01 March 2008 12:11:15 PM

CHEBYSHEV2_RULE
  C++ version

  Compiled on Mar  1 2008 at 12:10:50.

  Compute a Gauss-Chebyshev type 2 rule for approximating

    Integral ( -1 <= x <= +1 ) f(x) * sqrt ( 1 - x^2 ) dx

  of order ORDER.

  The user specifies ORDER and OUTPUT.

  OUTPUT is:

  "C++" for printed C++ output;
  "F77" for printed Fortran77 output;
  "F90" for printed Fortran90 output;
  "MAT" for printed MATLAB output;

  or:

  "filename" to generate 3 files:

    filename_w.txt - the weight file
    filename_x.txt - the abscissa file.
    filename_r.txt - the region file.

  The requested order of the rule is = 4

  OUTPUT option is "F90".
!
!  Weights W, abscissas X and range R
!  for a Gauss-Chebyshev type 2 quadrature rule.
!  ORDER = 4
!
!  Standard rule:
!    Integral ( -1 <= x <= +1 ) f(x) * sqrt ( 1 - x^2 ) dx
!    is to be approximated by
!    sum ( 1 <= I <= ORDER ) w(i) * f(x(i)).
!
  w(1) = 0.2170787134227061
  w(2) = 0.5683194499747424
  w(3) = 0.5683194499747423
  w(4) = 0.217078713422706

  x(1) = -0.8090169943749473
  x(2) = -0.3090169943749473
  x(3) = 0.3090169943749475
  x(4) = 0.8090169943749475

  r(1) = -1
  r(2) = 1

CHEBYSHEV1_RULE:
  Normal end of execution.

01 March 2008 12:11:15 PM