/usr/share/texmf-texlive/metapost/bpolynomial/bpolynomial.mp is in texlive-metapost 2009-15.
This file is owned by root:root, with mode 0o644.
The actual contents of the file can be viewed below.
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%%% Copyright 2007 Stephan Hennig <stephanhennig@arcor.de>
%
% This work may be distributed and/or modified under the conditions of
% the LaTeX Project Public License, either version 1.3 of this license
% or (at your option) any later version. The latest version of this
% license is in http://www.latex-project.org/lppl.txt
%
%%% Identify yourself.
if known bpolynomial_fileversion: endinput fi;
string bpolynomial_fileversion;
bpolynomial_fileversion := "v0.5 (2007/12/12)";
message "Loading bpolynomial " & bpolynomial_fileversion;
%%% Main user macro for defining polynomials.
%%% Arguments are a suffix and the coefficients
%%% of the function a*x^3 + b*x^2 + c*x + d.
vardef newBPolynomial@#(expr a, b, c, d)=
bpolynomial__defineBPolynomial.@#(a, b, c, d);
bpolynomial__defineBPolynomial.@#'(0, 3a, 2b, c);
bpolynomial__defineBPolynomial.@#''(0, 0, 6a, 2b);
bpolynomial__defineBPolynomial.@#'''(0, 0, 0, 6a);
enddef;
%%% This macro returns the path of a Bezier curve that matches
%%% a function a*x^3 + b*x^2 + c*x + d between two points A and D.
%%% This macro is the heart of this package and is used by
%%% several other macros.
%%% Arguments are the coefficients of the polynomial and the
%%% start and end point of the graph/path.
vardef bpolynomial__getBezierFromPolynomial(expr a, b, c, d, A, D)=
save xA,xB,xC,xD,yA,yB,yC,yD;
save xl,yl,xr,yr,dx;
numeric xA,xB,xC,xD,yA,yB,yC,yD;
numeric xl,yl,xr,yr,dx;
xl := xpart A;
yl := ypart A;
xr := xpart D;
yr := ypart D;
dx := xpart D - xpart A;
%%% Original equation system for x values.
% xA = xl;
% 3(xB - xA) = dx;
% 3(xC - 2xB + xA) = 0;
% xD - 3xC + 3xB - xA = 0;
%%% Modified equation system.
xA := xl;
xB := xl + dx/3;
xC := xr - dx/3;
xD := xr;
%%% Original equation system for y values.
% yA = ((a*xl + b)*xl + c)*xl + d;
% 3(yB - yA) = dx*((3a*xl + 2b)*xl + c);
% 3(yC - 2yB + yA) = dx*dx*(3a*xl + b);
% yD - 3yC + 3yB - yA = a*dx*dx*dx;
%%% Modified equation system.
yA := yl;
3(yB - yA) = dx*((3a*xl + 2b)*xl + c);
3(yC - 2yB + yA) = dx*dx*(3a*xl + b);
yD := yr;
%%% Return path A..controls B and C..D.
(xA,yA)..controls (xB,yB) and (xC,yC)..(xD,yD)
enddef;
%%% This macro returns the path of a Bezier curve that matches
%%% a function a*x^3 + b*x^2 + c*x + d in the range [xl, xr].
%%% Arguments are the coefficients of the polynomial and the
%%% range boundaries of the graph/path.
vardef getBezierFromPolynomial(expr a, b, c, d, xl, xr)=
bpolynomial__getBezierFromPolynomial(a, b, c, d,
(xl, ((a*xl+b)*xl+c)*xl+d),
(xr, ((a*xr+b)*xr+c)*xr+d))
enddef;
%%% This macro returns the path of a Bezier curve that matches
%%% a function a*x^3 + b*x^2 + c*x + d in the range [xl, xr].
