355 



P 

 m 



Q 10 



Miller Des-Cloizeaux Des-Cloizeaux 

 in Bezug auf unsere in Bezug auf seine 



A _ - A Grundform Grundform 



0.0.1 = p = 



i.i.o = m = 



1.0.0 = h 1 = 



1.0.7 = a 7 = 



1.0.5 = a 5 = 



1.0.1 = a i = I2 

 2.0.1 = aV2 



3-0.1 = a y 3 = aVs 



1.1.14 = b 7 = b u 



1.1.10 == b 5 = b 10 



1.1.9 = b 9 / 2 = b 9 



1.1.8 = b * = b s 



1.1.7 = b 7 / 2 = b 7 



1.1.6 = b* = w 



1.1.5= b 5 / 2 __ ^5 



1.1.4 — b 2 = b 4 ) 

 5.5.19 = hiö/iü = b 19 l 5 

 2-2.7 = b 7 /4 = b 7 / 2 

 1.1.3 = b 3 / 2 = b 3 



2.2.5 = b% = b 5 /2 



3.3.7 = b 7 / 6 = b 7 / 3 



I. 1.2 b « = h 2 

 3.3.5 = b 5 /6 = b 5 /3 

 2-2.3 == b 3 / 4 = b 3 / 2 



II. 1 = b*/ 2 = b 1 



15.15.8 = b */i5 = b«/i5) 



2- 2.1 = b*/4 = bi/2 j 



3 - 3 -l = b'/« m bV3 



5.1.19 = b l k b J /e hViQ = b ! /2 b l / 8 Mfr9 

 D.I. 20 == bV4 b'/ 6 h^o = bV2 bVa h%o 

 3.1.9 = b l l2 b>/4 h 1 /» = b 1 b l l2 h l l9 

 3.1.3 = bV2 b l /4 hVs = b 1 b»/2 hVs 

 5.3.2 = b» b»/4 h 1 = bi b»/4 h 



5.3.20 == b 1 b>/4 hVio = b 1 b!/4 h 



12 



.'20. 



23* 



