228
NACHLASS.
A H(g+ 6—a) II ( 2) -n II (g + 6 — j) n (— -§)
n(g—i)D(6— i) ’ D(g—1)11(6 —l)
Hinc colligere licet, esse
[107] F{2 a, 26, a —J—6 —J— -J-, = AF{a, 6, 4-, #) — H\/<*?.F(a+|-, g + i>ih ®)
Qnodsi cui haec conclusio haud satis legitima videatur, (quam tamen extra
omne dubium collocare haud difficile foret) ad eandem aequationem sequenti modo
pervenire possemus. Ex aequatione 87 iit
F{2 a, 26, a+ 8+4, !±^) = C-F(2a, 26, a+8+4, '-=^)
+D C~)■-“-« F[ 1 — 2 a. 1 — 2 6. f— a _ 8. '-=±)
statuendo brevitatis caussa
p II (g ~t~ 6 — \) II ( \ g — 6) ~r\ H(tt + 6 —f)II(g + 6 —f)
II(g — 6— £)II(6—g — £) ’ II(2g—1)11(26—l)
Ex aequatione 104 autem facile deducitur
-F(l—2a, 1 — 26, f—a —6, = F[\ — a, f—8, f — a — 6, 1 — *)
= EF($—a,i — 6,i,x) + G\/x.F{l—a. 1—6,*,®)
statuendo brevitatis caussa
p— a —6)fl(—j) p II (f — g— 6) II (—-|)
" — II (— g) II (— 6) ’ ^ — H(—i-g)Il(—i-6)
Hinc rursus sequitur per aequationem 8 2
.F(l —2a. 1 — 28,1— a—8,1=^)
= £(l_®)' l + i -*f’(a,6,+,®)4-C?v/®.(l-®) , ‘ +8 -*i’(a+|-, 8+4, f,®)
His substitutis colligitur statuendo
AC-\-DE2 2a + 26 ~ 1 = J*f, 5C-j- D G2 2a + 2§_1 = JV
-F(2a, 28, ct+6 + 4, i±^) = 8, 4, ®) + 2\ty® ..F(a+4, 8+4-, f, x)
cuius forma convenit cum aequatione 107. lam possemus quidem e sola natura
functionis II derivare M = A, N= —B, quum per aequ. 55, 56 facile demon
stretur, esse
cos(g—6) i:
D E1 ia +i6-t
2 sin g 7t sin 6 7Ü
D G 2 г “ +s6 ’- ,
cos(g-j-6)Tt’
A
cos (g +6) 7i ’
B
2 cos g Tr cos 6 r.
cos (g -(- 6) 7i