KONGL. SV. VET. AKADEMIENS HANDLINGAR. 



BAND 



28. 



n:o 



13 



e 



log C 



log (f? 



log {?? 



iog ff 



log fi> 



log ff 



log tf } 



log #> 



log Ä 5) 



(0) 



1. 72:17:: 



1.65824 



1.51722 



1.33629 



1.1294 



0.9047 



0.6665 



0.4183 



0.162 



(1) 



1.69631 



1.61901 



1.46893 



1.27766 



1.0598 



0.8238 



0.5737 



0.3145 



0.045 



(2) 



1.69527 



1.61731 



1.46620 



1.27377 



1.0547 



0.8174 



0.5664 



0.3058 



0.036 



(3) 



1.72214 



1.64837 



1.50379 



1.31870 



1.1075 



0.8780 



0.6355 



0.3815 



0.121 



(4) 



1.76971 



1.70320 



1.57011 



1.39828 



1.2012 



0.9865 



0.7588 



0.5213 



0.2759 



(5) 



1.83048 



1.77220 



1.65256 



1.19636 



1.31602 



1.1186 



0.9087 



0.6890 



0.4617 



(G) 



1.89862 



1.84817 



1.74180 



1.60120 



1.43773 



1.25792 



1.0659 



0.8644 



0.6555 



(7) 



1.H6982 



1.92610 



1.83152 



1.70503 



1.55688 



1.39314 



1.2176 



1.0329 



0.8408 



(8) 



2.03884 



2.00044 



1.91551 



1.80071 



1.66538 



1.51511 



1.3536 



1.1830 



1.0056 



(9) 



2.09633 



2 06159 



1.983 17 



1.87702 



1.75092 



1.<;1036 



1.4589 



1.2987 



1.1316 



(10) 



2.12812 



2.09506 



2.02012 



1.91764 



1.79587 



1.65997 



1.5132 



1.3580 



1.1958 



dl) 



2.12013 



2.08640 



2.01019 



1.90614 



1.782H 1 



1.64490 



1.4962 



1.3390 



1.1747 



(12) 



2.06792 



2.03083 



1.94828 



1.83644 



1.70433 



1.55749 



1.3994 



1.2326 



1.0586 



(13) 



1.98226 



1.93891 



1.84503 



1.71935 



1.57215 



1. 10933 



1.2349 



1.0512 



0.8603 



(14) 



1.88411 



1.83200 



1.72276 



1.57880 



1.41165 



1.22809 



1.0323 



0.8268 



0.6142 



(16) 



1.79487 



1.73264 



1 60651 



1.44276 



1.25431 



10485 



0.8299 



0.6014 



0.3648 



e 



log Ä 7) 



log tf° 



log P? 



log Ä 7) 



log Ä 7) 



iog /4 7) 



log ff 



log Ä 7) 



log ff 



(0) 



1.6275 



1.5915 



1.5008 



1.3712 



1.214 



1.034 



0.836 



0.626 



0.404 



(1) 



1.5733 



1.5338 



1.4366 



1.2984 



1.132 



0.942 



0.734 



0.517 



0.281 



(2) 



1.5711 



1.5314 



1.4336 



1.2943 



1.126 



0.935 



0.729 



0.505 



0.274 



(3) 



1.6139 



1.5766 



1.4833 



1.3505 



1.189 



1.005 



0.806 



0.589 



0.371 



(4) 



1.6904 



1.6570 



1.5722 



1.4503 



1.3004 



1.131 



0.943 



0.742 



0.529 



(5) 



1.7886 



1.7595 



1.6845 



1.5755 



1.4406 



1.287 



1.116 



0.935 



0.739 



(6) 



1.8973 



1.8726 



1.8070 



1.7101 



1.5897 



1.4508 



1.297 



1.131 



0.955 



(7) 



2.0104 



1.9891 



1.9316 



1.8462 



1.7386 



1.6142 



1.475 



1.327 



1.165 



(8) 



2.1189 



2.1002 



2.0494 



1.9729 



1.8760 



1.7631 



1.637 



1.500 



1.354 



(9) 



2.2086 



2.1916 



2.1454 



2.0752 



1.9860 



1.8812 



1.765 



1.637 



1.500 



(10) 



2.2575 



2.2415 



2.1973 



2.1300 



2.04 1 1 



1.9436 



1.831 



1.708 



1.577 



(11) 



2.2447 



2.2282 



2.1832 



2.1148 



2.0278 



1.9256 



1.811 



1.686 



1.552 



(12) 



2.1629 



2.1448 



2.0956 



2.0213 



1.9273 



1.8172 



1.695 



1.561 



1.419 



(13) 



2.0286 



2.0O7 1 



1.9504 



1.8652 



1.7588 



1.6349 



1.497 



1.348 



1.190 



(14) 



1.8740 



1.8482 



1.7807 



1.6811 



1.5578 



1.4 16 



1.259 



1.088 



0.909 



(15) 



1.7321 



1.7011 



1.6214 



1 5059 



1.3642 



1.202 



1.023 



0.832 



0.630 



Setzt man nun: 



§4. 



r. 



1 . y. 



/T cos i(F x --s x ); r imM - = #>„ sin i(F x --s % ) 



(21) 



wo der Index x die verschiedenen sechzehn Werthe von t angiebt, so geht der Ausdruck 

 (9) in den folgenden fiber: 



{D — f cos (F — é)} 



^?= K.* + 2 Y r;.„ cos *(*' — *) + 2 V r, sin ;(*'-*) (22) 



i = 1 



1 = 1 



