[11] Coordinate Geometn' of Three Dimensions, R.J.T. Bell, MacMillan, 1937, page 24. 



[12] ACIC, Technical Reports Nos. 59 and 80; Geodetic distance and azimuth computations for 



lines under 500 miles, Geodetic distance and azimuth computations for lines over 500 miles; 



June 1956, August 1957. Revisions, Sept. 1960 and Dec. 1959. 

 [l3] The distance between two widely separated points on the surface of the Earth, W. D. Lambert, 



Journal of the Washington Academy of Sciences, \ ol. 32, No. 5, May 15, 1942. 

 [14] H.O. Publication No. 223, Auxiliar.- tables for Loran computation, 1953 reprint. 

 [15] Andoyer, H. Formule donnant la longueur de la geodesique, joignant 2 points de 1 ellipsoide 



donnes par leurs coordonnees geographiques. Bulletin Geodesique, No. 34, 77-81, 1932. 

 [16] Hershey, A.\ ., Hershey, E.J. Techniques for computing Loran maps, U.S. Naval Weapons 



Laborator}' Report No. 1902, Januar)^ 1964. 

 [17] Thomas, P.D., Inverse computation for long lines. Transactions AGL, \ ol. 29, No. 6, 



763-766, 1948. 

 [18] Forsyth, A.R., Geodesies on an oblate spheroid. Messenger of Mathematics, \ ol. XX^ , 



81-124, 1895. 

 [19] Wassef, A.M., Note on Forsyth method of direct computation of geodetic distances on an 



oblate spheroid. Bulletin Geodesique, No. 10, 353-355, 1948. 

 [20] Gougenheim, A., Note sur la methode de Forsyth, Bulletin Geodesique, No. 15, 69-70, 1950. 

 [21] Bomford, G., Geodesy, Second Edition, Oxford at the Clarendon Press, 1962. 

 [22] Personal Communication, B.K. Meade, Chief of Geode:!: Computations, Coast & Geodetic 



Survey, Dec. 1964. 

 [23] Sodano, E.M., General non-iterative solution of the inverse ^nd direct geodetic problems, 



GIMRADA, Fort Belvoir, April 1963; also published as GBIRADA Research Note 11. 

 [24] Geodesv, W.M. Tobev, Geodetic Surrey of Canada Publication No. 11, Ottawa, 1928. 



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