To solve the problem we must know about the critical probability.
The critical probability when the confidence level of 58% is 0.79.
It is the essentially cut-off value that defines the region where the test statistic is unlikely to lie.
Given
The confidence level is 58%.
It is the measurement statisticians use to calculate the margin of error within a set of data and is expressed as
[tex]\rm Critical\ prebability\ (p*) = 1 - \dfrac{\alpha }{2}[/tex]
where,
[tex]\rm \alpha = 1 - \dfrac{Confidence\ level}{100} \\[/tex]
The confidence level is 58%.
Then
[tex]\rm \alpha = 1 - \dfrac{Confidence\ level}{100} \\\\\alpha = 1- \dfrac{58}{100} \\\\\alpha = 0.48[/tex]
Then the critical probability will be
[tex]\rm Critical\ prebability\ (p*) = 1 - \dfrac{\alpha }{2} \\\\\rm Critical\ prebability\ (p*) = 1 - \dfrac{0.42}{2} \\\\\rm Critical\ prebability\ (p*) = 0.79[/tex]
Thus, the critical probability is 0.79.
More about the critical probability link is given below.
https://brainly.com/question/5625386
