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When Performing a Rank Correlation Test, One Alternative to Using $r _ { S } = \pm \sqrt { \frac { t ^ { 2 } } { t ^ { 2 } + n - 2 } }$

Question 70

Multiple Choice

When performing a rank correlation test, one alternative to using the Critical Values of Spearman's Rank Correlation Coefficient table to find critical values is to compute them using this approximation:
$r _ { S } = \pm \sqrt { \frac { t ^ { 2 } } { t ^ { 2 } + n - 2 } }$
where $\mathrm { t }$ is the $\mathrm { t }$ -score from the $t$ Distribution table corresponding to $\mathrm { n } - 2$ degrees of freedom. Use this approximation to find critical values of $\mathrm { r } _ { \mathrm { S } }$ for the case where $\mathrm { n } = 17$ and $\alpha = 0.05$ .

A) $\pm 0.311$
B) $\pm 0.482$
C) $\pm 0.411$
D) $\pm 0.480$

When Performing a Rank Correlation Test, One Alternative to Using rS=±t2t2+n−2r _ { S } = \pm \sqrt { \frac { t ^ { 2 } } { t ^ { 2 } + n - 2 } }rS​=±t2+n−2t2​​

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When Performing a Rank Correlation Test, One Alternative to Using $r _ { S } = \pm \sqrt { \frac { t ^ { 2 } } { t ^ { 2 } + n - 2 } }$

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