Answer:
The method is accurate in the calculation of the [tex]Cu^+2[/tex]
Explanation:
As a first step we have to calculate the average concentration of [tex]Cu^+2[/tex] find it by the method.
[tex]\frac{0.782+0.762+0.825+0.838+0.761 }{5} =0.79 ppm[/tex]
Then we have to find the standard deviation:
[tex]s=\sqrt{\frac{1}{N-1}\sum_{i=1}^N(x_i-\bar{x})^2}=0.0359[/tex]
For the confidence interval we have to use the formula:
μ=Average±[tex]\frac{t*s}{\sqrt{n} }[/tex]
Where:
t=t student constant with 95 % of confidence and 5 data=2.78
μ= [tex]0.79[/tex] ± [tex]\frac{2.78*0.0359}{\sqrt{5} }[/tex]
upper limit: 0.84
lower limit: 0.75
If we compare the limits of the value obtanied by the method (Figure 1 Red line) with the reference material (Figure 1 blue line) we can see that the values obtained by the method are within the values suggested by the reference material. So, it's method is accurate.
