t: G a r 



- 2,96 I 82 



<* f 



^ QR: 



— 916^' z^ 



is^ 



z 2 



= 39°. 4-4-' 





VEKERIS PER SOLEM. - 545 



Lng. X — a.pf^PP^ Log .f —2^9^99S 



L.C(){;^Q$ii: 9 991 S7 L. fin.5;G?— ^.'^SaS^ 



.^L. co"t. G 5;— 10.07644- 

 "'\ .' L 0) —2. 328^3 



G $ 1? =:: II .8' 

 Log.fin.s?— 9.8056472 L. ? <:' — 1.1410012 



Log.(?--) 71 — 1.3353540 Log.fin.G?-!;- 9 2857661 



/•^.< " : . .-!'*-;q;l ;■:_. . 



^;i';;L. ? 'i; —1.141001.2; Log.vcizzo. 4- 267673 

 rL.cof.G$ 1^339.9917489 Log. s 1=12.9699 5 o<J 



Log. ? w —1.1327501 - Log.T.?GiJir7.45 6%i6^ 

 ?0)— 13,57^5 Oi;=:9 19,57 ■ r^G-y^^-io'. 



B "G i^ ~ 49°- 23' 



* 

 " Hinc prodit aequatio finalis : 915I5.57+0, 05 1 o. $ 



■^918,40 -vnde Ozz— 2c", fi igitur ambaC' aequa- 

 tiones aequalis habeantur preti , med um fumen^o 

 ftatui poterit — — 1". Quum autem conta^n^us ex- 

 tcrniis femper muito- incertior ,aefl:imari debeat in- 

 iterno , flatuamiis errorem contadluslcxterni efle' ad 

 §um intcrni, vt 2 : —i, eriintque aequatones noftra 1 

 +0,0530.(0.-+- 2 r) rz I, 02 et -f- o, 0510. (0 — r) 

 :=; — I, 17, poneriori per i ^f- »? nr|ultiplica|a ha- 

 betur' -\- o, 0530- (0' — V)-n;'-^'"i,'>ii' ,''"cuiuF duplo '' •^''•^' 

 ad priorem addito habcmus o, i 59. d zr— *i*, 4^^ "^ '*' 

 Tnde — - 9^^ et ' r — I ^" , "."adeo vt contiftus dxter- 

 nus 28" citius eucnire delmffet ,^ contadus vero in- 

 ternus 14" tardius.. 



v^^ Toro.Xiv/N(3U.Comm.Pars.n. 2zz De 



1 



