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\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch1}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull1}{ZeroDimensionalSolvePackageXmpPageEmpty1}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull1}{\hidepaste}
\tab{5}\spadcommand{R := Integer\bound{R }}
\indentrel{3}\begin{verbatim}
(1) Integer
Type: Domain
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty1}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty1}{ZeroDimensionalSolvePackageXmpPagePatch1}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty1}{\showpaste}
\tab{5}\spadcommand{R := Integer\bound{R }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch2}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull2}{ZeroDimensionalSolvePackageXmpPageEmpty2}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull2}{\hidepaste}
\tab{5}\spadcommand{ls : List Symbol := [x,y,z,t]\bound{ls }}
\indentrel{3}\begin{verbatim}
(2) [x,y,z,t]
Type: List Symbol
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty2}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty2}{ZeroDimensionalSolvePackageXmpPagePatch2}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty2}{\showpaste}
\tab{5}\spadcommand{ls : List Symbol := [x,y,z,t]\bound{ls }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch3}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull3}{ZeroDimensionalSolvePackageXmpPageEmpty3}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull3}{\hidepaste}
\tab{5}\spadcommand{ls2 : List Symbol := [x,y,z,t,new()$Symbol]\bound{ls2 }}
\indentrel{3}\begin{verbatim}
(3) [x,y,z,t,%A]
Type: List Symbol
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty3}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty3}{ZeroDimensionalSolvePackageXmpPagePatch3}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty3}{\showpaste}
\tab{5}\spadcommand{ls2 : List Symbol := [x,y,z,t,new()$Symbol]\bound{ls2 }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch4}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull4}{ZeroDimensionalSolvePackageXmpPageEmpty4}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull4}{\hidepaste}
\tab{5}\spadcommand{pack := ZDSOLVE(R,ls,ls2)\free{ls }\free{ls2 }\free{R }\bound{pack }}
\indentrel{3}\begin{verbatim}
(4)
ZeroDimensionalSolvePackage(Integer,[x,y,z,t],[x,y,z,t,
%A])
Type: Domain
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty4}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty4}{ZeroDimensionalSolvePackageXmpPagePatch4}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty4}{\showpaste}
\tab{5}\spadcommand{pack := ZDSOLVE(R,ls,ls2)\free{ls }\free{ls2 }\free{R }\bound{pack }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch5}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull5}{ZeroDimensionalSolvePackageXmpPageEmpty5}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull5}{\hidepaste}
\tab{5}\spadcommand{p1 := x**2*y*z + x*y**2*z + x*y*z**2 + x*y*z + x*y + x*z + y*z\bound{p1 }}
\indentrel{3}\begin{verbatim}
2 2 2
(5) x y z + (x y + (x + x + 1)y + x)z + x y
Type: Polynomial Integer
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty5}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty5}{ZeroDimensionalSolvePackageXmpPagePatch5}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty5}{\showpaste}
\tab{5}\spadcommand{p1 := x**2*y*z + x*y**2*z + x*y*z**2 + x*y*z + x*y + x*z + y*z\bound{p1 }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch6}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull6}{ZeroDimensionalSolvePackageXmpPageEmpty6}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull6}{\hidepaste}
\tab{5}\spadcommand{p2 := x**2*y**2*z + x*y**2*z**2 + x**2*y*z + x*y*z + y*z + x + z\bound{p2 }}
\indentrel{3}\begin{verbatim}
2 2 2 2 2
(6) x y z + (x y + (x + x + 1)y + 1)z + x
Type: Polynomial Integer
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty6}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty6}{ZeroDimensionalSolvePackageXmpPagePatch6}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty6}{\showpaste}
\tab{5}\spadcommand{p2 := x**2*y**2*z + x*y**2*z**2 + x**2*y*z + x*y*z + y*z + x + z\bound{p2 }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch7}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull7}{ZeroDimensionalSolvePackageXmpPageEmpty7}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull7}{\hidepaste}
\tab{5}\spadcommand{p3 := x**2*y**2*z**2 + x**2*y**2*z + x*y**2*z + x*y*z + x*z + z + 1\bound{p3 }}
\indentrel{3}\begin{verbatim}
2 2 2 2 2
(7) x y z + ((x + x)y + x y + x + 1)z + 1
Type: Polynomial Integer
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty7}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty7}{ZeroDimensionalSolvePackageXmpPagePatch7}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty7}{\showpaste}
\tab{5}\spadcommand{p3 := x**2*y**2*z**2 + x**2*y**2*z + x*y**2*z + x*y*z + x*z + z + 1\bound{p3 }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch8}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull8}{ZeroDimensionalSolvePackageXmpPageEmpty8}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull8}{\hidepaste}
\tab{5}\spadcommand{lp := [p1, p2, p3]\free{p1 }\free{p2 }\free{p3 }\bound{lp }}
\indentrel{3}\begin{verbatim}
(8)
2 2 2
[x y z + (x y + (x + x + 1)y + x)z + x y,
2 2 2 2 2
x y z + (x y + (x + x + 1)y + 1)z + x,
2 2 2 2 2
x y z + ((x + x)y + x y + x + 1)z + 1]
Type: List Polynomial Integer
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty8}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty8}{ZeroDimensionalSolvePackageXmpPagePatch8}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty8}{\showpaste}
\tab{5}\spadcommand{lp := [p1, p2, p3]\free{p1 }\free{p2 }\free{p3 }\bound{lp }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch9}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull9}{ZeroDimensionalSolvePackageXmpPageEmpty9}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull9}{\hidepaste}
\tab{5}\spadcommand{triangSolve(lp)$pack\free{lp }\free{pack }}
\indentrel{3}\begin{verbatim}
(9)
[
{
20 19 18 17 16 15
z - 6z - 41z + 71z + 106z + 92z
+
14 13 12 11 10
197z + 145z + 257z + 278z + 201z
+
9 8 7 6 5 4
278z + 257z + 145z + 197z + 92z + 106z
+
3 2
71z - 41z - 6z + 1
,
19 18 17
14745844z + 50357474z - 130948857z
+
16 15 14
- 185261586z - 180077775z - 338007307z
+
13 12 11
- 275379623z - 453190404z - 474597456z
+
10 9 8
- 366147695z - 481433567z - 430613166z
+
7 6 5
- 261878358z - 326073537z - 163008796z
+
4 3 2
- 177213227z - 104356755z + 65241699z
+
9237732z - 1567348
*
y
+
19 18 17
1917314z + 6508991z - 16973165z
+
16 15 14
- 24000259z - 23349192z - 43786426z
+
13 12 11
- 35696474z - 58724172z - 61480792z
+
10 9 8
- 47452440z - 62378085z - 55776527z
+
7 6 5
- 33940618z - 42233406z - 21122875z
+
4 3 2
- 22958177z - 13504569z + 8448317z + 1195888z
+
- 202934
,
3 2 3 2 2
(z - 2z)y + (- z - z - 2z - 1)y - z - z
+
1
*
x
+
2
z - 1
}
]
Type: List RegularChain(Integer,[x,y,z,t])
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty9}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty9}{ZeroDimensionalSolvePackageXmpPagePatch9}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty9}{\showpaste}
\tab{5}\spadcommand{triangSolve(lp)$pack\free{lp }\free{pack }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch10}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull10}{ZeroDimensionalSolvePackageXmpPageEmpty10}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull10}{\hidepaste}
\tab{5}\spadcommand{univariateSolve(lp)$pack\free{lp }\free{pack }}
\indentrel{3}\begin{verbatim}
(10)
[
[
complexRoots =
12 11 10 9 8 7 6
? - 12? + 24? + 4? - 9? + 27? - 21?
