# include # include # include # include # include # include # include "zero_rc.hpp" using namespace std; int main ( ); void example_test ( double a, double b, double t, double f ( double x ), string title ); double f_01 ( double x ); double f_02 ( double x ); double f_03 ( double x ); double f_04 ( double x ); double f_05 ( double x ); //****************************************************************************80 int main ( ) //****************************************************************************80 // // Purpose: // // MAIN is the main program for ZERO_RC_TEST. // // Discussion: // // ZERO_RC_TEST tests the ZERO_RC library. // // Licensing: // // This code is distributed under the GNU LGPL license. // // Modified: // // 17 July 2011 // // Author: // // John Burkardt // { double a; double b; double t; timestamp ( ); cout << "\n"; cout << "ZERO_RC_TEST\n"; cout << " C++ version\n"; cout << " ZERO_RC seeks a root of a function F(X)\n"; cout << " in an interval [A,B] using reverse communication.\n"; t = r8_epsilon ( ); a = 1.0; b = 2.0; example_test ( a, b, t, f_01, "f_01(x) = sin ( x ) - x / 2" ); a = 0.0; b = 1.0; example_test ( a, b, t, f_02, "f_02(x) = 2 * x - exp ( - x )" ); a = -1.0; b = 0.5; example_test ( a, b, t, f_03, "f_03(x) = x * exp ( - x )" ); a = 0.0001; b = 20.0; example_test ( a, b, t, f_04, "f_04(x) = exp ( x ) - 1 / ( 100 * x * x )" ); a = -5.0; b = 2.0; example_test ( a, b, t, f_05, "f_05(x) = (x+3) * (x-1) * (x-1)" ); // // Terminate. // cout << "\n"; cout << "ZERO_RC_TEST\n"; cout << " Normal end of execution.\n"; cout << "\n"; timestamp ( ); return 0; } //****************************************************************************80 void example_test ( double a, double b, double t, double f ( double x ), string title ) //****************************************************************************80 // // Purpose: // // EXAMPLE_TEST tests ZERO_RC on one test function. // // Licensing: // // This code is distributed under the GNU LGPL license. // // Modified: // // 14 October 2008 // // Author: // // John Burkardt // // Parameters: // // Input, double A, B, the two endpoints of the change of sign // interval. // // Input, double MACHEP, an estimate for the relative machine // precision. // // Input, double T, a positive error tolerance. // // Input, double F ( double x ), the name of a user-supplied // function which evaluates the function whose zero is being sought. // // Input, string TITLE, a title for the problem. // { double arg; int status; double value; cout << "\n"; cout << " " << title << "\n"; cout << "\n"; cout << " STATUS X F(X)\n"; cout << "\n"; status = 0; for ( ; ; ) { zero_rc ( a, b, t, arg, status, value ); if ( status < 0 ) { cout << "\n"; cout << " ZERO_RC returned an error flag!\n"; break; } value = f ( arg ); cout << " " << setw(8) << status << " " << setw(14) << arg << " " << setw(14) << value << "\n"; if ( status == 0 ) { break; } } return; } //****************************************************************************80 double f_01 ( double x ) //****************************************************************************80 // // Purpose: // // F_01 evaluates sin ( x ) - x / 2. // // Licensing: // // This code is distributed under the GNU LGPL license. // // Modified: // // 13 April 2008 // // Author: // // John Burkardt // // Parameters: // // Input, double X, the point at which F is to be evaluated. // // Output, double F_01, the value of the function at X. // { double value; value = sin ( x ) - 0.5 * x; return value; } //****************************************************************************80 double f_02 ( double x ) //****************************************************************************80 // // Purpose: // // F_02 evaluates 2*x-exp(-x). // // Licensing: // // This code is distributed under the GNU LGPL license. // // Modified: // // 13 April 2008 // // Author: // // John Burkardt // // Parameters: // // Input, double X, the point at which F is to be evaluated. // // Output, double F_02, the value of the function at X. // { double value; value = 2.0 * x - exp ( - x ); return value; } //****************************************************************************80 double f_03 ( double x ) //****************************************************************************80 // // Purpose: // // F_03 evaluates x*exp(-x). // // Licensing: // // This code is distributed under the GNU LGPL license. // // Modified: // // 13 April 2008 // // Author: // // John Burkardt // // Parameters: // // Input, double X, the point at which F is to be evaluated. // // Output, double F_03, the value of the function at X. // { double value; value = x * exp ( - x ); return value; } //****************************************************************************80 double f_04 ( double x ) //****************************************************************************80 // // Purpose: // // F_04 evaluates exp(x) - 1 / (100*x*x). // // Licensing: // // This code is distributed under the GNU LGPL license. // // Modified: // // 13 April 2008 // // Author: // // John Burkardt // // Parameters: // // Input, double X, the point at which F is to be evaluated. // // Output, double F_04, the value of the function at X. // { double value; value = exp ( x ) - 1.0 / 100.0 / x / x; return value; } //****************************************************************************80 double f_05 ( double x ) //****************************************************************************80 // // Purpose: // // F_05 evaluates (x+3)*(x-1)*(x-1). // // Licensing: // // This code is distributed under the GNU LGPL license. // // Modified: // // 13 April 2008 // // Author: // // John Burkardt // // Parameters: // // Input, double X, the point at which F is to be evaluated. // // Output, double F_05, the value of the function at X. // { double value; value = ( x + 3.0 ) * ( x - 1.0 ) * ( x - 1.0 ); return value; }