The population variance of the given data set is approximately
12,586,806.0074.
To calculate the population variance, follow these steps:
Find the mean (average) of the data set.
Subtract the mean from each data point and square the result.
Find the average of these squared differences.
Let's go through the calculations:
Find the mean:
Mean= ∑_i=1xi/n
Mean= 25431+26451+…+39391/15
Mean= 490645/15
Mean=32709.6667
Subtract the mean from each data point and square the result:
(25431−32709.6667)^2 =52468423.5556
(26451−32709.6667)^2 =3895568.5556
…
(39391−32709.6667)^2 =4410839.5556
Find the average of these squared differences:
Variance= ∑_i=1 (xi −Mean)^2/n
Variance= 52468423.5556+3895568.5556+…+4410839.5556/15
Variance= 188802090.1111/15
Variance=12586806.0074
So, the population variance of the given data set is approximately
12,586,806.0074.