+
5 4 3 2
27? - 9? + 4? + 24? - 12? + 1
,
coordinates =
[
11 10 9 8
63x + 62%A - 721%A + 1220%A + 705%A
+
7 6 5 4 3
- 285%A + 1512%A - 735%A + 1401%A - 21%A
+
2
215%A + 1577%A - 142
,
11 10 9 8
63y - 75%A + 890%A - 1682%A - 516%A
+
7 6 5 4 3
588%A - 1953%A + 1323%A - 1815%A + 426%A
+
2
- 243%A - 1801%A + 679
,
z - %A]
]
,
6 5 4 3 2
[complexRoots= ? + ? + ? + ? + ? + ? + 1,
5 3
coordinates= [x - %A ,y - %A ,z - %A]]
,
2
[complexRoots= ? + 5? + 1,
coordinates= [x - 1,y - 1,z - %A]]
]
Type: List Record(complexRoots: SparseUnivariatePolynomial Integer,coordinates: List Polynomial Integer)
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty10}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty10}{ZeroDimensionalSolvePackageXmpPagePatch10}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty10}{\showpaste}
\tab{5}\spadcommand{univariateSolve(lp)$pack\free{lp }\free{pack }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch11}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull11}{ZeroDimensionalSolvePackageXmpPageEmpty11}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull11}{\hidepaste}
\tab{5}\spadcommand{lr := realSolve(lp)$pack\free{lp }\free{pack }\bound{lr }}
\indentrel{3}\begin{verbatim}
(11)
[
[%R1,
1184459 19 2335702 18 5460230 17
������� %R1 - ������� %R1 - ������� %R1
1645371 548457 182819
+
79900378 16 43953929 15 13420192 14
�������� %R1 + �������� %R1 + �������� %R1
1645371 548457 182819
+
553986 13 193381378 12 35978916 11
������ %R1 + ��������� %R1 + �������� %R1
3731 1645371 182819
+
358660781 10 271667666 9 118784873 8
��������� %R1 + ��������� %R1 + ��������� %R1
1645371 1645371 548457
+
337505020 7 1389370 6 688291 5
��������� %R1 + ������� %R1 + ������ %R1
1645371 11193 4459
+
3378002 4 140671876 3 32325724 2
������� %R1 + ��������� %R1 + �������� %R1
42189 1645371 548457
+
8270 9741532
- ���� %R1 - �������
343 1645371
,
91729 19 487915 18 4114333 17
- ������ %R1 + ������ %R1 + ������� %R1
705159 705159 705159
+
1276987 16 13243117 15 16292173 14
- ������� %R1 - �������� %R1 - �������� %R1
235053 705159 705159
+
26536060 13 722714 12 5382578 11
- �������� %R1 - ������ %R1 - ������� %R1
705159 18081 100737
+
15449995 10 14279770 9 6603890 8
- �������� %R1 - �������� %R1 - ������� %R1
235053 235053 100737
+
409930 7 37340389 6 34893715 5
- ������ %R1 - �������� %R1 - �������� %R1
6027 705159 705159
+
26686318 4 801511 3 17206178 2
- �������� %R1 - ������ %R1 - �������� %R1
705159 26117 705159
+
4406102 377534
- ������� %R1 + ������
705159 705159
]
,
[%R2,
1184459 19 2335702 18 5460230 17
������� %R2 - ������� %R2 - ������� %R2
1645371 548457 182819
+
79900378 16 43953929 15 13420192 14
�������� %R2 + �������� %R2 + �������� %R2
1645371 548457 182819
+
553986 13 193381378 12 35978916 11
������ %R2 + ��������� %R2 + �������� %R2
3731 1645371 182819
+
358660781 10 271667666 9 118784873 8
��������� %R2 + ��������� %R2 + ��������� %R2
1645371 1645371 548457
+
337505020 7 1389370 6 688291 5
��������� %R2 + ������� %R2 + ������ %R2
1645371 11193 4459
+
3378002 4 140671876 3 32325724 2
������� %R2 + ��������� %R2 + �������� %R2
42189 1645371 548457
+
8270 9741532
- ���� %R2 - �������
343 1645371
,
91729 19 487915 18 4114333 17
- ������ %R2 + ������ %R2 + ������� %R2
705159 705159 705159
+
1276987 16 13243117 15 16292173 14
- ������� %R2 - �������� %R2 - �������� %R2
235053 705159 705159
+
26536060 13 722714 12 5382578 11
- �������� %R2 - ������ %R2 - ������� %R2
705159 18081 100737
+
15449995 10 14279770 9 6603890 8
- �������� %R2 - �������� %R2 - ������� %R2
235053 235053 100737
+
409930 7 37340389 6 34893715 5
- ������ %R2 - �������� %R2 - �������� %R2
6027 705159 705159
+
26686318 4 801511 3 17206178 2
- �������� %R2 - ������ %R2 - �������� %R2
705159 26117 705159
+
4406102 377534
- ������� %R2 + ������
705159 705159
]
,
[%R3,
1184459 19 2335702 18 5460230 17
������� %R3 - ������� %R3 - ������� %R3
1645371 548457 182819
+
79900378 16 43953929 15 13420192 14
�������� %R3 + �������� %R3 + �������� %R3
1645371 548457 182819
+
553986 13 193381378 12 35978916 11
������ %R3 + ��������� %R3 + �������� %R3
3731 1645371 182819
+
358660781 10 271667666 9 118784873 8
��������� %R3 + ��������� %R3 + ��������� %R3
1645371 1645371 548457
+
337505020 7 1389370 6 688291 5
��������� %R3 + ������� %R3 + ������ %R3
1645371 11193 4459
+
3378002 4 140671876 3 32325724 2
������� %R3 + ��������� %R3 + �������� %R3
42189 1645371 548457
+
8270 9741532
- ���� %R3 - �������
343 1645371
,
91729 19 487915 18 4114333 17
- ������ %R3 + ������ %R3 + ������� %R3
705159 705159 705159
+
1276987 16 13243117 15 16292173 14
- ������� %R3 - �������� %R3 - �������� %R3
235053 705159 705159
+
26536060 13 722714 12 5382578 11
- �������� %R3 - ������ %R3 - ������� %R3
705159 18081 100737
+
15449995 10 14279770 9 6603890 8
- �������� %R3 - �������� %R3 - ������� %R3
235053 235053 100737
+
409930 7 37340389 6 34893715 5
- ������ %R3 - �������� %R3 - �������� %R3
6027 705159 705159
+
26686318 4 801511 3 17206178 2
- �������� %R3 - ������ %R3 - �������� %R3
705159 26117 705159
+
4406102 377534
- ������� %R3 + ������
705159 705159
]
,
[%R4,
1184459 19 2335702 18 5460230 17
������� %R4 - ������� %R4 - ������� %R4
1645371 548457 182819
+
79900378 16 43953929 15 13420192 14
�������� %R4 + �������� %R4 + �������� %R4
1645371 548457 182819
+
553986 13 193381378 12 35978916 11
������ %R4 + ��������� %R4 + �������� %R4
3731 1645371 182819
+
358660781 10 271667666 9 118784873 8
��������� %R4 + ��������� %R4 + ��������� %R4
1645371 1645371 548457
+
337505020 7 1389370 6 688291 5
