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    Being able to construct such a pivotal quantity is equiva... — Carmelics
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    Supports→The fiducial argument can be run whenever a pivotal quantity can be constructed.

    Being able to construct such a pivotal quantity is equivalent to being able to express the statistical model as a functional model.

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    The fiducial argument can be run whenever a pivotal quantity can be constructed.The fiducial argument relies on the existence of a pivotal quantity with a known...

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    The fiducial argument can be run whenever a pivotal quantity can be co...77%The fiducial argument relies on the existence of a pivotal quantity wi...75%The distribution of the pivotal quantity is independent of the sample.74%The pivotal quantity \(\hat{\theta}(s) - \theta\) has a known distribu...72%

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    Another way of explaining the same idea invokes the notion of a pivotal quantity. Because of how the above statistical model is set up, we can construct the pivotal quantity \(\hat{\theta}(s) - \theta\). We know the distribution of this quantity, namely normal and with the aforementioned variance. Moreover, this distribution is independent of the sample, and it is such that fixing the sample to \(s\), and so fixing the value of \(\hat{\theta}\), uniquely determines a distribution over the param

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