Geometric mean of $$$22$$$, $$$24$$$
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Find the geometric mean of $$$22$$$, $$$24$$$.
Solution
The geometric mean of data is given by the formula $$$\left(\prod_{i=1}^{n} x_{i}\right)^{\frac{1}{n}}$$$, where $$$n$$$ is the number of values and $$$x_i, i=\overline{1..n}$$$ are the values themselves.
Since we have $$$2$$$ points, $$$n = 2$$$.
The product of the values is $$$\left(22\right)\cdot \left(24\right) = 528$$$.
Therefore, the geometric mean is $$$\sqrt{528} = 4 \sqrt{33}$$$.
Answer
The geometric mean is $$$4 \sqrt{33}\approx 22.978250586152115$$$A.