Vectors and Vector Operations
... Recalling the algebraic properties of mod from section 3.4, in particular formula (6) in Propostion 1, then (6) is equivalent to med mod n = m Since d is the reciprocal of e mod (p – 1)(q – 1) one has ed = 1 + k(p – 1)(q – 1) ...
... Recalling the algebraic properties of mod from section 3.4, in particular formula (6) in Propostion 1, then (6) is equivalent to med mod n = m Since d is the reciprocal of e mod (p – 1)(q – 1) one has ed = 1 + k(p – 1)(q – 1) ...
Full text
... Let us consider the multiplication of two integers having a Zeckendorf representation. The multiplier may have only A^ of its digits equal to 1, but it has log (r) 2 more digits. Hence, multiplication using Zeckendorf representation involves A^ • log (r) 2 more additions than in the BNS case. Theref ...
... Let us consider the multiplication of two integers having a Zeckendorf representation. The multiplier may have only A^ of its digits equal to 1, but it has log (r) 2 more digits. Hence, multiplication using Zeckendorf representation involves A^ • log (r) 2 more additions than in the BNS case. Theref ...
