Template:Example: Warranty Analysis Nevada Format Example

Warranty Analysis Nevada Format Example

A company keeps track of its shipments and warranty returns on a month-by-month basis. The data format that the company uses is the Nevada format. Following is a table for shipments in June, July, and August, and the warranty returns through September:

Convert this information to life data, and determine the parameters for a two-parameter Weibull distribution.

Solution

We will examine the data month by month. In June 100 units were sold, and in July 3 of these units were returned. This gives 3 failures at one month for the June shipment, which we will denote as $${{F}_{JUN,1}}=3$$. Likewise, 3 failures occurred in August and 5 occurred in September for this shipment, or $${{F}_{JUN,2}}=3$$  and  $${{F}_{JUN,3}}=5$$. Consequently, at the end of our three-month analysis period, there were a total of 11 failures for the 100 units shipped in June. This means that 89 units are presumably still operating, and can be considered suspensions at three months, or $${{S}_{JUN,3}}=89$$. For the shipment of 140 in July, 2 were returned the following month, or $${{F}_{JUL,1}}=2$$, and 4 more were returned the month after that, or  $${{F}_{JUL,2}}=4$$. After two months, there are 134 ( $$140-2-4=134$$ ) units from the July shipment still operating, or $${{S}_{JUL,2}}=134$$. For the final shipment of 150 in August, 4 fail in September, or $${{F}_{AUG,1}}=4$$, with the remaining 146 units being suspensions at one month, or  $${{S}_{AUG,1}}=146$$.

It is now a simple matter to add up the number of failures for 1, 2, and 3 months, then add the suspensions to get our reliability data set:

$$\begin{matrix} \text{Failures at 1 month:} & {{F}_{1}}={{F}_{JUN,1}}+{{F}_{JUL,1}}+{{F}_{AUG,1}}=3+2+4=9 \\ \text{Suspensions at 1 month:} & {{S}_{1}}={{S}_{AUG,1}}=146 \\ \text{Failures at 2 months:} & {{F}_{2}}={{F}_{JUN,2}}+{{F}_{JUL,2}}=3+4=7 \\ \text{Suspensions at 2 months:} & {{S}_{2}}={{S}_{JUL,2}}=134 \\ \text{Failures at 3 months:} & {{F}_{3}}={{F}_{JUN,3}}=5 \\ \text{Suspensions at 3 months:} & {{S}_{JUN,3}}=89 \\ \end{matrix}$$

To perform this analysis in Weibull++, create a warranty analysis folio and choose I want to enter data in Nevada format in the Project Wizard.





The next window allows you to specify the time units used. For this example select Months under I want to use the following unit type for each period and enter the Start month and Number of Periods and Increment number for the sales data and failure/return data as follows:



The sales data are entered as follows:



The return data are entered as follows:



The data can now be analyzed. Select 2-parameter Weibull as the distribution type and MLE as the analysis method and click the Calculate button. The estimated parameters are $$\widehat{\beta }=2.49$$  and  $$\widehat{\eta }=6.70.$$

Even though this step is not required for the analysis, the data can also be transferred to a Weibull++ data sheet for illustrative purposes or for ancillary analysis. This can be done by clicking the Transfer Life Data to New Folio button:

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or choosing this option under the Data menu.

The equivalent Times-to-failure folio is as follows: