Answer:
Step-by-step explanation:
The variance is defined by
[tex]\sigma^{2} =\frac{\sum (x-\mu)^{2} }{N-1}[/tex]
Where [tex]\mu[/tex] is the mean and [tex]N[/tex] is the total number of rings.
First, we find the mean
[tex]\mu = \frac{9+7+6.5+7.5+7+8+5+6+7.5+8}{10}=\frac{71.5}{10}=7.15[/tex]
Then, we subtract the means with each element
[tex]9-7.15=1.85\\7-7.15=-0.15\\6.5-7.15=-0.65\\7.5-7.15=0.35\\7-7.15=-0.15\\8-7.15=0.85\\5-7.15=-2.15\\6-7.15=-1.15\\7.5-7.15=0.35\\8-7.15=0.85[/tex]
Now, we elevate each difference to the square power
[tex](1.85)^{2} =3.4225\\(-0.15)^{2} =0.0225\\(-0.65)^{2} =0.4225\\(0.35)^{2} =0.1225\\(-0.15)^{2} =0.0225\\(0.85)^{2} =0.7225\\(-2.15)^{2} =4.6225\\(-1.15)^{2} =1.3225\\(0.35)^{2} =0.1225\\(0.85)^{2} =0.7225[/tex]
Then, we sum all these results
[tex]\sum (x-\mu)^{2}= 11.525[/tex]
Now, we replace in the formula
[tex]\sigma^{2} =\frac{\sum (x-\mu)^{2} }{N-1}=\frac{11.525}{10-1} \approx 1.28[/tex]
Therefore, the variance of the data set is 1.28, approximately.
