Answer:
[tex] s^2 =\frac{(0.09-0.1)^2+(0.1-0.1)^2+(0.11-0.1)^2+(0.13-0.1)^2+(0.09-0.1)^2+(0.11-0.1)^2+(0.1-0.1)^2+(0.07-0.1)^2}{8-1}=0.000314[/tex]
So then the best answer would be:
0.00031
Step-by-step explanation:
We have the followinf dataset:
0.09, 0.10, 0.11, 0.13, 0.09, 0.11, 0.10, 0.07
For this case we want to calculate the sample variance. But in order to calculate it we need to find first the sample mean given by:
[tex] \bar X = \frac{\sum_{i=1}^n X_i}{n}[/tex]
And if we replace we got:
[tex] \bar X = \frac{0.09+0.1+0.11+0.13+0.09+0.11+0.1+0.07}{8}=0.1[/tex]
Now the sample variance can be calculated with the following formula:
[tex] s^2 = \frac{\sum_{i=1}^n (x_i -\bar X)^2}{n-1}[/tex]
And if we replace we got:
[tex] s^2 =\frac{(0.09-0.1)^2+(0.1-0.1)^2+(0.11-0.1)^2+(0.13-0.1)^2+(0.09-0.1)^2+(0.11-0.1)^2+(0.1-0.1)^2+(0.07-0.1)^2}{8-1}=0.000314[/tex]
So then the best answer would be:
0.00031
Answer:0.00031
Step-by-step explanation:
Firstly find the mean
Let m be mean
Mean= sum/ n
M=(0.09+0.10+0.11+0.13+0.09+0.11+0.10+0.07) / 8
M= 0.10
Variance= |x-m|^2 / n-1
For 1st: |0.09-0.10|^2 = 0.0001
For 2nd: |0.10-0.10|^2 = 0.000
For 3rd: |0.11-0.10|^2 = 0.0001
For 4th: |0.13-0.10|^2= 0.0009
For 5th: |0.09-0.10|^2 = 0.0001
For 6th: |0.11-0.10| ^2= 0.0001
For 7th: |0.10-0.10|^2= 0.0000
For 8th: |0.07-0.10|^2 = 0.0009
Variance= |x-m|^2 / n-1
Variance=0.0022 / 7
Variance= 0.00031
