Temperature-Nonthermal (TNT)-Weibull Model

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This example validates the calculation of Temperature-nonthermal relationship for Weibull distribution.

Reference Case

Data is from Table 7.10 on page 300 in book Life Cycle Reliability Engineering by Dr. Guangbin Yang, John Wiley & Sons, 2007.

Data

Temperature and switching rate are the two stresses used in the accelerated life test for a type of 18-V compact electromagnetic relays. The cycles to failure are provided next.

Number in Group	State F/S	Time to State	Temperature (F)	Switching Rate	Subset ID	Number in Group	State F/S	Time to State	Temperature (F)	Switching Rate	Subset ID
1	F	47154	337.15	10	1	1	F	29672	398.15	10	3
1	F	51307	337.15	10	1	1	F	38586	398.15	10	3
1	F	86149	337.15	10	1	1	F	47570	398.15	10	3
1	F	89702	337.15	10	1	1	F	56979	398.15	10	3
1	F	90044	337.15	10	1	6	S	57600	398.15	10	3
1	F	129795	337.15	10	1	1	F	7151	398.15	30	4
1	F	218384	337.15	10	1	1	F	11966	398.15	30	4
1	F	223994	337.15	10	1	1	F	16772	398.15	30	4
1	F	227383	337.15	10	1	1	F	17691	398.15	30	4
1	F	229354	337.15	10	1	1	F	18088	398.15	30	4
1	F	244685	337.15	10	1	1	F	18446	398.15	30	4
1	F	253690	337.15	10	1	1	F	19442	398.15	30	4
1	F	270150	337.15	10	1	1	F	25952	398.15	30	4
1	F	281499	337.15	10	1	1	F	29154	398.15	30	4
59	S	288000	337.15	10	1	1	F	30236	398.15	30	4
1	F	45663	337.15	30	2	1	F	33433	398.15	30	4
1	F	123237	337.15	30	2	1	F	33492	398.15	30	4
1	F	192073	337.15	30	2	1	F	39094	398.15	30	4
1	F	212696	337.15	30	2	1	F	51761	398.15	30	4
1	F	304669	337.15	30	2	1	F	53926	398.15	30	4
1	F	323332	337.15	30	2	1	F	57124	398.15	30	4
1	F	346814	337.15	30	2	1	F	61833	398.15	30	4
1	F	452855	337.15	30	2	1	F	67618	398.15	30	4
1	F	480915	337.15	30	2	1	F	70177	398.15	30	4
1	F	496672	337.15	30	2	1	F	71534	398.15	30	4
1	F	557136	337.15	30	2	1	F	79047	398.15	30	4
1	F	570003	337.15	30	2	1	F	91295	398.15	30	4
1	F	12019	398.15	10	3	1	F	92005	398.15	30	4
1	F	18590	398.15	10	3

Result

The following temperature non-thermal life stress relationship is used:

[math]\displaystyle{ \,\!L\left ( f,T \right )=Af^{B}e^{\left ( \frac{E_{a}}{kT} \right )} }[/math]

where [math]\displaystyle{ \,\!f }[/math] is the switching rate, [math]\displaystyle{ \,\!T }[/math] is temperature. [math]\displaystyle{ \,\!L\left ( f,T \right ) }[/math] is the life characteristic affected by the two stresses. This relationship is called temperature non-thermal model in ALTA.

This relationship also can be expressed as the following:

[math]\displaystyle{ \,\!ln\left ( L\left ( x_{1},x_{2} \right ) \right )=\alpha _{0}+\alpha _{1}x_{1}+\alpha _{2}x_{2} }[/math]

where [math]\displaystyle{ \,\!x_{1}=\frac{1}{T} }[/math] and [math]\displaystyle{ \,\!x_{2}=ln\left ( f \right ) }[/math] . This is the General log-linear model with the proper stress transformation in ALTA.

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The failure time distribution is a Weibull distribution. The book has the following results:

The maximum likelihood estimation (MLE) results for the parameters are: [math]\displaystyle{ \,\!\alpha _{0}=0.671 }[/math] , [math]\displaystyle{ \,\!\alpha _{1}=4640.1 }[/math] , [math]\displaystyle{ \,\!\alpha _{2}=-0.445 }[/math] and [math]\displaystyle{ \,\!\beta =1.805 }[/math].

The eta parameter in the Weibull distribution at temperature of 30 °C (303.15 °K) and switching rate of 5 cycles/minute is estimated as .

The estimated reliability at 200,000 cycles and temperature of 30 °C (303.15 °K) and switching rate of 5 cycles/minute is 0.996. Its one-sided lower 90% confidence bound is 0.992.

The two-sided 90% confidence interval for parameter is [-0.751, -0.160].

Results in ALTA

Temperature-Nonthermal (TNT)-Weibull Model

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