s 3 S C N $ I D E R J T I O. 



vel etiam per Theor. IL 



^ -b + kzz^ kVjk fk-gh K Vg(-h+kzz)J_Jk-gbJ 

 Cafus VII. ffcv£^~, exiftente/*<££ 



Integrale eft per Theor. III. 

 gz h-HzJgh-fk) fk _/ Vf{b-kzz )_ \r___fkn 

 * k J-gzz kVjkgh-jk\Vh(J-gzz) l JLgb'fkJ 



Cafus VIII. f d z y ~l Tkzz ' cxiftente /*<^ 

 Integrale eft per Theor. II. 

 f.^-fe- f „z1>-fk( V(gb-fk) \r-&±fkri 

 ~-^ ZY b-kzz V(gh-jk) Jk ^Vg(h-kzz) J_ Jk J 

 vel etiam per Theor. V. 



c J\r b ~ kzz , / _ jjgb-fks zVfgb-fk) yf-gb+fk-l 



- k -f+-gzz^V(gh-fk) n Jk^Vbtf+gzz)' 1 )^ jk J 



Cafus IX. y^yi±|£5, exiftente fk*>gb 



Integrale eft per Theor. X. 



(fk-gh)z f+gzz (fk-gb) fk zVk xr/fc-l 



gb b+-kzz" kVfk gb K V(h+-kzz))LghJ 



. / n /fo*Y V( ^ + g* s > \r_?±^i 



■ +- V(/*-££) U *j ^ V/ " X <L gb J 

 ▼el etiam per Theor. XIII. 



(fk-gb)z h-+kzZ (fk-gb) fk Vf yffk-l 



~~ bk f+gzz* kVfk gk { V(f+ g zz))VghA 



_ f fk-gh ( V(b+kz z) . r -fk-+gb -_ 



**(/*■**) &*~* y b ~*'- gb J 



Cafus X* 



