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Alexey Trofimov · Answer 1 · 2023-08-19T09:14:32+0000

Given:

The sample is

Find-:

The sample mean and the median

Explanation-:

The mean formula is

$\text{ Mean }=\text{ }\frac{\text{ Sum of observations}}{\text{ Total number of observations}}$

So, mean is

$\begin{gathered} \text{ Mean }=(4+8+14+7+0+8+2+10+3+12)/(10) \\ \\ \text{ Mean }=(68)/(10) \\ \\ \text{ Mean }=6.8 \end{gathered}$

The mean is 6.8

The median is:

Total number of observation (n) = even

So, the median is

$\text{ Median }=\frac{((n)/(2))^(th)\text{ term}+((n)/(2)+1)^(th)\text{ term}}{2}$
$\begin{gathered} n=10 \\ \\ (n)/(2)\text{ term }=(10)/(2)=5\text{ term} \\ \\ 5\text{ terms }=0 \\ \\ ((n)/(2)+1)\text{ terms }=6\text{ terms} \\ \\ 6\text{ term }=8 \\ \\ \end{gathered}$

The median is:

$\begin{gathered} \text{ Median }=\frac{((n)/(2))^(th)\text{ term }+((n)/(2)+1)^(th)\text{ term}}{2} \\ \\ \text{ Median }=(0+8)/(2) \\ \\ \text{ Median }=(8)/(2) \\ \\ \text{ Median }=4 \end{gathered}$

The median is 4

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