��������� %R4 + ������� %R4 + ������ %R4
1645371 11193 4459
+
3378002 4 140671876 3 32325724 2
������� %R4 + ��������� %R4 + �������� %R4
42189 1645371 548457
+
8270 9741532
- ���� %R4 - �������
343 1645371
,
91729 19 487915 18 4114333 17
- ������ %R4 + ������ %R4 + ������� %R4
705159 705159 705159
+
1276987 16 13243117 15 16292173 14
- ������� %R4 - �������� %R4 - �������� %R4
235053 705159 705159
+
26536060 13 722714 12 5382578 11
- �������� %R4 - ������ %R4 - ������� %R4
705159 18081 100737
+
15449995 10 14279770 9 6603890 8
- �������� %R4 - �������� %R4 - ������� %R4
235053 235053 100737
+
409930 7 37340389 6 34893715 5
- ������ %R4 - �������� %R4 - �������� %R4
6027 705159 705159
+
26686318 4 801511 3 17206178 2
- �������� %R4 - ������ %R4 - �������� %R4
705159 26117 705159
+
4406102 377534
- ������� %R4 + ������
705159 705159
]
,
[%R5,
1184459 19 2335702 18 5460230 17
������� %R5 - ������� %R5 - ������� %R5
1645371 548457 182819
+
79900378 16 43953929 15 13420192 14
�������� %R5 + �������� %R5 + �������� %R5
1645371 548457 182819
+
553986 13 193381378 12 35978916 11
������ %R5 + ��������� %R5 + �������� %R5
3731 1645371 182819
+
358660781 10 271667666 9 118784873 8
��������� %R5 + ��������� %R5 + ��������� %R5
1645371 1645371 548457
+
337505020 7 1389370 6 688291 5
��������� %R5 + ������� %R5 + ������ %R5
1645371 11193 4459
+
3378002 4 140671876 3 32325724 2
������� %R5 + ��������� %R5 + �������� %R5
42189 1645371 548457
+
8270 9741532
- ���� %R5 - �������
343 1645371
,
91729 19 487915 18 4114333 17
- ������ %R5 + ������ %R5 + ������� %R5
705159 705159 705159
+
1276987 16 13243117 15 16292173 14
- ������� %R5 - �������� %R5 - �������� %R5
235053 705159 705159
+
26536060 13 722714 12 5382578 11
- �������� %R5 - ������ %R5 - ������� %R5
705159 18081 100737
+
15449995 10 14279770 9 6603890 8
- �������� %R5 - �������� %R5 - ������� %R5
235053 235053 100737
+
409930 7 37340389 6 34893715 5
- ������ %R5 - �������� %R5 - �������� %R5
6027 705159 705159
+
26686318 4 801511 3 17206178 2
- �������� %R5 - ������ %R5 - �������� %R5
705159 26117 705159
+
4406102 377534
- ������� %R5 + ������
705159 705159
]
,
[%R6,
1184459 19 2335702 18 5460230 17
������� %R6 - ������� %R6 - ������� %R6
1645371 548457 182819
+
79900378 16 43953929 15 13420192 14
�������� %R6 + �������� %R6 + �������� %R6
1645371 548457 182819
+
553986 13 193381378 12 35978916 11
������ %R6 + ��������� %R6 + �������� %R6
3731 1645371 182819
+
358660781 10 271667666 9 118784873 8
��������� %R6 + ��������� %R6 + ��������� %R6
1645371 1645371 548457
+
337505020 7 1389370 6 688291 5
��������� %R6 + ������� %R6 + ������ %R6
1645371 11193 4459
+
3378002 4 140671876 3 32325724 2
������� %R6 + ��������� %R6 + �������� %R6
42189 1645371 548457
+
8270 9741532
- ���� %R6 - �������
343 1645371
,
91729 19 487915 18 4114333 17
- ������ %R6 + ������ %R6 + ������� %R6
705159 705159 705159
+
1276987 16 13243117 15 16292173 14
- ������� %R6 - �������� %R6 - �������� %R6
235053 705159 705159
+
26536060 13 722714 12 5382578 11
- �������� %R6 - ������ %R6 - ������� %R6
705159 18081 100737
+
15449995 10 14279770 9 6603890 8
- �������� %R6 - �������� %R6 - ������� %R6
235053 235053 100737
+
409930 7 37340389 6 34893715 5
- ������ %R6 - �������� %R6 - �������� %R6
6027 705159 705159
+
26686318 4 801511 3 17206178 2
- �������� %R6 - ������ %R6 - �������� %R6
705159 26117 705159
+
4406102 377534
- ������� %R6 + ������
705159 705159
]
,
[%R7,
1184459 19 2335702 18 5460230 17
������� %R7 - ������� %R7 - ������� %R7
1645371 548457 182819
+
79900378 16 43953929 15 13420192 14
�������� %R7 + �������� %R7 + �������� %R7
1645371 548457 182819
+
553986 13 193381378 12 35978916 11
������ %R7 + ��������� %R7 + �������� %R7
3731 1645371 182819
+
358660781 10 271667666 9 118784873 8
��������� %R7 + ��������� %R7 + ��������� %R7
1645371 1645371 548457
+
337505020 7 1389370 6 688291 5
��������� %R7 + ������� %R7 + ������ %R7
1645371 11193 4459
+
3378002 4 140671876 3 32325724 2
������� %R7 + ��������� %R7 + �������� %R7
42189 1645371 548457
+
8270 9741532
- ���� %R7 - �������
343 1645371
,
91729 19 487915 18 4114333 17
- ������ %R7 + ������ %R7 + ������� %R7
705159 705159 705159
+
1276987 16 13243117 15 16292173 14
- ������� %R7 - �������� %R7 - �������� %R7
235053 705159 705159
+
26536060 13 722714 12 5382578 11
- �������� %R7 - ������ %R7 - ������� %R7
705159 18081 100737
+
15449995 10 14279770 9 6603890 8
- �������� %R7 - �������� %R7 - ������� %R7
235053 235053 100737
+
409930 7 37340389 6 34893715 5
- ������ %R7 - �������� %R7 - �������� %R7
6027 705159 705159
+
26686318 4 801511 3 17206178 2
- �������� %R7 - ������ %R7 - �������� %R7
705159 26117 705159
+
4406102 377534
- ������� %R7 + ������
705159 705159
]
,
[%R8,
1184459 19 2335702 18 5460230 17
������� %R8 - ������� %R8 - ������� %R8
1645371 548457 182819
+
79900378 16 43953929 15 13420192 14
�������� %R8 + �������� %R8 + �������� %R8
1645371 548457 182819
+
553986 13 193381378 12 35978916 11
������ %R8 + ��������� %R8 + �������� %R8
3731 1645371 182819
+
358660781 10 271667666 9 118784873 8
��������� %R8 + ��������� %R8 + ��������� %R8
1645371 1645371 548457
+
337505020 7 1389370 6 688291 5
��������� %R8 + ������� %R8 + ������ %R8
1645371 11193 4459
+
3378002 4 140671876 3 32325724 2
������� %R8 + ��������� %R8 + �������� %R8
42189 1645371 548457
+
8270 9741532
- ���� %R8 - �������
343 1645371
,
91729 19 487915 18 4114333 17
- ������ %R8 + ������ %R8 + ������� %R8
705159 705159 705159
+
1276987 16 13243117 15 16292173 14
- ������� %R8 - �������� %R8 - �������� %R8
235053 705159 705159
