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Solution and Explanation:
The concept of Null hypothesis first.
Null hypothesis is the prior belief about the parameter of interest. Normally, there ar good reasons for the belief, so we only change it (reject it ) if we have enough evidence to believe that it is wrong. Generally, this error should be small and to ensure that, we fix a small percentage of error bound for this. This is type 1 error and the corresponding risk is called alpha risk. The risk is the expected loss.
There are two types of error: Type 1: Reject Null when Null is true
Type 2: Do NOT reject Null when Null is false.
Alpha risk:This is the risk when we Reject Null when Null is true.
Beta risk: The risk when we Do NOT reject Null but Null is false
Impact of Sample size: increasing sample size controls the error. Larger the sample size is, the smaller the beta risk would be given a level of alpha risk(or equivalently type 1 error). Since we fix our type 1 error, we can only control beta risk. So increasing sample size improves beta risk as we get more information to make the decision.
[tex]\alpha=P_{H_{0}}\left(\text {Reject} H_{0}\right)[/tex] is the type 1 error.
[tex]\beta=P_{H_{1}}\left(\text {RejectH}_{0}\right)[/tex] is power
[tex]1-\beta[/tex] is the type 2 error
[tex]\alpha-\text {risk}=E(L(\theta, \delta))[/tex]
where is the parameter. If is in the null region, the risk is alpha risk, when it is in the alternative region, the risk is beta risk.
The relationship between Alpha risk and Beta risk is related to the probability of accepting Null hypothesis. They are also known as Type 1 and type 2 error.
Alpha Risk and Beta Risk
The term "risk or error" defines the probability of making an incorrect decision. When a Null hypothesis which is false is accepted as true by statistical test, is known as a Type II error. When a null hypothesis despite being true is rejected, this is known as Alpha Risk.
Determining the type of risk in a quantitative relationship is primarily based on sample size. The Sample Size directly affect the Alpha and Beta risk. If Sample size is larger, the Alpha and Beta risk will lower, and if the sample size is lower the risk of Beta and Alpha increases.
Learn more about Null Hypothesis here:
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