Author(s): S.A. Al-Salman
Article publication date: 1985-09-01
Vol. 3 No. 2 (yearly), pp. 204-209.
131
Keywords
mathematics, symmetry, Saudi Arabia
Abstract
This is a sequel to an earlier paper by the author in which it was proved that the symmetric group Sn of degree N is a (2, 3, 16)- group for 16<=N<= 25 whereas the alternating group An is a (2, 3, 16)- group for 18<= N<= 25, N is not equal to 23. In this paper, it is proved that both Sn and An are (2, 3, 16)- groups for 26<= N<= 30