+
26536060 13 722714 12 5382578 11
- �������� %R8 - ������ %R8 - ������� %R8
705159 18081 100737
+
15449995 10 14279770 9 6603890 8
- �������� %R8 - �������� %R8 - ������� %R8
235053 235053 100737
+
409930 7 37340389 6 34893715 5
- ������ %R8 - �������� %R8 - �������� %R8
6027 705159 705159
+
26686318 4 801511 3 17206178 2
- �������� %R8 - ������ %R8 - �������� %R8
705159 26117 705159
+
4406102 377534
- ������� %R8 + ������
705159 705159
]
]
Type: List List RealClosure Fraction Integer
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty11}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty11}{ZeroDimensionalSolvePackageXmpPagePatch11}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty11}{\showpaste}
\tab{5}\spadcommand{lr := realSolve(lp)$pack\free{lp }\free{pack }\bound{lr }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch12}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull12}{ZeroDimensionalSolvePackageXmpPageEmpty12}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull12}{\hidepaste}
\tab{5}\spadcommand{\# lr\free{lr }}
\indentrel{3}\begin{verbatim}
(12) 8
Type: PositiveInteger
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty12}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty12}{ZeroDimensionalSolvePackageXmpPagePatch12}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty12}{\showpaste}
\tab{5}\spadcommand{\# lr\free{lr }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch13}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull13}{ZeroDimensionalSolvePackageXmpPageEmpty13}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull13}{\hidepaste}
\tab{5}\spadcommand{[[approximate(r,1/1000000) for r in point] for point in lr]\free{lr }}
\indentrel{3}\begin{verbatim}
(13)
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383477
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372224
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479421952
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,
765693
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]
,
5743879
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0845099008
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19739877
[��������,
2097152
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96106809728023675
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230843327485227859072891008119181102390650414_
13214326461239367948739333192706089607021381_
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01476602720625902225250555174182368889688380_
66366025744317604722402920931967294751602472_
68834121141893318848728661844434927287285112_
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50061128015164035227410373609905560544769495_
27059227070809593049491257519554708879259595_
52929920110858560812556635485429471554031675_
979542656381353984
,
-
512818926354822848909627639786894008060093841_
06630804594079663358450092641094905204598253_
16250084723010047035024497436523038925818959_
28931293158470135392762143543439867426304729_
39091228501338519906964902315660943719943337_
95070782624011727587749989296611277318372294_
62420711653791043655457414608288470130554391_
26204193548854107359401577758966028223645758_
64611831512943973974715166920465061850603762_
87516256195847052412587282839139194642913955
/
228828193977843933053120879318129047118363109_
24553689903863908242435094636442362497730806_
47438987739144921607794682653851741189091711_
74186814511497833728419182249767586835872948_
66447308566225526872092037244118004814057028_
37198310642291275676195774614443815996713502_
62939174978359004147086012775237299648862774_
26724876224800632688088893248918508424949343_
47337603075939980268208482904859678177751444_
65749979827872616963053217673201717237252096
]
]
Type: List List Fraction Integer
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty13}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty13}{ZeroDimensionalSolvePackageXmpPagePatch13}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty13}{\showpaste}
\tab{5}\spadcommand{[[approximate(r,1/1000000) for r in point] for point in lr]\free{lr }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch14}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull14}{ZeroDimensionalSolvePackageXmpPageEmpty14}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull14}{\hidepaste}
\tab{5}\spadcommand{lpr := positiveSolve(lp)$pack\free{lp }\free{pack }\bound{lpr }}
\indentrel{3}\begin{verbatim}
(14) []
Type: List List RealClosure Fraction Integer
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty14}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty14}{ZeroDimensionalSolvePackageXmpPagePatch14}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty14}{\showpaste}
\tab{5}\spadcommand{lpr := positiveSolve(lp)$pack\free{lp }\free{pack }\bound{lpr }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch15}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull15}{ZeroDimensionalSolvePackageXmpPageEmpty15}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull15}{\hidepaste}
\tab{5}\spadcommand{f0 := x**3 + y + z + t- 1\bound{f0 }}
\indentrel{3}\begin{verbatim}
3
(15) z + y + x + t - 1
Type: Polynomial Integer
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty15}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty15}{ZeroDimensionalSolvePackageXmpPagePatch15}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty15}{\showpaste}
