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dc.contributor.authorNevill, Alan M.
dc.contributor.authorHolder, Roger L.
dc.contributor.authorCooper, Stephen-Mark
dc.date.accessioned2008-06-24T13:56:20Z
dc.date.available2008-06-24T13:56:20Z
dc.date.issued2007
dc.identifier.citationEuropean Journal of Sport Science, 7(1): 9-14
dc.identifier.issn17461391
dc.identifier.doi10.1080/17461390701197767
dc.identifier.urihttp://hdl.handle.net/2436/30399
dc.description.abstractAcademics have a responsibility to ensure that their research findings are as truthful as possible. In every issue of a scientific journal, a large number of significance tests are reported (usually using PB0.05). Of course, most of these results will be true/correct. Unfortunately, due to the nature of sampling, researchers will occasionally make errors, often referred to as type I (probability a) and type II (probability b) errors. The power of a test (1-b) is the probability of correctly rejecting a false null hypothesis that is, correctly detecting a real or true effect. Factors that are known to influence power include: (1) the level of significance (a), (2) the size of the difference or relationship in the population (the effect), (3) the sample size, and (4) unexplained error variance. As researchers, we have little control over most of these factors. The one factor that we have some influence over, however, is the ability to reduce the unexplained error variance. In the present article, we describe a range of methods that will increase the probability that a researcher has correctly identified a real effect by increasing the power of their statistical tests. Such methods will include ways of designing experiments to reduce error and uncertainty. The use of blocking and randomized block designs will reduce unexplained error, such as adopting matched or repeatedmeasures designs rather than using independent observations. The other method of reducing unexplained errors is to adopt more appropriate (e.g. biologically correct) models and checking the distribution assumptions associated with such models. In conclusion, researchers are responsible for maximizing the likelihood that their results are as accurate and truthful as possible. By carefully planning their experiments and adopting appropriate models, researchers are more likely to publish their findings with a greater degree of confidence, but not certainty.
dc.language.isoen
dc.publisherTaylor & Francis
dc.relation.urlhttp://www.informaworld.com/smpp/title~content=t714592354
dc.subjectValidity
dc.subjectStatistical analysis
dc.subjectSports
dc.subjectStatistical error
dc.subjectRandomized block design
dc.subjectProbability errors
dc.titleStatistics, truth and error reduction in sport and exercise sciences
dc.title.alternativePerformance measurement
dc.typeJournal article
dc.identifier.journalEuropean Journal of Sport Science
html.description.abstractAcademics have a responsibility to ensure that their research findings are as truthful as possible. In every issue of a scientific journal, a large number of significance tests are reported (usually using PB0.05). Of course, most of these results will be true/correct. Unfortunately, due to the nature of sampling, researchers will occasionally make errors, often referred to as type I (probability a) and type II (probability b) errors. The power of a test (1-b) is the probability of correctly rejecting a false null hypothesis that is, correctly detecting a real or true effect. Factors that are known to influence power include: (1) the level of significance (a), (2) the size of the difference or relationship in the population (the effect), (3) the sample size, and (4) unexplained error variance. As researchers, we have little control over most of these factors. The one factor that we have some influence over, however, is the ability to reduce the unexplained error variance. In the present article, we describe a range of methods that will increase the probability that a researcher has correctly identified a real effect by increasing the power of their statistical tests. Such methods will include ways of designing experiments to reduce error and uncertainty. The use of blocking and randomized block designs will reduce unexplained error, such as adopting matched or repeatedmeasures designs rather than using independent observations. The other method of reducing unexplained errors is to adopt more appropriate (e.g. biologically correct) models and checking the distribution assumptions associated with such models. In conclusion, researchers are responsible for maximizing the likelihood that their results are as accurate and truthful as possible. By carefully planning their experiments and adopting appropriate models, researchers are more likely to publish their findings with a greater degree of confidence, but not certainty.


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