About intervals of confidenceSuppose that T 1 is a α ∗ 100 % lower confidence limit for θ and T 2 is a α ∗ 100 % upper confidence limit for θ. Further assume that P ( T 1 &lt; T 2 ) = 1. Find a ( 2 α − 1 ) ∗ 100 % confidence interval for θI thought that ( T 1 , T 2 ) was a α 2 ∗ 100 % confidence interval, but it is only if T 1 , T 2 are independents (correct?)

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About intervals of confidenceSuppose that       T    1   is a   α  ∗  100  % lower confidence limit for   θ and       T    2   is a   α  ∗  100  % upper confidence limit for   θ. Further assume that   P  (      T    1    &amp;lt;      T    2    )  =  1. Find a   (  2  α  −  1  )  ∗  100  % confidence interval for   θI thought that   (      T    1    ,      T    2    ) was a             α        2    ∗  100  % confidence interval, but it is only if       T    1    ,      T    2   are independents (correct?)

motylowceyvy · Accepted Answer

Step 1Your statement about       α    2   looks peculiar given that you know   P  (      T    1    &amp;lt;      T    2    )  =  1.Step 2The events       T    1    &amp;gt;  θ and       T    2    &amp;lt;  θ are not independent, since if       T    1    &amp;gt;  θ then   Pr  (      T    2    &amp;lt;  θ  )  =  0. Indeed       T    1    &amp;gt;  θ and       T    2    &amp;lt;  θ are almost surely mutually exclusiveHint: You should reconsider   Pr  (      T    1    ≤  θ  ≤      T    2    ) in the light of this

Suppose that T_1 is a alpha ∗ 100% lower confidence limit for theta and T_2 is a alpha ∗ 100% upper confidence limit for theta. Further assume that P(T_1<T_2)=1. Find a (2alpha-1)∗100% confidence interval for theta

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