Editing Null hypothesis (section)

==Principle==
Hypothesis testing requires constructing a [[statistical model]] of what the data would look like if chance or random processes alone were responsible for the results. The hypothesis that chance alone is responsible for the results is called the ''null hypothesis''. The model of the result of the random process is called the ''distribution under the null hypothesis''. The obtained results are compared with the distribution under the null hypothesis, and the likelihood of finding the obtained results is thereby determined.<ref>Stockburger D.W. (2007), "Hypothesis and hypothesis testing", ''Encyclopedia of Measurement and Statistics'' (editor—Salkind N.J.), [[SAGE Publications]].</ref>

Hypothesis testing works by [[Sampling (statistics)|collecting data]] and measuring how likely the particular set of data is (assuming the null hypothesis is true), when the study is on a randomly selected representative sample. The null hypothesis assumes no relationship between variables in the [[Statistical population|population]] from which the [[Sample (statistics)|sample]] is selected.<ref>{{Cite journal|url=https://opentextbc.ca/researchmethods/chapter/understanding-null-hypothesis-testing/|title=Understanding Null Hypothesis Testing – Research Methods in Psychology|website=opentextbc.ca|date=13 October 2015 |access-date=10 December 2019|last1=Chiang |first1=I. -Chant A. |last2=Jhangiani |first2=Rajiv S. |last3=Price |first3=Paul C. }}</ref>

If the data-set of a randomly selected representative sample is very unlikely relative to the null hypothesis (defined as being part of a class of sets of data that only rarely will be observed), the experimenter rejects the null hypothesis, concluding it (probably) is false. This class of data-sets is usually specified via a [[test statistic]], which is designed to measure the extent of apparent departure from the null hypothesis. The procedure works by assessing whether the observed departure, measured by the test statistic, is larger than a value defined, so that the probability of occurrence of a more extreme value is small under the null hypothesis (usually in less than either 5% or 1% of similar data-sets in which the null hypothesis does hold).

If the data do not contradict the null hypothesis, then only a weak conclusion can be made: namely, that the observed data set provides insufficient evidence against the null hypothesis. In this case, because the null hypothesis could be true or false, in some contexts this is interpreted as meaning that the data give insufficient evidence to make any conclusion, while in other contexts, it is interpreted as meaning that there is not sufficient evidence to support changing from a currently useful regime to a different one. Nevertheless, if at this point the effect appears likely and/or large enough, there may be an incentive to further investigate, such as running a bigger sample.

For instance, a certain drug may reduce the risk of having a heart attack. Possible null hypotheses are "this drug does not reduce the risk of having a heart attack" or "this drug has no effect on the risk of having a heart attack". The test of the hypothesis consists of administering the drug to half of the people in a study group as a [[controlled experiment]]. If the data show a statistically significant change in the people receiving the drug, the null hypothesis is rejected.