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Null hypothesis for Kendall's Tau (Independence)
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Null-hypothesis for a Kendall’s Tau
Conceptual Explanation
With hypothesis testing we are setting up a null-hypothesis –
With hypothesis testing we are setting up a null-hypothesis – the probability that there is no effect or relationship –
With hypothesis testing we are setting up a null-hypothesis – the probability that there is no effect or relationship – and then we collect evidence that leads us to either accept or reject that null hypothesis.
As you may recall, a Kendall’s Tau is like a Pearson correlation but is used with Rank-ordered data.
As you may recall, a Kendall’s Tau is like a Pearson correlation but is used with Rank-ordered data.
Individuals Rank order for Biking Event
Rank order for Running Event
Bob 1st 1st
Conrad 2nd 1st
Dallen 2nd 2nd
Ernie 3rd 3rd
Fen 4th 4th
Gaston 5th 4th
As you may recall, a Kendall’s Tau is like a Pearson correlation but is used with Rank-ordered data. It differs from a Spearman’s Rho in that it handles tied rankings whereas Spearman’s does not.
As you may recall, a Kendall’s Tau is like a Pearson correlation but is used with Rank-ordered data. It differs from a Spearman’s Rho in that it handles tied rankings whereas Spearman’s does not.
Individuals Rank order for Biking Event
Rank order for Running Event
Bob 1st 1st
Conrad 2nd 1st
Dallen 2nd 2nd
Ernie 3rd 3rd
Fen 4th 4th
Gaston 5th 4th
Here is a template for writing a null-hypothesis for a Kendall’s Tau:
Here is a template for writing a null-hypothesis for a Kendall’s Tau:
There is no statistically significant relationship between the median [insert variable] and the median [insert variable].
Here is a template for writing a null-hypothesis for a Kendall’s Tau :
There is no statistically significant relationship between the median [insert variable] and the median [insert variable].
Note – as long as both or at least one of the variables has rank-
ordered ties then a Kendall’s Tau would be used.
Here is a template for writing a null-hypothesis for a Kendall’s Tau:
There is no statistically significant relationship between the median [insert variable] and the median [insert variable].
You may remember that when rank-ordered variable is being compared with
another variable the median is used.
Here is a template for writing a null-hypothesis for a Kendall’s Tau :
There is no statistically significant relationship between the median [insert variable] and the median [insert variable].
Also, the null-hypothesis is the aim of a research question that focuses on the independence between rank ordered
and another variable.
Example 1
An iron man competition consists of three consecutive events: Biking 110 miles, Swimming 2.5 miles and Running 26.2 miles.
Researchers are interested if the rank ordered results from the biking and the running events are independent of one another to show how diverse the athletes in the completion are.
Here is the data for 10 individuals who competed.
An iron man competition consists of three consecutive events: Biking 110 miles, Swimming 2.5 miles and Running 26.2 miles.
Race organizers are interested in showing the diversity in athlete abilities by determining if the rank ordered results from the biking and the running events are independent of one another.
Here is the data for 10 individuals who competed.
An iron man competition consists of three consecutive events: Biking 110 miles, Swimming 2.5 miles and Running 26.2 miles.
Race organizers are interested in showing the diversity in athlete abilities by determining if the rank ordered results from the biking and the running events are independent of one another.
Here is the data for 10 individuals who competed.
Individuals Rank order for Biking Event
Rank order for Running Event
Bob 1st 1st
Conrad 2nd 1st
Dallen 2nd 2nd
Ernie 3rd 3rd
Fen 4th 4th
Gaston 5th 4th
Individuals Rank order for Biking Event
Rank order for Running Event
Bob 1st 1st
Conrad 2nd 1st
Dallen 2nd 2nd
Ernie 3rd 3rd
Fen 4th 4th
Gaston 5th 4th
Note the tied
rankings
Individuals Rank order for Biking Event
Rank order for Running Event
Bob 1st 1st
Conrad 2nd 1st
Dallen 2nd 2nd
Ernie 3rd 3rd
Fen 4th 4th
Gaston 5th 4th
Note the tied
rankings
Individuals Rank order for Biking Event
Rank order for Running Event
Bob 1st 1st
Conrad 2nd 1st
Dallen 2nd 2nd
Ernie 3rd 3rd
Fen 4th 4th
Gaston 5th 4th
Note the tied
rankings
ProblemAre the rank ordered results from the biking and the running events are independent of one another?
Template for a Kendall’s Tau Null-HypothesisThere is no statistically significant relationship between the [insert variable] and [insert variable].
ProblemAre the rank ordered results from the biking and the running events are independent of one another?
Template for a Kendall’s Tau Null-HypothesisThere is no statistically significant relationship between the median [insert variable] and the median [insert variable].
ProblemAre the rank ordered results from the biking and the running events are independent of one another?
Template for a Kendall’s Tau Null-HypothesisThere is no statistically significant relationship between the median [insert variable] and the median [insert variable].
ProblemAre the rank ordered results from the biking and the running events are independent of one another?
Template for a Kendall’s Tau Null-HypothesisThere is no statistically significant relationship between the median [biking even rankings] and the median [insert variable].
ProblemAre the rank ordered results from the biking and the running events are independent of one another?
Template for a Kendall’s Tau Null-HypothesisThere is no statistically significant relationship between the median [biking event rankings] and the median [running event rankings].
Template for a Kendall’s Tau Null-HypothesisThere is no statistically significant relationship between the median biking event rankings and the median running event rankings.
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