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The sample standard deviation of a set of numbers is calculated below. Fill in the blank for the missing part of this calculation.

The Sample Standard Deviation Of A Set Of Numbers Is Calculated Below Fill In The Blank For The Missing Part Of This Calculation class=

Sagot :

The table given shows the calculation of the variance and standard deviation of a given sample.

The formula for the variance is given as shown below;

[tex]\begin{gathered} S^2=\frac{\Sigma(x_i-\mu)^2}{n-1} \\ \text{Where;} \\ S^2=S\tan dard\text{ deviation} \\ \Sigma=Summation(addition) \\ x_i=value\text{ from observed data} \\ \mu=\operatorname{mean}\text{ from the observed data} \\ n=\text{sample size} \end{gathered}[/tex]

When we substitute for the values given, this becomes;

[tex]\begin{gathered} S^2=\frac{\Sigma(x_i-\mu)^2}{6-1} \\ S^2=\frac{361+196+4+36+9+16}{5} \\ S^2=\frac{622}{5} \\ S^2=124.4 \end{gathered}[/tex]

Therefore, the missing value is 622.

This is the addition of each observed data minus the mean (that is, the addition of the third column).

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