1: Mod(1, 2)*x^8 + Mod(1, 2)*x^6 + Mod(1, 2)*x^4 + Mod(1, 2)*x^2 + Mod(1, 2)
2: Mod(1, 3)*x^8 + Mod(1, 3)*x^6 + Mod(1, 3)*x^4 + Mod(1, 3)*x^2 + Mod(1, 3)
3: Mod(1, 4294967295)*x^8 + Mod(1, 4294967295)*x^6 + Mod(1, 4294967295)*x^4 
+ Mod(1, 4294967295)*x^2 + Mod(1, 4294967295)
4: Mod(1, 18446744073709551615)*x^8 + Mod(1, 18446744073709551615)*x^6 + Mod
(1, 18446744073709551615)*x^4 + Mod(1, 18446744073709551615)*x^2 + Mod(1, 18
446744073709551615)
5: Mod(1, 100000000000000000000)*x^8 + Mod(1, 100000000000000000000)*x^6 + M
od(1, 100000000000000000000)*x^4 + Mod(1, 100000000000000000000)*x^2 + Mod(1
, 100000000000000000000)
1: Mod(1, 2)*x^8 + Mod(1, 2)*x^6 + Mod(1, 2)*x^4 + Mod(1, 2)*x^2 + Mod(1, 2)
2: Mod(1, 3)*x^8 + Mod(1, 3)*x^7 + Mod(2, 3)*x^5 + Mod(2, 3)*x^4 + Mod(2, 3)
*x^3 + Mod(1, 3)*x + Mod(1, 3)
3: Mod(1, 4294967295)*x^8 + Mod(4294967293, 4294967295)*x^7 + Mod(3, 4294967
295)*x^6 + Mod(4294967291, 4294967295)*x^5 + Mod(5, 4294967295)*x^4 + Mod(42
94967291, 4294967295)*x^3 + Mod(3, 4294967295)*x^2 + Mod(4294967293, 4294967
295)*x + Mod(1, 4294967295)
4: Mod(1, 18446744073709551615)*x^8 + Mod(18446744073709551613, 184467440737
09551615)*x^7 + Mod(3, 18446744073709551615)*x^6 + Mod(18446744073709551611,
 18446744073709551615)*x^5 + Mod(5, 18446744073709551615)*x^4 + Mod(18446744
073709551611, 18446744073709551615)*x^3 + Mod(3, 18446744073709551615)*x^2 +
 Mod(18446744073709551613, 18446744073709551615)*x + Mod(1, 1844674407370955
1615)
5: Mod(1, 100000000000000000000)*x^8 + Mod(99999999999999999998, 10000000000
0000000000)*x^7 + Mod(3, 100000000000000000000)*x^6 + Mod(999999999999999999
96, 100000000000000000000)*x^5 + Mod(5, 100000000000000000000)*x^4 + Mod(999
99999999999999996, 100000000000000000000)*x^3 + Mod(3, 100000000000000000000
)*x^2 + Mod(99999999999999999998, 100000000000000000000)*x + Mod(1, 10000000
0000000000000)
1: [Mod(1, 2), Mod(0, 2); Mod(1, 2), Mod(0, 2)]
2: [Mod(0, 3), Mod(0, 3); Mod(2, 3), Mod(2, 3)]
3: [Mod(4294967286, 4294967295), Mod(6, 4294967295); Mod(4294967276, 4294967
295), Mod(14, 4294967295)]
4: [Mod(18446744073709551606, 18446744073709551615), Mod(6, 1844674407370955
1615); Mod(18446744073709551596, 18446744073709551615), Mod(14, 184467440737
09551615)]
5: [Mod(99999999999999999991, 100000000000000000000), Mod(6, 100000000000000
000000); Mod(99999999999999999981, 100000000000000000000), Mod(14, 100000000
000000000000)]
1: [Mod(1, 2), Mod(0, 2); Mod(1, 2), Mod(0, 2)]
2: [Mod(1, 3), Mod(1, 3); Mod(0, 3), Mod(1, 3)]
3: [Mod(7, 4294967295), Mod(10, 4294967295); Mod(15, 4294967295), Mod(22, 42
94967295)]
4: [Mod(7, 18446744073709551615), Mod(10, 18446744073709551615); Mod(15, 184
46744073709551615), Mod(22, 18446744073709551615)]
5: [Mod(7, 100000000000000000000), Mod(10, 100000000000000000000); Mod(15, 1
00000000000000000000), Mod(22, 100000000000000000000)]
Mod(Mod(1, y), x)
Mod(Mod(1, y), x)
error("forbidden division t_INT % t_STR.")
error("impossible inverse in %: 0.")
error("impossible inverse in %: 0.")
error("inconsistent division t_SER % t_POL.")
Mod(x, x^2)
Mod(x, x^2)
Mod(x, x^2)
Mod(1, 3)
Mod(-x, x^2 + 1)
[Mod(1, 2), Mod(0, 2)]
Mod(1, 2)*x
Mod(1, y)*x
Mod(0, 2)
Mod(0, 2)
  *** _^_: Warning: Mod(a,b)^n with n >> b : wasteful.
Mod(2, 7)
  *** _^_: Warning: Mod(a,b)^n with n >> b : wasteful.
Mod(4, 7)
1
Total time spent: 0
