Tibl« I . " TnfOT^tion an &H* Standard* (pag* 9) 



Analyses 

 curv« 



pos 1 1 X on 



s« 



Yp ■ X trinjfonii' Sijn of J, 

 Exponent itfasured ■ to ba fitted under least 

 at X • : bv least jouares ■ (diiirnt fit 



A 



-'l 1.0 < n < 20.0 I fxi" . 

 ■'^^ -'3 -J. 00 < n < -O.Ol X (X -J)" 





. I ) (Xp-X)" • 



\ 2 ) As »bov« pC)" 



\^ 3 ) O.OIX (X)" 

 1 p 



C 



1 ) X (X -X)" 



— p p 



2 ) Aj abova (X)" 

 ' 3 ) X fXl" 



D 



1 ) (I)" 



^\ 2 ) Aj »b<jv« (X -X)" 

 \ 



> 3 1 O.OIX rx -xi" 



P P 



achieve the specified positions for so«e of the sets, the X-scale auat be 

 reversed before applying the exponents as indicated here. 



-±tIAUTION: Liaits of use for Hatchacurve transforms are as follows: 



Sets 1 and 2, < X < I 



- - P 



Sec 3, O.OIX < X < I 



p- - p 



7.5" ► 



.8- 



Y/Yp .5 



.1- 



.0 .1 



Figure 2. — ffere, the graphed curve has been aaaled to the Standards. 



4 



