t . Q — f?ni (m — i) .y"' — ' p"- ' ct 



^ . R ;// n (m — i) a'" — - /y -' , 



qiii diio Milorcs manifcfto congruunt. Ex fccundo autcm tlieo- 

 rcmiue /jl ~ 2 ct y nz i fict 



Q=-^~Vr:z LjI et R z= - V z: ///^" " ' a-^ 



.V (/// -+■ 1) (/// -+-2) ^ 



Hinc crgo crit 



.V™- 



p (/// -+-1; (/// -+- 2) .V (;/;-+- \) (m -+- 2) 



Ex tcrtio thcorcmatc, mancnte ,a in 2 ct k zz: i, crit 



O = ^' . V = ///(/// — 1) A-'" -==/>" ct R = /- Vn ^" ' •^'"' 



Hinc igitur erit 



r ^ m (/// — I ) .v"^ - * /)" -^ ' 

 •i- Q zi: — ^ 1 ct 



p // H- I 



D- j, _ /// (/// l) .V"' - = pn -4- 1 



.Y ;/ -|- I 



Ex qunrto dcniqnc theoremarc crit 



Q = L V zz: _^ l ct R z= L V = '\J- 



p (///-+- 1) (///-H 2 j p n -\- i 



Hinc crgo colHgitur: 



■/ Q = P ct -^- R - •'' ^ 



p (// H- 1 )(;//-)- 1 ; (^///-t- 2 j .Y (//-(- I ;(///-+- 1 ^ (/;/-t- 2 j 



Ob has igitur acc]ualitates adco identicas nuJlae conclufioncs 

 hinc dcduci poH^c vidcbnnrur. Vcrum longc alitcr fe res ha- 

 bcre dcprchcnditur , fi pofi; omncs opcrationes inlliiuras ipfi x 

 detcrminatus \alor, \cluti .vz:i, tiibui dcbcat, qucuiadniodum 



in 



