[5] 106 (g+£)x2 4 Cx 1- 1+A0 i ux + ^“(l+Ao)- (1+Ao)2 (1+ ^ 0 + Ao) b-\-4a 2a í n y2 \ö+^a ■ Ckll + ^-d + ^Ur-* (o—V2)/ 1 V. (0-V2)/ (0+V2)/ + flX'* Ö+6 2 \(o+V*)/ 2c (0+V2)// &+■<« ríi i öJCVi Í * \\- "tf' í o ax* 2a(o+2) +é\ =c, 1+-2-o+a„) * - fc+is>+T • ■ 2æ+wr Ci flX3 ö+ía (l +Ao) 2a (0+1/.)/ , fl^ L . ax* , A + 1-(1 + ^(l+Ao)) \ i+*L o + 2 + Ó+ö 2a (o+«/*)/ =0 We observe that the nth term of the A\- series of the latest written basal function is offset by the (fl+l)f/i term of the preceding series, while the first term of this series is zero. We have considered the factor C of the precedent^solu- tions as constant and, therefore, independent of n which is correct so long as n is a whole number. However, it is frequently convenient to drop this characteristic of n Now if we change n to fl+a where a is an intermediary quantity between o and 1, C may assume a new value that remains constant as long as n is a whole number. It is tempting to change n to /Z+V2 in (65), we must, however, remember that C, at the same time, gets a new value. In what follows we shall replace C by K when we wish to indicate that K represents an arbitrary functiou of n with period 1. If the period is 2 we write K<2> and so on. Re- caliing that C in (65) actually should be K the introduc- tion of /í+Va for n entails a new value on C. We have, therefore,

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