7^ METH. mTEG. FORM DIFhERKM, RAlION. 



/ 



•n— m-f-i 



quac formuhi cum ea , quam in folutionc problcmatis i. 

 h:\buimus, it:i congmit , vt fi ibi loco 2;; ponamus aw 

 -+- 2 , prcxicat hacc nollra ncgatiuc liimta. Ili» confidc- 

 ratis , fi fit (J) arcus circuli , cuius cofinus cft nz ^ , cx 

 fjftorc trinomuli i-\-px-\- <j[xx orictur idx intcgnilis p.irs: 



— ^ ^ / ( I H -px -i- ^.v.v ) -h 



_fin._A (j_«-w4-0$ ^ ^^^ ^^ 



\bi figna fupcrioni v.ilcnt , fi ;;; fit numcms jxu' ", infcnora 

 \cro , fi ;;; fit numcrus impar. Supcrcll igitur , vt in fic- 

 tores trinomialcs denominutoris i — .v^"'*'' inquiramus , 

 ex quibus ob i— .v.v fidorcm iam in computum ducflum 

 conftct producflum : 



i-1-:v=-^-a;*-|-.v*-H -h .v''* 



Hacc forma , ll cum thcorcmatc in folutionc primi pro 

 blcmatis allcgato C(wparctur, crit altcinatim a-.o, /^z^i, 

 f — o , </r:i i , ctc. At quotl ad tcrminum mcdium atti- 

 nct , qncm pofuimus ;/;.v", crit Atiquc ;;j zr i , fi ;; fit 

 numcnis par ■ at crit w~o fi ;; fit numcrib impar. 

 Qiwrc diK) cafu") (iint tiaiftandi, altcr (|U() ;; cll nnmcru* 

 par , qui dat hanc ncduationcm : 



cof.A.«\l>-;-cof. A(« s)^'-}- coC. A{}}'^)\y-\- -\- 



cof A2\|^-|- ; — o 

 altercaiiis, (juo ;? cCl uunicrus impar, dat hatw; ac(]u:uio- 

 nem : 



cofA. 



