function [ n_data, n, c ] = phi_values ( n_data ) %*****************************************************************************80 % %% PHI_VALUES returns some values of the PHI function. % % Discussion: % % PHI(N) is the number of integers between 1 and N which are % relatively prime to N. I and J are relatively prime if they % have no common factors. The function PHI(N) is known as % "Euler's totient function". % % By convention, 1 and N are relatively prime. % % In Mathematica, the function can be evaluated by: % % EulerPhi[n] % % First values: % % N PHI(N) % % 1 1 % 2 1 % 3 2 % 4 2 % 5 4 % 6 2 % 7 6 % 8 4 % 9 6 % 10 4 % 11 10 % 12 4 % 13 12 % 14 6 % 15 8 % 16 8 % 17 16 % 18 6 % 19 18 % 20 8 % % Formula: % % PHI(U*V) = PHI(U) * PHI(V) if U and V are relatively prime. % % PHI(P**K) = P**(K-1) * ( P - 1 ) if P is prime. % % PHI(N) = N * Product ( P divides N ) ( 1 - 1 / P ) % % N = Sum ( D divides N ) PHI(D). % % Licensing: % % This code is distributed under the GNU LGPL license. % % Modified: % % 19 September 2004 % % Author: % % John Burkardt % % Reference: % % Milton Abramowitz and Irene Stegun, % Handbook of Mathematical Functions, % US Department of Commerce, 1964. % % Stephen Wolfram, % The Mathematica Book, % Fourth Edition, % Wolfram Media / Cambridge University Press, 1999. % % Parameters: % % Input/output, integer N_DATA. The user sets N_DATA to 0 before the % first call. On each call, the routine increments N_DATA by 1, and % returns the corresponding data; when there is no more data, the % output value of N_DATA will be 0 again. % % Output, integer N, the argument of the PHI function. % % Output, integer C, the value of the PHI function. % n_max = 20; c_vec = [ ... 1, 1, 2, 2, 4, 2, 6, 4, 6, 4, ... 8, 8, 16, 20, 16, 40, 148, 200, 200, 648 ]; n_vec = [ ... 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, ... 20, 30, 40, 50, 60, 100, 149, 500, 750, 999 ]; if ( n_data < 0 ) n_data = 0; end n_data = n_data + 1; if ( n_max < n_data ) n_data = 0; n = 0; c = 0; else n = n_vec(n_data); c = c_vec(n_data); end return end