Amount intervals transformed method

We will describe an accurate statistical method that includes a full assessment of error in the overall calibration process, that is, (I) the confidence interval around the graph, (2) an error band around unknown responses, and finally (3) the estimated amount intervals. To properly use the method, data will be adjusted by using general data transformations to achieve constant variance and linearity. It utilizes a six-step process to calculate amounts or concentration values of unknown samples and their estimated intervals from chromatographic response values using calibration graphs that are constructed by regression. 

Differences in calibration graph results were found in amount and amount interval estimations in the use of three common data sets of the chemical pesticide fenvalerate by the individual methods of three researchers. Differences in the methods included constant variance treatments by weighting or transforming response values. Linear single and multiple curve functions and cubic spline functions were used to fit the data. Amount differences were found between three hand plotted methods and between the hand plotted and three different statistical regression line methods. Significant differences in the calculated amount interval estimates were found with the cubic spline function due to its limited scope of inference. Smaller differences were produced by the use of local versus global variance estimators and a simple Bonferroni adjustment. 

Wegscheider fitted a cubic spline function to the logarithmically transformed sample means of each level. This method obviates any lack of fit, and so it is not possible to calculate a confidence band about the fitted curve. Instead, the variance in response was estimated from the deviations of the calibration standards from their means at an Ot of 0.05. The intersection of this response interval with the fitted calibration line determined the estimated amount interval. 

Figure 8.13 Idealized plots according to the Method of Standard Additions. Each point plotted is assumed to be the mean of several replicate determinations. The traditional method (left panel) simply plots the observed analytical signal Y vs the amount of calibration standard added x (the black square corresponds to the nonspiked sample, Y = Yq), and estimates the value of X by extrapolation of a least-squares regression line to Y = 0 (see text) however, this procedure implies that the confidence interval at this point (not shown, compare Figure 8.12) has widened considerably. By using a simple transformation from Y to (Y-Yq) the extrapolation procedure is replaced by one of interpolation, thus improving the precision (more narrow confidence interval). Reproduced from Meier and Ziind, Statistical Methods in Analytical Chemistry, 2nd Edition (2000), with permission of John Wiley Sons Inc.

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