\tab{5}\spadcommand{f0 := x**3 + y + z + t- 1\bound{f0 }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch16}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull16}{ZeroDimensionalSolvePackageXmpPageEmpty16}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull16}{\hidepaste}
\tab{5}\spadcommand{f1 := x + y**3 + z + t -1\bound{f1 }}
\indentrel{3}\begin{verbatim}
3
(16) z + y + x + t - 1
Type: Polynomial Integer
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty16}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty16}{ZeroDimensionalSolvePackageXmpPagePatch16}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty16}{\showpaste}
\tab{5}\spadcommand{f1 := x + y**3 + z + t -1\bound{f1 }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch17}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull17}{ZeroDimensionalSolvePackageXmpPageEmpty17}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull17}{\hidepaste}
\tab{5}\spadcommand{f2 := x + y + z**3 + t-1\bound{f2 }}
\indentrel{3}\begin{verbatim}
3
(17) z + y + x + t - 1
Type: Polynomial Integer
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty17}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty17}{ZeroDimensionalSolvePackageXmpPagePatch17}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty17}{\showpaste}
\tab{5}\spadcommand{f2 := x + y + z**3 + t-1\bound{f2 }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch18}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull18}{ZeroDimensionalSolvePackageXmpPageEmpty18}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull18}{\hidepaste}
\tab{5}\spadcommand{f3 := x + y + z + t**3 -1\bound{f3 }}
\indentrel{3}\begin{verbatim}
3
(18) z + y + x + t - 1
Type: Polynomial Integer
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty18}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty18}{ZeroDimensionalSolvePackageXmpPagePatch18}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty18}{\showpaste}
\tab{5}\spadcommand{f3 := x + y + z + t**3 -1\bound{f3 }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch19}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull19}{ZeroDimensionalSolvePackageXmpPageEmpty19}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull19}{\hidepaste}
\tab{5}\spadcommand{lf := [f0, f1, f2, f3]\free{f0 }\free{f1 }\free{f2 }\free{f3 }\bound{lf }}
\indentrel{3}\begin{verbatim}
(19)
3 3
[z + y + x + t - 1, z + y + x + t - 1,
3 3
z + y + x + t - 1, z + y + x + t - 1]
Type: List Polynomial Integer
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty19}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty19}{ZeroDimensionalSolvePackageXmpPagePatch19}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty19}{\showpaste}
\tab{5}\spadcommand{lf := [f0, f1, f2, f3]\free{f0 }\free{f1 }\free{f2 }\free{f3 }\bound{lf }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch20}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull20}{ZeroDimensionalSolvePackageXmpPageEmpty20}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull20}{\hidepaste}
\tab{5}\spadcommand{lts := triangSolve(lf)$pack\free{lf }\free{pack }\bound{lts }}
\indentrel{3}\begin{verbatim}
(20)
[
2 3 3
{t + t + 1, z - z - t + t,
3 2
(3z + 3t - 3)y
+
2 3 6 3 3 2
(3z + (6t - 6)z + 3t - 6t + 3)y + (3t - 3)z
+
6 3 9 6 3
(3t - 6t + 3)z + t - 3t + 5t - 3t
,
x + y + z}
,
16 13 10 7 4 2
{t - 6t + 9t + 4t + 15t - 54t + 27,
15 14 13
4907232t + 40893984t - 115013088t
+
12 11 10
22805712t + 36330336t + 162959040t
+
9 8 7
- 159859440t - 156802608t + 117168768t
+
6 5 4
126282384t - 129351600t + 306646992t
+
3 2
475302816t - 1006837776t - 237269088t
+
480716208
*
z
+
54 51 48 46 45
48t - 912t + 8232t - 72t - 46848t
+
43 42 40 39
1152t + 186324t - 3780t - 543144t
+
38 37 36 35
- 3168t - 21384t + 1175251t + 41184t
+
34 33 32 31
278003t - 1843242t - 301815t - 1440726t
+
30 29 28 27
1912012t + 1442826t + 4696262t - 922481t
+
26 25 24
- 4816188t - 10583524t - 208751t
+
23 22 21
11472138t + 16762859t - 857663t
+
20 19 18
- 19328175t - 18270421t + 4914903t
+
17 16 15
22483044t + 12926517t - 8605511t
+
14 13 12
- 17455518t - 5014597t + 8108814t
+
11 10 9 8
8465535t + 190542t - 4305624t - 2226123t
+
7 6 5 4
661905t + 1169775t + 226260t - 209952t
+
3
- 141183t + 27216t
,
3 2
(3z + 3t - 3)y
+
2 3 6 3 3 2
(3z + (6t - 6)z + 3t - 6t + 3)y + (3t - 3)z
+
6 3 9 6 3
(3t - 6t + 3)z + t - 3t + 5t - 3t
,
3
x + y + z + t - 1}
,
2 2
{t,z - 1,y - 1,x + y}, {t - 1,z,y - 1,x + y},
2
{t - 1,z - 1,z y + 1,x},
16 13 10 7 4 2
{t - 6t + 9t + 4t + 15t - 54t + 27,
29 28 27
4907232t + 40893984t - 115013088t
+
26 25 24
- 1730448t - 168139584t + 738024480t
+
23 22 21
- 195372288t + 315849456t - 2567279232t
+
20 19 18
937147968t + 1026357696t + 4780488240t
+
17 16
- 2893767696t - 5617160352t
+
15 14
- 3427651728t + 5001100848t
+
13 12 11
8720098416t + 2331732960t - 499046544t
+
10 9
- 16243306272t - 9748123200t
+
8 7 6
3927244320t + 25257280896t + 10348032096t
+
5 4 3
- 17128672128t - 14755488768t + 544086720t
+
2
10848188736t + 1423614528t - 2884297248
*
z
+
68 65 62 60 59
- 48t + 1152t - 13560t + 360t + 103656t
+
57 56 54 53
- 7560t - 572820t + 71316t + 2414556t
+
52 51 50 49
2736t - 402876t - 7985131t - 49248t
+
48 47 46 45
1431133t + 20977409t + 521487t - 2697635t
+
44 43 42
- 43763654t - 3756573t - 2093410t
+
41 40 39
71546495t + 19699032t + 35025028t
+
38 37 36
- 89623786t - 77798760t - 138654191t
+
35 34 33
87596128t + 235642497t + 349607642t
+
32 31 30
- 93299834t - 551563167t - 630995176t
+
29 28 27
186818962t + 995427468t + 828416204t
+
26 25 24
- 393919231t - 1076617485t - 1609479791t
+
23 22 21
595738126t + 1198787136t + 4342832069t
+
20 19 18
- 2075938757t - 4390835799t - 4822843033t
+
17 16 15
