The number of degrees of freedom associated with

Braden Hatfield

Braden Hatfield

Answered question

2022-04-10

The number of degrees of freedom associated with the chi-square distribution in a test of independence is
a. number of sample items minus 1.
b. number of populations minus number of estimated parameters minus 1.
c. number of populations minus 1.
d. number of rows minus 1 times number of columns minus 1.

Answer & Explanation

aludirao09au

aludirao09au

Beginner2022-04-11Added 11 answers

Chi-square test of independence:
A single simple random sampling is done with each individual being classified based on the two categorical variables. Then, the hypothesis testing is carried out to check whether there is any relationship between the two categorical variables. This test is called as chi-square test of independence.
Degrees of freedom=(number of rows-1)*(number of columns-1)
The number of degrees of freedom associated with the chi-square distribution in a test of independence is,
Correct option:
d. number of rows minus 1 times number of columns minus 1.

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