P R O B L E M A T V M. rai 



ct P- — i:-/Mfe4-2^^-8//-3A^A:_ n7^Z7fj~kk 



tum \ero r- — ^lTJTq-lTT^irfei) » vnde fit 



;.rryp, ^^=-^±^--^^-^=^^ et r-^QVV 



ct aeqiiationis 5;*— /)5;s-f-^^— r:::::© radices dant 

 latera trianguli quaefiti : quae aequatio pofito Z-jVP 

 abit in hanc : 



j_ , (2e*^ f*-i.k*—eeeff. ^^eehk- h^ffmy—ff(kk^zee—ff) 



y J'J'~i~ 4e*~t-i'f*-i-ik*—iieeff—ieekli-i-2jjkk — "• 



31. Hic autcm obferuo quantitates has datas 

 e, /, k non folum ita affiimi oportere , \t triangu- 

 lum conflituant , fed <]uoniam hitcra triangnli quae- 

 fiti a, b, c tanquam pofitiua fpcftari pofifunt , etiam 

 tam P quam Q^ ct R \'alores pofitiuos rcciperc de- 

 bent. Non fohim ergo eHe debet kk<^zee~i- zff 

 fed etiam kk^ s.ee-^-ff, tum vero vt P fiat pofi- 

 tiuum , necefle eft 



fit tikk^^ee-i-ff-hfiVie^-^Jieeff-Sf) 



qua conditione cum illis coUata fequitur efle debere 



ff>hee uff<'-^t—ee{tnff<^^-iee 

 alioquin problema nuHam admitterct fohitionem, 



f\ fJ{kk ~. zff) 



VL — *Jf—kk 



ft P — _»!£L. /r/r ^1.1.^ 3 ik h - ff)^ ^ aa (kk-rff)* 

 " ^- *ff-^k-^^-Zkk-jjjzzw '■> atque Tr=,-wy-:^) 



ideoaue i^— '-^l?'^ k*-fik k-zS* ^_Sfm-^{kk-ffWz 

 Tom.XI.Nou.Comm. Q^ fit 



