46 ^^i"t- 4*. — INI. Kniiiyt'da : 



T (*) — PJ^) 0(1) = 0(\/ä) 



27- Iiitroducing the results of §§ 23, 25 and 26 into (40) and 

 (41). we obtain : 



In the case (i) 



^'^'^ = «Ji^J'W} (coBO>+i::V^ + o(l)]; 

 in the case (ii) 



Similarly we obtain : 

 In tlie case (i) 



"^■■'^'^ = öJ{'2% -)Y ^'"' ^'^^'^""^ ^""^ '^^^^ ' 



in the case (ii) 



I 



Now we can state 



Theorem V. //" ,/■' < /> < a- or i> = Ax{l-\- jix) ] , where /i > 0, 

 ()>Q and /><1, ^Ae?2 



'^-^^^ = dJito'Xd)} ^"^^ 0?+l^)v/^+o(i)] + 0(1/;.), /,(/) = o(i/>î), 



'^'^'^ = dj[2a''(d)} ^'"^ C/^ + i^) V:r + o(1)] +0(1//;), /,(/) = 0(1/^); 

 //* x-<f><xa' or f) = Ax[\—Ji{x)], where A>0, J>>0 avd /7< 1, then 



"^"^'•^ = lV0m ^"" ^''+ '"^ V-+ »(')} . '^A-^) = ^;,^ ■ 0(1); 



