Confidence intervals Flashcards
1
Q
What is a confidence interval?
A
A (point-)estimator θ̂ gives us an estimate of an unknown parameter value, but does not provide us with any direct information about the uncertainty in the estimate.
A confidence interval is an interval [ Θ̂𝐿 ,Θ̂𝑈 ] which with high probability will come to contain the value of the unknown parameter θ.
- Remember that e.g. a 95% conf. int. [ Θ̂𝐿 ,Θ̂𝑈 ] is made such that 𝑃( Θ̂𝐿 < θ < Θ̂𝑈)=0.95. This means that if we make many such intervals, 95% of them will contain the true parameter value θ.
- If we for instance get the observed interval [3.2, 5.6] we do not know whether θ is contained in the interval or not, but based on the way we have made the interval we have high confidence (NB! NOT 95% probability!) that the parameter is contained in the interval.
2
Q
How de we construct a confidence interval?
A
3
Q
The distribution of some functions of estimators
The estimator 𝝁̂=𝑿
A
4
Q
A
5
Q
The distribution of some functions of estimators
The estimator 𝝈̂=𝑺𝟐
A
6
Q
The distribution of some functions of estimators
The estimator 𝜷̂ in the exponential distribution
A
7
Q
Wald interval / confidence interval based on MLE
A