%%% Arguments are the coefficients of the polynomial and the
%%% range boundaries of the graph/path.
vardef getBezierFromSqrRoot(expr u, v, w, xl, xr)=
save yl, yr;
numeric yl,yr;
if (xl >= -v):
yl := xl;
else:
message "Package bpolynomial warning: Replacing lower range boundary " & decimal xl & " by " & decimal -v & "!";
yl := -v;
fi
if (xr >= -v):
yr := xr;
else:
message "Package bpolynomial warning: Replacing upper range boundary " & decimal xr & " by " & decimal -v & "!";
yr := -v;
fi
bpolynomial__getBezierFromPolynomial(0, 1/u/u, -2*w/u/u, (w/u)*(w/u)-v,
(u*sqrt(yl+v)+w, yl),
(u*sqrt(yr+v)+w, yr)) reflectedabout ((0,0),(1,1))
enddef;
%%% This macro returns the path of a Bezier curve that matches
%%% a function a*x^3 + b*x^2 + c*x + d in the range [xl, xr].
%%% Arguments are the coefficients of the polynomial and the
%%% range boundaries of the graph/path.
vardef getBezierFromCubRoot(expr u, v, w, xl, xl)=
save yl, yr;
numeric yl,yr;
if (xl >= -v):
yl := xl;
else:
message "Package bpolynomial warning: Replacing lower range boundary " & decimal xl & " by " & decimal -v & "!";
yl := -v;
fi
if (xr >= -v):
yr := xr;
else:
message "Package bpolynomial warning: Replacing upper range boundary " & decimal xr & " by " & decimal -v & "!";
yr := -v & "!";
fi
bpolynomial__getBezierFromPolynomial(1/u/u/u, -3w/u/u/u, 3(w/u)*(w/u)/u, (w/u)*(w/u)*(w/u)-v,
(u*((yl+v)**(1/3))+w, yl),
(u*((yr+v)**(1/3))+w, yr)) reflectedabout ((0,0),(1,1))
enddef;
%%% This internal macro defines a new polynomial.
%%% Arguments are a suffix macro and the coefficients
%%% of the polynomial a*x^3 + b*x^2 + c*x + d.
vardef bpolynomial__defineBPolynomial@#(expr ca,cb,cc,cd)=
numeric @#.a, @#.b, @#.c, @#.d;
%%% Save coefficients for later access.
%%% Variable @#.a refers to coefficient a of polynomial @#.
@#.a := ca;
@#.b := cb;
@#.c := cc;
@#.d := cd;
%%% This macro returns values of polynomial @#.
%%% Argument is an x value.
vardef @#.eval(expr x)=
(((@#.a*x + @#.b)*x + @#.c)*x + @#.d)
enddef;
%%% This macro returns the path corresponding to polynomial @#
%%% on the intervall [xl, xr].
vardef @#.getPath(expr xl,xr)=
bpolynomial__getBezierFromPolynomial(@#.a, @#.b, @#.c, @#.d, (xl, @#.eval(xl)), (xr, @#.eval(xr)))
enddef;
%%% This macro returns a path tangent to @# at point (x, f(x))
%%% covering the interval [x+xm, x+xp].
vardef @#.getTangent(expr x, xm, xp)=
save m, y;
numeric m, y;
m := (3@#.a*x + 2@#.b)*x + @#.c;
y := @#.eval(x);
(x+xm, y + m*xm) -- (x+xp, y + m*xp)
enddef;
enddef;
%%% This macro defines a new square root.
%%% Arguments are a suffix macro and the parameters
%%% of the function u*(x + v)^(1/2) + w.
vardef newBSqrRoot@#(expr cu,cv,cw)=
numeric @#.a, @#.b, @#.c, @#.d;
numeric @#.u, @#.v, @#.w;
%%% Save parameters for later access.
%%% Variable @#.v refers to parameters of square root @#.
%%% Variables @#.a to @#.d store the coefficients of the
%%% corresponding polynomial.
@#.u := cu;
@#.v := cv;
@#.w := cw;
@#.a := 0;
@#.b := 1/cu/cu;
@#.c := -2*cw/cu/cu;
@#.d := (cw/cu)*(cw/cu)-cv;
%%% This macro returns values of polynomial @#.
