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| ===The Loglogistic Distribution===
| | #REDIRECT [[The_Loglogistic_Distribution]] |
| As may be indicated by the name, the loglogistic distribution has certain similarities to the logistic distribution. A random variable is loglogistically distributed if the logarithm of the random variable is logistically distributed. Because of this, there are many mathematical similarities between the two distributions [27]. For example, the mathematical reasoning for the construction of the probability plotting scales is very similar for these two distributions.
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| {{loglogistic probability density function}}
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| {{loglogistic mean median and mode}}
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| {{loglogistic standard deviation}}
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| {{loglogistic reliability function}}
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| {{loglogistic reliable life}}
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| {{loglogistic failure rate function}}
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| {{loglogistic distribution characteristics}}
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| {{loglogistic confidence bounds}}
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| {{loglogistic example}}
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