385 « C A P V T X.

II. o =r.n>. A + w. B.

+ 2@U.C + (@U+SU)D + 2SU.E

+ (|fin.p+V s rin. 3p)U( i +D )

+( —|cofp + Vcof. 3 p)U( i+O)

+ (-1 cof.p 4-'/ cos. 3 P ) U O.

4-(|fit> p — Vfln- 3p)UO.

+(-yfin Up—0 + |Gn.(2p + f))@

+ (|cof f —"cof. 2 p —f+ |cof. 2 p + f )S+(-Sfin/p-0-3fin.p+0“Vfin.(3p-;)+ , /fin.(3p+0)'i+2O+O*)+(?cofp-M-§col.p+J-Vcof.3p-f+ V s cof.3p+0) O+OO)

+(- Vfin.p - t-S Cubp +5 +- V fm.3 p-t- y fi u>3 p+;) 0 %

$. 368 .

Hic ante omnia diftinguere debemus ea prodii fla,quae vtrique aequationi funt communia , ab iis, quaein alterutra (eorfim occurrunt: quocirca primum euol-vamus membra vtrique aequationi communia:

^ I. 2 0 II dat

+-o,oo2 5.cof.p —? + o,oo3 3.co(. 3 p — t— 0,001 2. Co(ip + ; — 0,00 04-. cof. 3p+f

cuius multiplicatores pro

prima 5 +- 5 37> 6335+- 15, 44.26. cof. 2 p.fecunda c + 10, 9814- fin. 2 p.

k

ir.