) 382 ( §.c^<- 



prior ]*n fin. /, pofterior in cof. r dudla, prodiicent has 

 quantitates —0,7325; —9,9578, quarum fumma per 

 binarium multiplicata efl: — 21,3806, terminus autem 

 ^io, io26rin. r dabit -f- 4, 1525, vnde ex his binis in- 

 tegrahbus confequimur terminum — 17, 2285. Atqui pro 

 p — 150°, dat 



— fin.//P. 1. ^f.=— I, 1789; co(. t f ?. \\. dt. — s, ^261 y 



differentiae duplum eft 8, 49+8 ; atqui terminus ex 



— 10,1026 fin. t refultans inuenitur -\- 8,732^» ideoque 

 hinc deducitur quantitas -{- 17, 2270, qu^e * negatiue 

 fumta ab illa pro angulo p ::=: 210", vix differt. Vlterius 

 quum pro p — 200° , fit 



/P. !.<//=— I, 761 1 et /P. II. dt~- 10, 8226, 

 habebimus 

 -fin./yP.T. ^f— -1, 1380 et cof.//P.lI.^f=:-8, 2597, 



ideoque horum fumme duplum — — 18, 7954 1 atqui 



— 10, 1026. fin. ; dat -f- 6, 5282; differentia igitur eft 



— 12, 2672. Pro p— 160°, inuenimus 



— fin./ /P. !.</;-+- cof.//P. II. </r=: 4- 1,2358, 

 cius dupium eft -4-2,4716 et — 10, 1026 fin. ; praebet 

 -H 9» 7945 » fumnfia igitur habetur -}- 12,2661, quae ne- 

 gatiue capta a termino pro p zz. 200° inuento, vix tantil- 

 lum diffcrt. His igitur experimentis nunc comprobatum 

 eft, calculos noftros fatis bene fe habere , tumque fimui 

 euidum, valorem pro Cf)' inuentum ope huiusmodi termi- 

 ni -i- 40, 3623. 4 - 10, 1026. fm. t corrigi debere. 



§. 20. Quum in integrali valorem ipfuis (p' ex- 

 primente, terminus N (in.t cx integrali 



- 2 fin. tfdt{2V cof. t -+- U firr. t) 



origi- 