6932747678t + 6172196808t + 1141517740t
+
14 13 12
- 4981677585t - 9819815280t - 7404299976t
+
11 10 9
- 157295760t + 29124027630t + 14856038208t
+
8 7 6
- 16184101410t - 26935440354t - 3574164258t
+
5 4 3
10271338974t + 11191425264t + 6869861262t
+
2
- 9780477840t - 3586674168t + 2884297248
,
3 3 2 6 3 9
3z + (6t - 6)z + (6t - 12t + 3)z + 2t
+
6 3
- 6t + t + 3t
*
y
+
3 3 6 3 2
(3t - 3)z + (6t - 12t + 6)z
+
9 6 3 12 9 6 3
(4t - 12t + 11t - 3)z + t - 4t + 5t - 2t
,
3
x + y + z + t - 1}
,
2
{t - 1,z - 1,y,x + z},
8 7 6 5 4 3 2
{t + t + t - 2t - 2t - 2t + 19t + 19t - 8,
7 6 5
2395770t + 3934440t - 3902067t
+
4 3 2
- 10084164t - 1010448t + 32386932t
+
22413225t - 10432368
*
z
+
7 6 5 4
- 463519t + 3586833t + 9494955t - 8539305t
+
3 2
- 33283098t + 35479377t + 46263256t - 17419896
,
4 3 3 6 3 2
3z + (9t - 9)z + (12t - 24t + 9)z
+
3 6 4 3
(- 152t + 219t - 67)z - 41t + 57t + 25t
+
- 57t + 16
*
y
+
3 4 6 3 3
(3t - 3)z + (9t - 18t + 9)z
+
3 2
(- 181t + 270t - 89)z
+
6 4 3 7
(- 92t + 135t + 49t - 135t + 43)z + 27t
+
6 4 3
- 27t - 54t + 396t - 486t + 144
,
3
x + y + z + t - 1}
,
3
{t,z - t + 1,y - 1,x - 1}, {t - 1,z,y,x},
{t,z - 1,y,x}, {t,z,y - 1,x}, {t,z,y,x - 1}]
Type: List RegularChain(Integer,[x,y,z,t])
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty20}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty20}{ZeroDimensionalSolvePackageXmpPagePatch20}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty20}{\showpaste}
\tab{5}\spadcommand{lts := triangSolve(lf)$pack\free{lf }\free{pack }\bound{lts }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch21}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull21}{ZeroDimensionalSolvePackageXmpPageEmpty21}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull21}{\hidepaste}
\tab{5}\spadcommand{univariateSolve(lf)$pack\free{lf }\free{pack }}
\indentrel{3}\begin{verbatim}
(21)
[
[complexRoots= ?,
coordinates= [x - 1,y - 1,z + 1,t - %A]]
,
[complexRoots= ?,coordinates= [x,y - 1,z,t - %A]],
[complexRoots= ? - 1,coordinates= [x,y,z,t - %A]],
[complexRoots= ?,coordinates= [x - 1,y,z,t - %A]],
[complexRoots= ?,coordinates= [x,y,z - 1,t - %A]],
[complexRoots= ? - 2,
coordinates= [x - 1,y + 1,z,t - 1]]
,
[complexRoots= ?,coordinates= [x + 1,y - 1,z,t - 1]],
[complexRoots= ? - 1,
coordinates= [x - 1,y + 1,z - 1,t]]
,
[complexRoots= ? + 1,
coordinates= [x + 1,y - 1,z - 1,t]]
,
6 3 2
[complexRoots= ? - 2? + 3? - 3,
coordinates =
3 3
[2x + %A + %A - 1, 2y + %A + %A - 1, z - %A,
t - %A]
]
,
5 3 2
[complexRoots= ? + 3? - 2? + 3? - 3,
coordinates =
3
[x - %A,y - %A,z + %A + 2%A - 1,t - %A]
]
,
4 3 2
[complexRoots= ? - ? - 2? + 3,
coordinates =
3 3
[x + %A - %A - 1, y + %A - %A - 1,
3
z - %A + 2%A + 1, t - %A]
]
,
[complexRoots= ? + 1,
coordinates= [x - 1,y - 1,z,t - %A]]
,
6 3 2
[complexRoots= ? + 2? + 3? - 3,
coordinates =
3 3
[2x - %A - %A - 1, y + %A, 2z - %A - %A - 1,
t + %A]
]
,
6 4 3 2
[complexRoots= ? + 12? + 20? - 45? - 42? - 953,
coordinates =
[
5 4 3 2
12609x + 23%A + 49%A - 46%A + 362%A
+
- 5015%A - 8239
,
5 4 3 2
25218y + 23%A + 49%A - 46%A + 362%A
+
7594%A - 8239
,
5 4 3 2
25218z + 23%A + 49%A - 46%A + 362%A
+
7594%A - 8239
,
5 4 3 2
12609t + 23%A + 49%A - 46%A + 362%A
+
- 5015%A - 8239
]
]
,
5 3 2
[complexRoots= ? + 12? - 16? + 48? - 96,
coordinates =
3
[8x + %A + 8%A - 8,2y - %A,2z - %A,2t - %A]
]
,
5 4 3 2
[complexRoots= ? + ? - 5? - 3? + 9? + 3,
coordinates =
3 3
[2x - %A + 2%A - 1, 2y + %A - 4%A + 1,
3 3
2z - %A + 2%A - 1, 2t - %A + 2%A - 1]
]
,
4 3 2
[complexRoots= ? - 3? + 4? - 6? + 13,
coordinates =
3 2
[9x - 2%A + 4%A - %A + 2,
3 2
9y + %A - 2%A + 5%A - 1,
3 2
9z + %A - 2%A + 5%A - 1,
3 2
9t + %A - 2%A - 4%A - 1]
]
,
4 2
[complexRoots= ? - 11? + 37,
coordinates =
2 2 2
[3x - %A + 7, 6y + %A + 3%A - 7, 3z - %A + 7,
2
6t + %A - 3%A - 7]
]
,
[complexRoots= ? + 1,
coordinates= [x - 1,y,z - 1,t + 1]]
,
[complexRoots= ? + 2,
coordinates= [x,y - 1,z - 1,t + 1]]
,
[complexRoots= ? - 2,
coordinates= [x,y - 1,z + 1,t - 1]]
,
[complexRoots= ?,coordinates= [x,y + 1,z - 1,t - 1]],
[complexRoots= ? - 2,
coordinates= [x - 1,y,z + 1,t - 1]]
,
[complexRoots= ?,coordinates= [x + 1,y,z - 1,t - 1]],
4 3 2
[complexRoots= ? + 5? + 16? + 30? + 57,
coordinates =
3 2
[151x + 15%A + 54%A + 104%A + 93,
3 2
151y - 10%A - 36%A - 19%A - 62,
3 2
151z - 5%A - 18%A - 85%A - 31,
3 2
151t - 5%A - 18%A - 85%A - 31]
]
,
4 3 2
[complexRoots= ? - ? - 2? + 3,
coordinates =
3 3
[x - %A + 2%A + 1, y + %A - %A - 1, z - %A,
3
t + %A - %A - 1]
]
,
4 3 2
[complexRoots= ? + 2? - 8? + 48,
coordinates =
3
[8x - %A + 4%A - 8, 2y + %A,
3 3
8z + %A - 8%A + 8, 8t - %A + 4%A - 8]
]
,
5 4 3 2
[complexRoots= ? + ? - 2? - 4? + 5? + 8,
coordinates =
3 3 3
[3x + %A - 1,3y + %A - 1,3z + %A - 1,t - %A]
]
,
3
[complexRoots= ? + 3? - 1,
coordinates= [x - %A,y - %A,z - %A,t - %A]]
]
Type: List Record(complexRoots: SparseUnivariatePolynomial Integer,coordinates: List Polynomial Integer)
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty21}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty21}{ZeroDimensionalSolvePackageXmpPagePatch21}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty21}{\showpaste}
\tab{5}\spadcommand{univariateSolve(lf)$pack\free{lf }\free{pack }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch22}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull22}{ZeroDimensionalSolvePackageXmpPageEmpty22}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull22}{\hidepaste}
\tab{5}\spadcommand{ts := lts.1\free{lts }\bound{ts }}
\indentrel{3}\begin{verbatim}
(22)
2 3 3
{t + t + 1, z - z - t + t,
3 2
(3z + 3t - 3)y
+
2 3 6 3 3 2
