Consider the following claim:
$\begin{array}{l} H_{0} : ρ = 0 \\ H_{a} : ρ \neq 0 \end{array}$

If $n = 13$ and $r = 0$ compute $t ⋆ = r \sqrt{\frac{n - 2}{1 - r^{2}}}$

Note: Round your answer to TWO decimal places.

Answer

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Answer

The computed value of $t$ is $0.00$

Steps

Step 1 ：Consider the following claim: $\begin{array}{l} H_{0} : ρ = 0 H_{a} : ρ \neq 0 \end{array}$

Step 2 ：We are given that $n = 13$ and $r = 0$

Step 3 ：We are asked to compute $t ⋆ = r \sqrt{\frac{n - 2}{1 - r^{2}}}$

Step 4 ：Substitute the given values into the formula to calculate t: $t = 0 \sqrt{\frac{13 - 2}{1 - 0^{2}}}$

Step 5 ：Simplify the expression to get the final answer: $t = 0.0$

Step 6 ：The computed value of $t$ is $0.00$