)
-!Test Time Unit 2(hr)
-!Total Test Time(hr)
-!<math>ln{(T)}</math>
-|-
-|1||	1||	1.0||	1.7||	2.7||	0.99325
-|-
-|2||	1||	7.3||	3.0||	10.3||	2.33214
-|-
-|3||	2||	8.7||	3.8||	12.5||	2.52573
-|-
-|4||	2||	23.3||	7.3||	30.6||	3.42100
-|-
-|5||	2||	46.4||	10.6||	57.0||	4.04305
-|-
-|6||	1||	50.1||	11.2||	61.3||	4.11578
-|-
-|7||	1||	57.8||	22.2||	80.0||	4.38203
-|-
-|8||	2||	82.1||	27.4||	109.5||	4.69592
-|-
-|9||	2||	86.6||	38.4||	125.0||4.82831
-|-
-|10||	1||	87.0||	41.6||	128.6||	4.85671
-|-
-|11||	2||	98.7||	45.1||	143.8||	4.96842
-|-
-|12||	1||	102.2||	65.7||	167.9||	5.12337
-|-
-|13||	1||	139.2	||90.0||229.2||	5.43459
-|-
-|14||	1||	166.6||	130.1||	296.7||	5.69272
-|-
-|15||	2||	180.8||	139.8	||320.6||5.77019
-|-
-|16||	1||	181.3||	146.9||	328.2||	5.79362
-|-
-|17||	2||	207.9||	158.3	||366.2||5.90318
-|-
-|18||	2||	209.8||	186.9||	396.7||	5.98318
-|-
-|19||	2||	226.9||	194.2||	421.1||	6.04287
-|-
-|20||	1||	232.2||	206.0||	438.2||	6.08268
-|-
-|21||	2||	267.5||	233.7||	501.2||	6.21701
-|-
-|22||	2||	330.1||	289.9||	620.0||	6.42972
-|}
-'''Solution'''
-<br>
-For the failure terminated test, using Eqn. (amsaa6):
-::<math>\widehat{\beta }=\frac{22}{22\ln 620-\underset{i=1}{\overset{22}{\mathop{\sum }}}\,\ln {{T}_{i}}}</math>
-:where:
-<br>
-::<math>\underset{i=1}{\overset{22}{\mathop \sum }}\,\ln {{T}_{i}}=105.6355</math>
-<br>
-:Then:
-<br>
-::<math>\widehat{\beta }=\frac{22}{22\ln 620-105.6355}=0.6142</math>
-<br>
-From Eqn. (amsaa5):
-<br>
-::<math>\widehat{\lambda }=\frac{22}{{{620}^{0.6142}}}=0.4239</math>
-<br>
-Therefore,  <math>{{\lambda }_{i}}(T)</math>  becomes:
-<br>
-::<math>\begin{align}
-  & {{\widehat{\lambda }}_{i}}(T)= & 0.4239\cdot 0.6142\cdot {{620}^{-0.3858}} \\
- & = & 0.0217906\frac{\text{failures}}{\text{hr}}
-\end{align}</math>
-<br>
-Figure 4fig81 shows the plot of the failure rate. If no further changes are made, the estimated MTBF is  <math>\tfrac{1}{0.0217906}</math>  or 46 hr.
-<br>
-<br>
-[[Image:rga5.1.png|thumb|center|400px|Failure rate plot for Example 5-1 using Maximum Likelihood Estimation.]]
-<br>

Template:Parameter estimation camsaa: Difference between revisions

Latest revision as of 12:09, 23 August 2012

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