(3z + (6t - 6)z + 3t - 6t + 3)y + (3t - 3)z
+
6 3 9 6 3
(3t - 6t + 3)z + t - 3t + 5t - 3t
,
x + y + z}
Type: RegularChain(Integer,[x,y,z,t])
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty22}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty22}{ZeroDimensionalSolvePackageXmpPagePatch22}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty22}{\showpaste}
\tab{5}\spadcommand{ts := lts.1\free{lts }\bound{ts }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch23}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull23}{ZeroDimensionalSolvePackageXmpPageEmpty23}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull23}{\hidepaste}
\tab{5}\spadcommand{univariateSolve(ts)$pack\free{ts }\free{pack }}
\indentrel{3}\begin{verbatim}
(23)
[
4 3 2
[complexRoots= ? + 5? + 16? + 30? + 57,
coordinates =
3 2
[151x + 15%A + 54%A + 104%A + 93,
3 2
151y - 10%A - 36%A - 19%A - 62,
3 2
151z - 5%A - 18%A - 85%A - 31,
3 2
151t - 5%A - 18%A - 85%A - 31]
]
,
4 3 2
[complexRoots= ? - ? - 2? + 3,
coordinates =
3 3
[x - %A + 2%A + 1, y + %A - %A - 1, z - %A,
3
t + %A - %A - 1]
]
,
4 3 2
[complexRoots= ? + 2? - 8? + 48,
coordinates =
3
[8x - %A + 4%A - 8, 2y + %A,
3 3
8z + %A - 8%A + 8, 8t - %A + 4%A - 8]
]
]
Type: List Record(complexRoots: SparseUnivariatePolynomial Integer,coordinates: List Polynomial Integer)
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty23}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty23}{ZeroDimensionalSolvePackageXmpPagePatch23}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty23}{\showpaste}
\tab{5}\spadcommand{univariateSolve(ts)$pack\free{ts }\free{pack }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch24}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull24}{ZeroDimensionalSolvePackageXmpPageEmpty24}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull24}{\hidepaste}
\tab{5}\spadcommand{realSolve(ts)$pack\free{ts }\free{pack }}
\indentrel{3}\begin{verbatim}
(24) []
Type: List List RealClosure Fraction Integer
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty24}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty24}{ZeroDimensionalSolvePackageXmpPagePatch24}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty24}{\showpaste}
\tab{5}\spadcommand{realSolve(ts)$pack\free{ts }\free{pack }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch25}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull25}{ZeroDimensionalSolvePackageXmpPageEmpty25}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull25}{\hidepaste}
\tab{5}\spadcommand{lr2 := realSolve(lf)$pack\free{lf }\free{pack }\bound{lr2 }}
\indentrel{3}\begin{verbatim}
(25)
[[0,- 1,1,1], [0,0,1,0], [1,0,0,0], [0,0,0,1],
[0,1,0,0], [1,0,%R37,- %R37], [1,0,%R38,- %R38],
[0,1,%R35,- %R35], [0,1,%R36,- %R36], [- 1,0,1,1],
[%R32,
1 15 2 14 1 13 4 12
�� %R32 + �� %R32 + �� %R32 - �� %R32
27 27 27 27
+
11 11 4 10 1 9 14 8
- �� %R32 - �� %R32 + �� %R32 + �� %R32
27 27 27 27
+
1 7 2 6 1 5 2 4 3
�� %R32 + � %R32 + � %R32 + � %R32 + %R32
27 9 3 9
+
4 2
� %R32 - %R32 - 2
3
,
1 15 1 14 1 13 2 12
- �� %R32 - �� %R32 - �� %R32 + �� %R32
54 27 54 27
+
11 11 2 10 1 9 7 8
�� %R32 + �� %R32 - �� %R32 - �� %R32
54 27 54 27
+
1 7 1 6 1 5 1 4 3
- �� %R32 - � %R32 - � %R32 - � %R32 - %R32
54 9 6 9
+
2 2 1 3
- � %R32 + � %R32 + �
3 2 2
,
1 15 1 14 1 13 2 12
- �� %R32 - �� %R32 - �� %R32 + �� %R32
54 27 54 27
+
11 11 2 10 1 9 7 8
�� %R32 + �� %R32 - �� %R32 - �� %R32
54 27 54 27
+
1 7 1 6 1 5 1 4 3
- �� %R32 - � %R32 - � %R32 - � %R32 - %R32
54 9 6 9
+
2 2 1 3
- � %R32 + � %R32 + �
3 2 2
]
,
[%R33,
1 15 2 14 1 13 4 12
�� %R33 + �� %R33 + �� %R33 - �� %R33
27 27 27 27
+
11 11 4 10 1 9 14 8
- �� %R33 - �� %R33 + �� %R33 + �� %R33
27 27 27 27
+
1 7 2 6 1 5 2 4 3
�� %R33 + � %R33 + � %R33 + � %R33 + %R33
27 9 3 9
+
4 2
� %R33 - %R33 - 2
3
,
1 15 1 14 1 13 2 12
- �� %R33 - �� %R33 - �� %R33 + �� %R33
54 27 54 27
+
11 11 2 10 1 9 7 8
�� %R33 + �� %R33 - �� %R33 - �� %R33
54 27 54 27
+
1 7 1 6 1 5 1 4 3
- �� %R33 - � %R33 - � %R33 - � %R33 - %R33
54 9 6 9
+
2 2 1 3
- � %R33 + � %R33 + �
3 2 2
,
1 15 1 14 1 13 2 12
- �� %R33 - �� %R33 - �� %R33 + �� %R33
54 27 54 27
+
11 11 2 10 1 9 7 8
�� %R33 + �� %R33 - �� %R33 - �� %R33
54 27 54 27
+
1 7 1 6 1 5 1 4 3
- �� %R33 - � %R33 - � %R33 - � %R33 - %R33
54 9 6 9
+
2 2 1 3
- � %R33 + � %R33 + �
3 2 2
]
,
[%R34,
1 15 2 14 1 13 4 12
�� %R34 + �� %R34 + �� %R34 - �� %R34
27 27 27 27
+
11 11 4 10 1 9 14 8
- �� %R34 - �� %R34 + �� %R34 + �� %R34
27 27 27 27
+
1 7 2 6 1 5 2 4 3
�� %R34 + � %R34 + � %R34 + � %R34 + %R34
27 9 3 9
+
4 2
� %R34 - %R34 - 2
3
,
1 15 1 14 1 13 2 12
- �� %R34 - �� %R34 - �� %R34 + �� %R34
54 27 54 27
+
11 11 2 10 1 9 7 8
�� %R34 + �� %R34 - �� %R34 - �� %R34
54 27 54 27
+
1 7 1 6 1 5 1 4 3
- �� %R34 - � %R34 - � %R34 - � %R34 - %R34
54 9 6 9
+
2 2 1 3
- � %R34 + � %R34 + �
3 2 2
,
1 15 1 14 1 13 2 12
- �� %R34 - �� %R34 - �� %R34 + �� %R34
54 27 54 27
+
11 11 2 10 1 9 7 8
�� %R34 + �� %R34 - �� %R34 - �� %R34
54 27 54 27
+
1 7 1 6 1 5 1 4 3
- �� %R34 - � %R34 - � %R34 - � %R34 - %R34
54 9 6 9
+
2 2 1 3
- � %R34 + � %R34 + �
3 2 2
]
,
[- 1,1,0,1], [- 1,1,1,0],
[%R23,
1 15 1 14 1 13 2 12
- �� %R23 - �� %R23 - �� %R23 + �� %R23
54 27 54 27
+
11 11 2 10 1 9 7 8
�� %R23 + �� %R23 - �� %R23 - �� %R23
54 27 54 27
+
1 7 1 6 1 5 1 4 3
- �� %R23 - � %R23 - � %R23 - � %R23 - %R23
54 9 6 9
+
2 2 1 3
- � %R23 + � %R23 + �
3 2 2
,
%R30,
1 15 1 14 1 13
- %R30 + �� %R23 + �� %R23 + �� %R23
54 27 54
+
2 12 11 11 2 10 1 9
- �� %R23 - �� %R23 - �� %R23 + �� %R23
27 54 27 54
+
7 8 1 7 1 6 1 5 1 4
�� %R23 + �� %R23 + � %R23 + � %R23 + � %R23
