Provisional Theory of Leda. 23 



Log. Max. 





A 

 U 



AAA AAA OKQ 



. UUU OUy OOO , 



, cos 



( 12 



1 Q 



. lo 



TO A 

 . IZ . 4 



. t — 



i o 

 12 



A fc! 



. 45 



. 52 . 



A \ 



4) 



6 . 



971183 . 



, n 



+ 



A 



u 



AAA AA7 tCGA 



. uuu uu < oyu . 



cos (146 



QA 



. oU 



A "1 O 



. 41 . 2 . 



, t + 



ob 



. 59 



. 19 



. 0) 



6 . 



880242 







A 

 U 



AAA AQ l OKO 

 . UUU Uo4 ZOZ . 



cos (146 



QA 



. oU 



A~\ O 



. 41 . 2 



. t + 



O K 



25 



0£ 

 . ZD 



1 7 

 . 1 < . 



A \ 



4) 



5 . 



521818 . 



n 





A 

 U 



nnn ako aq^ 

 . uuu uoz ^yo . 



cos 



( 54 



. 00 



. oi . y 





Q7 



Q7 

 . O < 



t)Q 

 . ZO 



• 1) 



5 . 



f2Ullo . 



n 





A 

 U 



. 000 003 304 . 



cos 



( 54 



. 00 



. oi . y 



. t + 



A Q 



4y 



. 11 



. 29 



.7) 



r* 



O . 



H "J fVA i A 



5 19040 , 



n 





a 



. 000 005 409. 



cos (213 



QQ 



. ZO . 



. 6 + 



Dl 



. 01 



.54 , 



■7) 



b . 



rjooi "I 7 



/.doll < . 



n 



1 



a 



u 



. 000 009 318. 



cos (122 



. 3 



.16.3. 



, t + 



oz 



. ol 



. 3. 



,8) 



6 



Af* AOOO 





+ 



A 



. 000 014 518. 



cos (122 



. 4 



. 16. 3 



. t + 





/I 

 4: 



. 5 . 



4) 



, 



1 OA7 



, lbiyu i 





+ 



A 



U 



. 000 002 508. 



cos (111 



. 40 



.17.2. 



. t + 



i o 



42 



07 



. o< 



. 54 



.8) Mars. 



6 







+ 



Q" 



.718, 



. sin( 30 



. 20 



.56. 



G.t 



+ 227 . 



A A 



44 . 



51 . 



1) 



Jupiter. 



A 







AU7 K77 







/i 



'i , 



518. 



sin (128 . 



22 



. 57 . 



O.t 



- 229. 



1 o 



Iz . 



44 . 



7\ 



«) 







A 



. 



b54y4b . 



n 





1 

 1 Z . 



198. 



sin( 18. 



, 40 



. 3. 



6 A + 3 . 



4b . 



A 7 



4< . 



8) 







1 . 



Oobzob . 



n 





1 



1 . 



099 



. sin (177 



, 23 



.57 . 



3.t 



- 210. 



1 A 



4U . 



A 

 U . 



1) 







. 



078819 . 



, n 





zo , 



.784, 



. sin ( 67 . 



.41 



. 3. 



9 . t + 35 . 



1 7 

 1 1 . 



QQ 



O 



z) 







1 



1 



. 427883 



. n 





u 



. 360 



. sin (225 



.24 



. 57 . 



5.< 



- 326 . 



1 A 

 1U . 



OA 



zU . 



4) 







1 . 



556303 , 



, n 



+ 







o , 



, 780. 



, sin (116 



. 42 



. 4. 



1 . t + 116 . 



4o . 



A ti 

 40 . 



A \ 



4) 







A 



. 



hh inn 



577492 





+ 



, 



,134 



. sin( 84. 



34 



. 1. 



3 . t 



+ 194. 



39 . 



8 . 



2) 







I. 



127105 





+ 



0, 



.756. 



, sin (164 . 



43 



. 4. 



3.t 



- 61 . 



40. 



2. 



5) 







I. 



878522 







0, 



.233. 



. sin (145 



.15 



. 54 . 



5.* 



- 69. 



51 . 



9 . 



7) 







1 



. 367356 



. n 



+ 



0. 



, 966 . 



, sin ( 12 



. 13 



. 12 . 



4.t 



- 27. 



11 . 



1 . 



2) 



Saturn. 



T 



. 984977 











. 787 , 



. sin ( 54 . 



, 55 



. 31 . 



9.t 



+ 52. 



3 . 



36. 



9) 







F 



. 895975 



, n 



+ 







.134 



. sin (122 



. 4 



. 16. 



3.*+ 76. 



56 . 



12. 



6) 







I. 



127105 





For the sake of uniformity the Logarithms of the Coefficients are all 

 set out to six places, but it is hardly necessary to say that but few of them 

 require that number of figures. 



Ledcis Elliptic Place. 



The following formulas, though of little or no utility, are added for the 

 sake of completeness. 



Let v be the Orbit-longitude reckoned from the meau-equinox of the 

 Epoch, on the Ecliptic of 1856 as far as the ascending node and thence 



