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Scholium 5 . 
Si forte termini minores defiderentur, qui eandem proxime Rati- 
onem Modularem ita exhibeant, ut nulli ipfis non majores propius; 
inftituenda erit operatio ad modum fequentem. Dividatur termi- 
nus major 2>7 'Si8&c. per minorem 1, vel etiam major 1 per mi- 
norem 0,367879 &c. & rurfus minor per numerum qui reliquus eft 3 
& hie rurfus per ultimum refidaum* atque ita porro pergatur : 6: 
Rationes Vera Majores* 
Rationes Vera A'finores. 
1 
oX 2 
0 
1 
2 
1 
z 
0 
5 
1X2, 
2 
1 X 1 
8 
3 
<5 
2 
11 
4X1 
8 
5X1 
7 * 
28 
1 1 
4 
87 
32X1 
19 
7 X 4 
10(5 
39 
87 
3 * 
* 9 $ 
71X6 
106 
39 Xi 
1264 
465 
1158 
426 
1457 
536X1 
1264 
4^5X1 
21768 
8008 
r 457 
536 
23225 
8544X1 
2721 
1001 X 8 
25946 
9545 
23225 
8544 
49 I 7 I 
18089X 10 
25946 
9545X1 
&c. 
&c. 
&c. 
&c. 
prodibunt quotientes 2, 1, 2, 1, 1, 4, 1, 1, 6, 1, r, 8, 1, r, 10, 1, 1, 
12, 1, 1, 14, 1, 1, 16, 1, 1, &c. His inventis, perficiends funt bins 
rationum columns, quarum altera terminos continet rationem habentes 
vera majorem , altera terminos quorum ratio eft vera minor; in- 
eundo computational! a rationibus 1 ad o, o ad 1, qus remotiffims 
funt ^ vera; inde autem exorfam deducendo ad rationes reliquas, 
qus 