27 54 9 6 9
+
2 2 1 1
� %R23 - � %R23 - �
3 2 2
]
,
[%R23,
1 15 1 14 1 13 2 12
- �� %R23 - �� %R23 - �� %R23 + �� %R23
54 27 54 27
+
11 11 2 10 1 9 7 8
�� %R23 + �� %R23 - �� %R23 - �� %R23
54 27 54 27
+
1 7 1 6 1 5 1 4 3
- �� %R23 - � %R23 - � %R23 - � %R23 - %R23
54 9 6 9
+
2 2 1 3
- � %R23 + � %R23 + �
3 2 2
,
%R31,
1 15 1 14 1 13
- %R31 + �� %R23 + �� %R23 + �� %R23
54 27 54
+
2 12 11 11 2 10 1 9
- �� %R23 - �� %R23 - �� %R23 + �� %R23
27 54 27 54
+
7 8 1 7 1 6 1 5 1 4
�� %R23 + �� %R23 + � %R23 + � %R23 + � %R23
27 54 9 6 9
+
2 2 1 1
� %R23 - � %R23 - �
3 2 2
]
,
[%R24,
1 15 1 14 1 13 2 12
- �� %R24 - �� %R24 - �� %R24 + �� %R24
54 27 54 27
+
11 11 2 10 1 9 7 8
�� %R24 + �� %R24 - �� %R24 - �� %R24
54 27 54 27
+
1 7 1 6 1 5 1 4 3
- �� %R24 - � %R24 - � %R24 - � %R24 - %R24
54 9 6 9
+
2 2 1 3
- � %R24 + � %R24 + �
3 2 2
,
%R28,
1 15 1 14 1 13
- %R28 + �� %R24 + �� %R24 + �� %R24
54 27 54
+
2 12 11 11 2 10 1 9
- �� %R24 - �� %R24 - �� %R24 + �� %R24
27 54 27 54
+
7 8 1 7 1 6 1 5 1 4
�� %R24 + �� %R24 + � %R24 + � %R24 + � %R24
27 54 9 6 9
+
2 2 1 1
� %R24 - � %R24 - �
3 2 2
]
,
[%R24,
1 15 1 14 1 13 2 12
- �� %R24 - �� %R24 - �� %R24 + �� %R24
54 27 54 27
+
11 11 2 10 1 9 7 8
�� %R24 + �� %R24 - �� %R24 - �� %R24
54 27 54 27
+
1 7 1 6 1 5 1 4 3
- �� %R24 - � %R24 - � %R24 - � %R24 - %R24
54 9 6 9
+
2 2 1 3
- � %R24 + � %R24 + �
3 2 2
,
%R29,
1 15 1 14 1 13
- %R29 + �� %R24 + �� %R24 + �� %R24
54 27 54
+
2 12 11 11 2 10 1 9
- �� %R24 - �� %R24 - �� %R24 + �� %R24
27 54 27 54
+
7 8 1 7 1 6 1 5 1 4
�� %R24 + �� %R24 + � %R24 + � %R24 + � %R24
27 54 9 6 9
+
2 2 1 1
� %R24 - � %R24 - �
3 2 2
]
,
[%R25,
1 15 1 14 1 13 2 12
- �� %R25 - �� %R25 - �� %R25 + �� %R25
54 27 54 27
+
11 11 2 10 1 9 7 8
�� %R25 + �� %R25 - �� %R25 - �� %R25
54 27 54 27
+
1 7 1 6 1 5 1 4 3
- �� %R25 - � %R25 - � %R25 - � %R25 - %R25
54 9 6 9
+
2 2 1 3
- � %R25 + � %R25 + �
3 2 2
,
%R26,
1 15 1 14 1 13
- %R26 + �� %R25 + �� %R25 + �� %R25
54 27 54
+
2 12 11 11 2 10 1 9
- �� %R25 - �� %R25 - �� %R25 + �� %R25
27 54 27 54
+
7 8 1 7 1 6 1 5 1 4
�� %R25 + �� %R25 + � %R25 + � %R25 + � %R25
27 54 9 6 9
+
2 2 1 1
� %R25 - � %R25 - �
3 2 2
]
,
[%R25,
1 15 1 14 1 13 2 12
- �� %R25 - �� %R25 - �� %R25 + �� %R25
54 27 54 27
+
11 11 2 10 1 9 7 8
�� %R25 + �� %R25 - �� %R25 - �� %R25
54 27 54 27
+
1 7 1 6 1 5 1 4 3
- �� %R25 - � %R25 - � %R25 - � %R25 - %R25
54 9 6 9
+
2 2 1 3
- � %R25 + � %R25 + �
3 2 2
,
%R27,
1 15 1 14 1 13
- %R27 + �� %R25 + �� %R25 + �� %R25
54 27 54
+
2 12 11 11 2 10 1 9
- �� %R25 - �� %R25 - �� %R25 + �� %R25
27 54 27 54
+
7 8 1 7 1 6 1 5 1 4
�� %R25 + �� %R25 + � %R25 + � %R25 + � %R25
27 54 9 6 9
+
2 2 1 1
� %R25 - � %R25 - �
3 2 2
]
,
[1,%R21,- %R21,0], [1,%R22,- %R22,0],
[1,%R19,0,- %R19], [1,%R20,0,- %R20],
1 3 1 1 3 1 1 3 1
[%R17,- � %R17 + �,- � %R17 + �,- � %R17 + �],
3 3 3 3 3 3
1 3 1 1 3 1 1 3 1
[%R18,- � %R18 + �,- � %R18 + �,- � %R18 + �]]
3 3 3 3 3 3
Type: List List RealClosure Fraction Integer
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty25}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty25}{ZeroDimensionalSolvePackageXmpPagePatch25}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty25}{\showpaste}
\tab{5}\spadcommand{lr2 := realSolve(lf)$pack\free{lf }\free{pack }\bound{lr2 }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch26}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull26}{ZeroDimensionalSolvePackageXmpPageEmpty26}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull26}{\hidepaste}
\tab{5}\spadcommand{\#lr2\free{lr2 }}
\indentrel{3}\begin{verbatim}
(26) 27
Type: PositiveInteger
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty26}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty26}{ZeroDimensionalSolvePackageXmpPagePatch26}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty26}{\showpaste}
\tab{5}\spadcommand{\#lr2\free{lr2 }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch27}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull27}{ZeroDimensionalSolvePackageXmpPageEmpty27}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull27}{\hidepaste}
\tab{5}\spadcommand{lpr2 := positiveSolve(lf)$pack\free{lf }\free{pack }\bound{lpr2 }}
\indentrel{3}\begin{verbatim}
(27)
1 3 1 1 3 1 1 3 1
[[%R40,- � %R40 + �,- � %R40 + �,- � %R40 + �]]
3 3 3 3 3 3
Type: List List RealClosure Fraction Integer
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty27}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty27}{ZeroDimensionalSolvePackageXmpPagePatch27}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty27}{\showpaste}
\tab{5}\spadcommand{lpr2 := positiveSolve(lf)$pack\free{lf }\free{pack }\bound{lpr2 }}
\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPagePatch28}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageFull28}{ZeroDimensionalSolvePackageXmpPageEmpty28}
\pastebutton{ZeroDimensionalSolvePackageXmpPageFull28}{\hidepaste}
\tab{5}\spadcommand{[approximate(r,1/10**21)::Float for r in lpr2.1]\free{lpr2 }}
\indentrel{3}\begin{verbatim}
(28)
[0.3221853546 2608559291, 0.3221853546 2608559291,
0.3221853546 2608559291, 0.3221853546 2608559291]
Type: List Float
\end{verbatim}
\indentrel{-3}\end{paste}\end{patch}
\begin{patch}{ZeroDimensionalSolvePackageXmpPageEmpty28}
\begin{paste}{ZeroDimensionalSolvePackageXmpPageEmpty28}{ZeroDimensionalSolvePackageXmpPagePatch28}
\pastebutton{ZeroDimensionalSolvePackageXmpPageEmpty28}{\showpaste}
\tab{5}\spadcommand{[approximate(r,1/10**21)::Float for r in lpr2.1]\free{lpr2 }}
\end{paste}\end{patch}
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