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1.2.1 Appendix.

Let us integrate an arbitrary function from to .

(A1)

Defining

as

(A2)

where

– average value of a function

on the interval from

to

,

. Then equation (A1) can be rewritten as

(A3)

Considering a Taylor series expansion of the integrand (A3) in and neglecting

and higher order members, we get

(A4)

The second term in (A4) vanishes upon integration, therefore (A4) can be expressed as

,

(A5)

where the correction factor is

(A6)

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