Tables of the ProhabiUty Integral 



11 



TABLE IV. 

 Extension of Tahle of the Probability Integral F=^(\-d). 



1 r" 



-^"=-^1 e~i^^d('. The table gives {—\ogF) for x. 



X 



-\ogF 



X 



-logF 



X 



-logf 



6 



6-54265 



30 



197-30921 



50 



544-96634 



6 



9-00586 



31 



210-56940 



60 



783-90743 



7 



11-89285 



32 



224-26344 



70 



1066-26576 



8 



15-20614 



33 



238-39135 



80 



1392-04459 



9 



18-94746 



3k 



252-95315 



90 



1761-24604 



10 



23-11805 



35 



267-94888 



100 



2173-87154 



11 



27-71882 



30 



283-37855 



150 



4888-38812 



IS 



32-75044 



O t 



299-24218 



200 



8688-58977 



13 



38-21345 



3S 



315-53979 



250 



13574-49960 



u 



44-10827 



39 



332-27139 



300 



19546-12790 



15 



50-43522 



JfO 



349-43701 



350 



26603-48018 



IG 



57-19458 



Jtl 



367-03664 



400 



34746-55970 



17 



64-38658 



JfS 



385-07032 



450 



43975-36860 



IS 



72-01140 



JtS 



403-53804 



500 



54289-40830 



19 



80-06919 



U 



422-43983 







SO 



88-56010 



4-5 



441-77568 





N.B. To obtain anything 

 but a rough apprecia- 

 tion after x = bQ, the 



SI 



97-48422 



46 



461-54561 





23 



106-84167 



A7 



481-74964 





S3 



116-63253 



4S 



502-38776 





table would require 

 much extension, but 



SJt 



126-85686 



Jt9 



523-45999 





S5 



137-51475 



so 



544-96634 





for many practical 

 problems it suffices to 



SG 



148-60624 









take after a: = 50: 



S7 



160-13139 











S8 

 S9 



172-09024 

 184-48283 









v/2,r^ 



SO 



197-30921 











From each of the values in this table -30103 must be subtracted, if we wish to 

 obtain the probability ^P, then given by ( - log iF), that the value is greater than x, 

 without regard to sign. 



2—2 