%%% Argument is an x value.
vardef @#.eval(expr x)=
if (x >= -@#.v):
@#.u*sqrt(x + @#.v) + @#.w
else:
message "Package bpolynomial warning: Cannot evaluate function at x = " & decimal x & "!";
@#.w
fi
enddef;
%%% This macro returns the path corresponding to square root @#
%%% on the intervall [yl, yr]. The path of the corresponing
%%% polynomial is computed and then transformed.
vardef @#.getPath(expr xl,xr)=
save yl, yr;
numeric yl, yr;
if (xl >= -@#.v):
yl := xl;
else:
message "Package bpolynomial warning: Replacing lower range boundary " & decimal xl & " by " & decimal -@#.v & "!";
yl := -@#.v;
fi
if (xr >= -@#.v):
yr := xr;
else:
message "Package bpolynomial warning: Replacing upper range boundary " & decimal xr & " by " & decimal -@#.v & "!";
yr := -@#.v;
fi
bpolynomial__getBezierFromPolynomial(@#.a, @#.b, @#.c, @#.d, (@#.eval(yl), yl), (@#.eval(yr), yr))
reflectedabout ((0,0),(1,1))
enddef;
%%% This macro returns a path tangent to square root @#
%%% at point (x, f(x)) covering the interval [x+xm, x+xp].
vardef @#.getTangent(expr x, epsl, epsr)=
save m, y;
numeric m, y;
if (x >= -@#.v):
m := @#.u/(2sqrt(x + @#.v));
y := @#.eval(x);
(x+epsl, y + m*epsl) -- (x+epsr, y + m*epsr)
else:
message "Package bpolynomial warning: Cannot draw tangent at x = " & decimal x & "!";
(-@#.v, @#.w)--(-@#.v, @#.w+1)
fi
enddef;
enddef;
%%% This macro defines a new cubic root.
%%% Arguments are a suffix macro and the parameters
%%% of the function u*(x + v)^(1/3) + w.
vardef newBCubRoot@#(expr cu,cv,cw)=
numeric @#.a, @#.b, @#.c, @#.d;
numeric @#.u, @#.v, @#.w;
%%% Save parameters for later access.
%%% Variable @#.v refers to parameters of cubic root @#.
%%% Variables @#.a to @#.d store the coefficients of the
%%% corresponding polynomial.
@#.u := cu;
@#.v := cv;
@#.w := cw;
@#.a := 1/cu/cu/cu;
@#.b := -3cw/cu/cu/cu;
@#.c := 3(cw/cu)*(cw/cu)/cu;
@#.d := (cw/cu)*(cw/cu)*(cw/cu)-cv;
%%% This macro returns values of polynomial @#.
%%% Argument is an x value.
vardef @#.eval(expr x)=
if (x >= -@#.v):
@#.u*((x+@#.v)**(1/3)) + @#.w
else:
message "Package bpolynomial warning: Cannot evaluate function at x = " & decimal x & "!";
@#.w
fi
enddef;
%%% This macro returns the path corresponding to cubic root @#
%%% on the intervall [yl, yr]. The path of the corresponing
%%% polynomial is computed and then transformed.
vardef @#.getPath(expr xl,xr)=
save yl, yr;
numeric yl, yr;
if (xl >= -@#.v):
yl := xl;
else:
message "Package bpolynomial warning: Replacing lower range boundary " & decimal xl & " by " & decimal -@#.v & "!";
yl := -@#.v;
fi
if (xr >= -@#.v):
yr := xr;
else:
message "Package bpolynomial warning: Replacing upper range boundary " & decimal xr & " by " & decimal -@#.v & "!";
yr := -@#.v;
fi
bpolynomial__getBezierFromPolynomial(@#.a, @#.b, @#.c, @#.d, (@#.eval(yl), yl), (@#.eval(yr), yr))
reflectedabout ((0,0),(1,1))
enddef;
%%% This macro returns a path tangent to cubic root @#
%%% at point (x, f(x)) covering the interval [x+xm, x+xp].
vardef @#.getTangent(expr x, epsl, epsr)=
save m, y;
numeric m, y;
if (x >= -@#.v):
m := @#.u/3/((x + @#.v)**(2/3));
y := @#.eval(x);
(x+epsl, y + m*epsl) -- (x+epsr, y + m*epsr)
else:
message "Package bpolynomial warning: Cannot draw tangent at x = " & decimal x & "!";
(-@#.v, @#.w)--(-@#.v, @#.w+1)
fi
enddef;
enddef;
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