606 
JR Pe B” 1} 
Ir ae Va WHE das. 
ah Tr, S/n 
may be considered as containing the highest ratio of the critical tem- 
peratures of the two components at which minimum critical tempe- 
rature is still found. 
If this ratio is smaller, there is a lowest value of 7% for certain 
value of w. At exactly the ratio given by the formula, this lowest 
value is either at e—O or at e—1. And that in these two cases 
the ratio of the critical temperatures is the same, is the consequence 
(B“n--1)° be 
NC to have the same value for ED instead of 
for n. Only if / should have a different value, the equality of 
Tr Tr, gia 
- ei no longer hold. 
Tr, fie 
Hence it is necessary to calculate Ware or VA “to find 
E 
b 
—*—. In the above given table, in which the values of ae have 
Vb,6, . b, 
mie et 
been given for different value of 7, we must divide os byVn. And 
1 
this greatly reduces the value for large value of 7, but it always remains 
larger than 1. It follows from this that 6,, >W0,),. For small values 
of n it is nearly 1. For the above given values of Pn, I have calculated 
of a property of 
b : sets : 
the value of ea and that of Vn, and given it in the following table. 
n 13381 1,28 2,197 2714 3875 4,098 4,913 536 5832 6859 8 
? ? 
ba 115% 1981 152 1,728 1,953 2,197 244 26 2744 3048 3,375 
1 
Vn 1J576 1318 1482 1,656 1,887 2923 293 ZR PA 262° Pa 
bie 
1 101 1,027 1,044 1,063 1,086 10% 12 1,18 117 1,19 
V bibs 
> 
oh Die 
Before applying the formula / Wi to the system water 
1 2 Vb 
ether, I first wanted to examine what value would follow for / with 
the values a,, a,, and m, at which I had arrived in a previous 
investigation. I had concluded to an exceedingly small value for «,, 
and to a value little below 6 for ¢,, while I had come to a value 
lying between 5 and 54 for n. 
If we again. put a,,=//a,a, anda, =S Je, anda, — (+e) 
as b,, laa, _ ae ly(1- eyes: bi: 
In == We Sn AE 
or 
a, bf a, eben (Ale de Vanes 
