DIFFERENTIAL EQUATIONS 215 



B. A. Report, 1915, x = 6.5 to x = 15.5, interval 0.5, 10 decimal places. 



Aldis, Proc. Roy. Soc. London, 66, 40, 1900: x = o.i to x = 6.0. Interval 

 o.i, 21 decimal places. 



Jahnke and Emde, Tables VII and VIII, functions denoted K (#) and KI(Z), 

 x = o.i to x = 6.0, interval o.i; x = o.oi to x = 0.99, interval o.oi; x = i.o 

 to x = 10.3, interval o.i; 4 decimal places. 



B. A. Report, 1914, p. 83. Integral values of n from o to 13. x = o.oi to 

 x = 6.0, interval o.i; x = 6.0 to x = 16.0, interval 0.5; 5 decimal places. 



T - FoO) + (log 2 - 7)7 (*), Denoted Y (x) and YI(X) 



- Yi(x) + (log 2 - 7)/i(:r). respectively in the tables. 



B. A. Report, 1914, p. 76, x = 0.02 to x = 15.50, interval 0.02, 6 decimal 

 places. 



B. A. Report, 1915, p. 33, x = o.i to x = 6.6, interval o.i; x = 6.0 to 

 x = 15.5, interval 0.5, 10 decimal places. 



Jahnke and Emde, Table VI, x = o.oi to x = i.oo, interval o.oi; x = i.o 

 to x = 10.2, interval o.i, 4 decimal places. 



Y Q (x), Yi(x). Denoted N Q (x) and Ni(x) respectively. 



Jahnke and Emde, Table IX, x = o.i to x = 10.2, interval o.i, 4 decimal 

 places. 



1L y n (x) + (log 2 - 7) /(*). Denoted Y n (x) in tables. 



B. A. Report, 1915. Integral values of n from i to 13. x = 0.2 to x = 6.0, 

 interval 0.2; x = 6.0 to x = 15.5, interval 0.5, 6 decimal places. 



/+*(*)- 



Jahnke and Emde, Table II. Integral values of n from n = o to n = 6, and 

 n = -i to n = -7; x = o to x = 50, interval i.o, 4 figures. 



Watson, Proc. Roy. Soc. London, 94, 204, 1918. 



x = 0.05 to x = 2.00 interval 0.05, 

 x = 2.0 to x = 8.0 interval 0.2, 

 4 decimal places. 



/(), /a-i(a) 



- -F a (a:), - - Fa_i(d). Denoted G(a) and G_i(a) respectively. 



2 2 



