1984-07-12 14:07:14 +00:00
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{ $Header$ }
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1984-07-12 13:50:44 +00:00
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procedure machar (var ibeta , it , irnd , ngrd , machep , negep , iexp,
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minexp , maxexp : integer ; var eps , epsneg , xmin , xmax : real ) ;
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var trapped:boolean;
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procedure encaps(procedure p; procedure q(i:integer)); extern;
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procedure trap(i:integer); extern;
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procedure catch(i:integer);
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const underflo=5;
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begin if i=underflo then trapped:=true else trap(i) end;
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procedure work;
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var
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{ This subroutine is intended to determine the characteristics
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of the floating-point arithmetic system that are specified
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below. The first three are determined according to an
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algorithm due to M. Malcolm, CACM 15 (1972), pp. 949-951,
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incorporating some, but not all, of the improvements
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suggested by M. Gentleman and S. Marovich, CACM 17 (1974),
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pp. 276-277. The version given here is for single precision.
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Latest revision - October 1, 1976.
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Author - W. J. Cody
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Argonne National Laboratory
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Revised for Pascal - R. A. Freak
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University of Tasmania
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Hobart
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Tasmania
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ibeta is the radix of the floating-point representation
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it is the number of base ibeta digits in the floating-point
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significand
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irnd = 0 if the arithmetic chops,
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1 if the arithmetic rounds
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ngrd = 0 if irnd=1, or if irnd=0 and only it base ibeta
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digits participate in the post normalization shift
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of the floating-point significand in multiplication
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1 if irnd=0 and more than it base ibeta digits
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participate in the post normalization shift of the
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floating-point significand in multiplication
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machep is the exponent on the smallest positive floating-point
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number eps such that 1.0+eps <> 1.0
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negeps is the exponent on the smallest positive fl. pt. no.
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negeps such that 1.0-negeps <> 1.0, except that
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negeps is bounded below by it-3
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iexp is the number of bits (decimal places if ibeta = 10)
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reserved for the representation of the exponent of
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a floating-point number
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minexp is the exponent of the smallest positive fl. pt. no.
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xmin
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maxexp is the exponent of the largest finite floating-point
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number xmax
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eps is the smallest positive floating-point number such
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that 1.0+eps <> 1.0. in particular,
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eps = ibeta**machep
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epsneg is the smallest positive floating-point number such
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that 1.0-eps <> 1.0 (except that the exponent
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negeps is bounded below by it-3). in particular
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epsneg = ibeta**negep
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xmin is the smallest positive floating-point number. in
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particular, xmin = ibeta ** minexp
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xmax is the largest finite floating-point number. in
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particular xmax = (1.0-epsneg) * ibeta ** maxexp
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note - on some machines xmax will be only the
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second, or perhaps third, largest number, being
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too small by 1 or 2 units in the last digit of
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the significand.
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}
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i , iz , j , k , mx : integer ;
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a , b , beta , betain , betam1 , one , y , z , zero : real ;
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begin
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irnd := 1 ;
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one := ( irnd );
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a := one + one ;
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b := a ;
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zero := 0.0 ;
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{
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determine ibeta,beta ala Malcolm
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}
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while ( ( ( a + one ) - a ) - one = zero ) do begin
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a := a + a ;
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end ;
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while ( ( a + b ) - a = zero ) do begin
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b := b + b ;
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end ;
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ibeta := trunc ( ( a + b ) - a );
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beta := ( ibeta );
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betam1 := beta - one ;
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{
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determine irnd,ngrd,it
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}
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if ( ( a + betam1 ) - a = zero ) then irnd := 0 ;
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it := 0 ;
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a := one ;
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repeat begin
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it := it + 1 ;
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a := a * beta ;
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end until ( ( ( a + one ) - a ) - one <> zero ) ;
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{
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determine negep, epsneg
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}
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negep := it + 3 ;
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a := one ;
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for i := 1 to negep do begin
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a := a / beta ;
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end ;
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while ( ( one - a ) - one = zero ) do begin
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a := a * beta ;
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negep := negep - 1 ;
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end ;
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negep := - negep ;
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epsneg := a ;
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{
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determine machep, eps
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}
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machep := negep ;
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while ( ( one + a ) - one = zero ) do begin
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a := a * beta ;
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machep := machep + 1 ;
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end ;
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eps := a ;
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{
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determine ngrd
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}
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ngrd := 0 ;
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if(( irnd = 0) and((( one + eps) * one - one) <> zero)) then
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ngrd := 1 ;
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{
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determine iexp, minexp, xmin
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loop to determine largest i such that
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(1/beta) ** (2**(i))
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does not underflow
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exit from loop is signall by an underflow
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}
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i := 0 ;
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betain := one / beta ;
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z := betain ;
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trapped:=false;
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repeat begin
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y := z ;
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z := y * y ;
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{
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check for underflow
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}
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i := i + 1 ;
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end until trapped;
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i := i - 1;
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k := 1 ;
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{
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determine k such that (1/beta)**k does not underflow
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first set k = 2 ** i
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}
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for j := 1 to i do begin
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k := k + k ;
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end ;
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iexp := i + 1 ;
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mx := k + k ;
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if ( ibeta = 10 ) then begin
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{
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for decimal machines only }
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iexp := 2 ;
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iz := ibeta ;
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while ( k >= iz ) do begin
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iz := iz * ibeta ;
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iexp := iexp + 1 ;
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end ;
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mx := iz + iz - 1 ;
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end;
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trapped:=false;
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repeat begin
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{
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loop to construct xmin
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exit from loop is signalled by an underflow
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}
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xmin := y ;
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y := y * betain ;
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k := k + 1 ;
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end until trapped;
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k := k - 1;
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minexp := - k ;
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{ determine maxexp, xmax
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}
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if ( ( mx <= k + k - 3 ) and ( ibeta <> 10 ) ) then begin
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mx := mx + mx ;
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iexp := iexp + 1 ;
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end;
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maxexp := mx + minexp ;
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{ adjust for machines with implicit leading
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bit in binary significand and machines with
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radix point at extreme right of significand
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}
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i := maxexp + minexp ;
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if ( ( ibeta = 2 ) and ( i = 0 ) ) then maxexp := maxexp - 1 ;
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if ( i > 20 ) then maxexp := maxexp - 3 ;
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xmax := one - epsneg ;
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if ( xmax * one <> xmax ) then xmax := one - beta * epsneg ;
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xmax := ( xmax * betain * betain * betain ) / xmin ;
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i := maxexp + minexp + 3 ;
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if ( i > 0 ) then begin
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for j := 1 to i do begin
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xmax := xmax * beta ;
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end ;
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end;
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end;
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begin
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trapped:=false;
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encaps(work,catch);
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end;
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