C i88 3 
Sa Cu^rv^ Lmea ACE talis profrie^as z2=^^-^y ^ ^ iuve' 
nienda p QMiratnra fpatii A M C. Qji^renda ejt Curva AGH 
m qua fit P M==V3yii:0-z:Z qwmamhk valor in y muU 
tiflicatus continet q^iintiim q-tantitatis y dimenfio/iem^ apponantur 
omnes termini fub ilia qnnta dimenfione^ & aquentnr quadrate 
qmntttatis per X defignat<z\ unde ^quatio refultans ejl. 
nqS+mq 4y+lq?y2+kqy3+hqy4+fy5 . 
' — X 4 . atqjj Ola coejft* 
cientis (m ) determinatio ahfurdum involvet^ erur^tq* reliqu^^ 
^i^afitam definiens efi. 
AMC-~/^^q^ 4q?yg 4q:^yj j 4qy4 / ^ 
22 5p i5p 45P iTp^^sp 2 
Exem. 3. Imeniendafit Q^adratura fpatii Als^C^ definite 
4y-f 4a 
^//.^ C^w^ AGH, in qua PM=: V — m Ex pramiffis 
4y+-^a ^ 
^ ^ *7 ■ . ^ . na^v24-ma4y4-i6a< 
conftat ALmationemprimam fore — L.. ^'.J — =1% 
^ ^ ^ . ^ 4a+4y 
determinationes Coefficientium n = l^, 1=: 16 * 
•/ r L/iu • . i5a?y:^+^2a y4-i6a,5 
nimbus jiihjtitutts, ent ^qmtto - " ^ ^y^^^ — = ^4 - 
==:4a^y-|-4a4: 4^-^?^; AMC — y'aTy^^ 
Notatti d,{\:mjfimHm eft^ has ires ( fuiit infinitas alias ) Qua" 
draturas abfcijj4 AM (feii y ) nonconvenirel Quo^iam in ijttm^ 
. , modi 
