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NAME
    cfsim - simplify a value using continued fractions

SYNOPSIS
    cfsim(x [,rnd])

TYPES
    x		real
    rnd		integer, defaults to config("cfsim")

    return	real

DESCRIPTION
    If x is not an integer, cfsim(x, rnd) returns either the nearest
    above x, or the nearest below x, number with denominator less than
    den(x).  If x is an integer, cfsim(x, rnd) returns x + 1, x - 1, or 0.
    Which of the possible results is returned is controlled
    by bits 0, 1, 3 and 4 of the parameter rnd.

    For 0 <= rnd < 4, the sign of the remainder x - cfsim(x, rnd) is
    as follows:

		rnd		sign of x - cfsim(x, rnd)

		0		+, as if rounding down
		1		-. as if rounding up
		2		sgn(x), as if rounding to zero
		3		-sgn(x), as if rounding from zero

    This corresponds to the use of rnd for functions like round(x, n, rnd).

    If bit 3 or 4 of rnd is set, the lower order bits are ignored; bit 3
    is ignored if bit 4 is set.	 Thusi, for rnd > 3, it sufficient to
    consider the two cases rnd = 8 and rnd = 16.

    If den(x) > 2, cfsim(x, 8) returns the value of the penultimate simple
    continued-fraction approximant to x, i.e. if:

	x = a_0 + 1/(a_1 + 1/(a_2 + ... + 1/a_n) ...)),

    where a_0 is an integer, a_1, ..., a_n are positive integers,
    and a_n >= 2, the value returned is that of the continued fraction
    obtained by dropping the last quotient 1/a_n.

    If den(x) > 2, cfsim(x, 16) returns the nearest number to x with
    denominator less than den(x).  In the continued-fraction representation
    of x described above, this is given by replacing a_n by a_n - 1.

    If den(x) = 2, the definition adopted is to round towards zero for the
    approximant case (rnd = 8) and from zero for the "nearest" case (rnd = 16).

    For integral x, cfsim(x, 8) returns zero, cfsim(x,16) returns x - sgn(x).

    In summary, for cfsim(x, rnd) when rnd = 8 or 16, the results are:

	rnd		integer x	half-integer x		den(x) > 2

	 8		0		x - sgn(x)/2		approximant
	16		x - sgn(x)	x + sgn(x)/2		nearest

     From either cfsim(x, 0) and cfsim(x, 1), the other is easily
     determined: if one of them has value w, the other has value
     (num(x) - num(w))/(den(x) - den(w)).  From x and w one may find
     other optimal rational numbers near x; for example, the smallest-
     denominator number between x and w is (num(x) + num(w))/(den(x) + den(w)).

     If x = n/d and cfsim(x, 8) = u/v, then for k * v < d, the k-th member of
     the sequence of nearest approximations to x with decreasing denominators
     on the other side of x is (n - k * u)/(d - k * v). This is nearer
     to or further from x than u/v according as 2 * k * v < or > d.

     Iteration of cfsim(x,8) until an integer is obtained gives a sequence of
     "good" approximations to x with decreasing denominators and
     correspondingly decreasing accuracy; each denominator is less than half
     the preceding denominator.	 (Unlike the "forward" sequence of
     continued-fraction approximants these are not necessarily alternately
     greater than and less than x.)

     Some other properties:

     For rnd = 0 or 1 and any x, or rnd = 8 or 16 and x with den(x) > 2:

		cfsim(n + x, rnd) = n + cfsim(x, rnd).

     This equation also holds for the other values of rnd if n + x and x
     have the same sign.

     For rnd = 2, 3, 8 or 16, and any x:

		cfsim(-x, rnd) = -cfsim(x, rnd).

     If rnd = 8 or 16, except for integer x or 1/x for rnd = 8, and
     zero x for rnd = 16:

		cfsim(1/x, rnd) = 1/cfsim(x, rnd).

EXAMPLE
    ; c = config("mode", "frac");

    ; print cfsim(43/30, 0), cfsim(43/30, 1), cfsim(43/30, 8), cfsim(43/30,16)
    10/7 33/23 10/7 33/23

    ; x = pi(1e-20); c = config("mode", "frac");
    ; while (!isint(x)) {x = cfsim(x,8); if (den(x) < 1e6) print x,:;}
    1146408/364913 312689/99532 104348/33215 355/113 22/7 3

LIMITS
    none

LINK LIBRARY
    NUMBER *qcfsim(NUMBER *x, long rnd)

SEE ALSO
    cfappr

## Copyright (C) 1999  Landon Curt Noll
##
## Calc is open software; you can redistribute it and/or modify it under
## the terms of the version 2.1 of the GNU Lesser General Public License
## as published by the Free Software Foundation.
##
## Calc is distributed in the hope that it will be useful, but WITHOUT
## ANY WARRANTY; without even the implied warranty of MERCHANTABILITY
## or FITNESS FOR A PARTICULAR PURPOSE.	 See the GNU Lesser General
## Public License for more details.
##
## A copy of version 2.1 of the GNU Lesser General Public License is
## distributed with calc under the filename COPYING-LGPL.  You should have
## received a copy with calc; if not, write to Free Software Foundation, Inc.
## 51 Franklin Street, Fifth Floor, Boston, MA  02110-1301, USA.
##
## @(#) $Revision: 30.1 $
## @(#) $Id: cfsim,v 30.1 2007/03/16 11:10:42 chongo Exp $
## @(#) $Source: /usr/local/src/bin/calc/help/RCS/cfsim,v $
##
## Under source code control:	1994/09/30 01:29:45
## File existed as early as:	1994
##
## chongo <was here> /\oo/\	http://www.isthe.com/chongo/
## Share and enjoy!  :-)	http://www.isthe.com/chongo/tech/comp/calc/