130 
A NEW METHOD OF DETERMINING 
3 
Values of Quantities in the Development of « (4) and uor(“) 5 
i (4) is (5) KG) (7) (8) (9) 
g Log. bs Ihog.b, | og. 63 Log. bs Log. b, Log. b, 
P 2 2 2 2 
( 0) 9.70884 9.4484 9.1822 8.9118 8.6383 8.3621 
( 1) 9.71121 9.4512 9.1854 8.9155 8.6425 8.3665 
( 2) 9.70116 9.4393 9.1716 8.8998 8.6247 8.3471 
( 8) 9.68524 9.4203 9.1496 8.8747 8.5965 8.3158 
( 4) 9.66450 9.3955 9.1207 8.8418 8.5595 8.2747 
( 5) 9.64638 9.3739 9.0956 8.8131 8.5273 8.2389 
( 6) 9.63600 9.3614 9.0818 8.7968 | 8.5089 8.2184 
( 7) 9.63043 9.3549 9.0735 8.7880 8.4991 8.2077 
( 8) 9.63276 9.3576 9.0766 8.7914 8.5030 8.2119 
(2) 9.64181 9.3684 9.08983 8.8058 8.5191 8.2298 
(10) 9.65617 9.3856 9.1098 8.8287 8.5449 8.2585 
(11) 9.67052 9.4028 9.1292 8.8515 8.5705 8.2868 
(12) 9.68125 9.4156 9.1440 8.8684 8.5893 8.3078 
(13) 9.68816 9.4937 9.1537 8.8791 8.6015 8.3213 
(14) 9.69382 9.4305 9.1614 8.8882 8.6118 8.3329 
(15) 9.70087 9.4389 9.1711 8.8992 8.6240 8.3464 
x 77.37450 75.2339 73.0471 70.8269 68.5804 66.3134 
a 717.37462 75.2341 73.0474 70.8269 68.5803 66.3132 
g | Log. k, | Log. k, | Log. k,; Log. k, | Log. &,| Log. &, | Log. k, | Log. k, 
( 0) 8.824187 8.54492 8.12562 7.750420 7.89550 7.0523 6.7168 6.4105 
( 1) 8.824302 8.54433 8.12588 7.151220 7.39678 7.0540 6.7190 6.4054 
( 2) 8.823605 8.53875 8.11916 7.742693 7.38634 7.0416 6.7046 6.3714 
( 3) 8.822665 8.53172 8.10982 7.730361 7.37091 7.0232 6.6832 6.3298 
( 4) 8.821701 8.52543 8.09963 7.716100 7.35261 7.0007 6.6565 6.2932 
( 5) 8.821143 8.52236 8.09246 7.705215 7.33807 6.9826 6.6349 6.2764 
( 6) 8.821183 8.52360 8.09009 7.700585 7.33130 6.9737 6.6239 6.2809 
( 7) 8.821397 8.52470 8.08981 7.699023 7.32855 6.9698 6.6187 6.2913 
( 8) 8.821810 8.52671 8.09164 7.701551 7.33151 6.9732 6.6226 6.3027 
( 9) 8.822444 8.52829 8.09567 7.107159 7.33895 6.9824 6.6337 6.3093 
(10) 8.823323 8.52965 8.10077 7.715298- 7.35002 6.9965 6.6506 6.3129 
(11) 8.824009 8.53059 8.10550 7.723069 7.36070 7.0100 6.6669 6.3147 
(12) 8.824233 8.53159 8.10915 7.728940 7.36874 7.0202 6.6793 6.3196 
(13) 8.824055 8.53359 8.11238 7.733450 7.37462 7.0274 6.6879 6.3342 
(14) 8.823809 8.53721 8.11622 7.738311 7.38053 7.0345 6.6960 6.3608 
(15) 8.823826 8.54164 8.121158 7.144423 7.38795 7.0433 6.7062 6.3901 
2 70.583851 68.25726 64.85258 | 61.793910 | 58.89655 56.0927 53.8503 50.6520 
ral 70.583841 68.25722 64.85260 | 61.793920 | 58.89653 56.0926 53.8505 50.6512 
