#
# Pentanomial primitive polynomials over GF(2)
# The coefficients/bits (apart from the constant and the leading term)
# are as close to the low end as possible.
#.
# Generated by Joerg Arndt, 2003-January-30
#

5,3,2,1,0
6,4,3,1,0
7,3,2,1,0
8,4,3,2,0
9,4,3,1,0
10,4,3,1,0
11,4,2,1,0
12,6,4,1,0
13,4,3,1,0
14,5,3,1,0
15,4,2,1,0
16,5,3,2,0
17,3,2,1,0
18,5,2,1,0
19,5,2,1,0
20,6,4,1,0
21,5,2,1,0
22,5,4,3,0
23,5,3,1,0
24,4,3,1,0
25,3,2,1,0
26,6,2,1,0
27,5,2,1,0
28,6,4,1,0
29,4,2,1,0
30,6,4,1,0
31,3,2,1,0
32,7,6,2,0
33,6,4,1,0
34,8,4,3,0
35,8,7,1,0
36,8,7,1,0
37,6,4,1,0
38,6,5,1,0
39,7,4,1,0
40,5,4,3,0
41,3,2,1,0
42,7,4,3,0
43,6,4,3,0
44,6,5,2,0
45,4,3,1,0
46,8,7,6,0
47,5,4,1,0
48,9,7,4,0
49,6,5,4,0
50,4,3,2,0
51,6,3,1,0
52,6,3,1,0
53,6,2,1,0
54,8,6,3,0
55,6,2,1,0
56,7,4,2,0
57,5,3,2,0
58,6,5,1,0
59,7,4,2,0
60,5,4,2,0
61,5,2,1,0
62,6,5,3,0
63,5,4,1,0
64,4,3,1,0
65,4,3,1,0
66,9,8,6,0
67,5,2,1,0
68,7,5,1,0
69,6,5,2,0
70,5,3,1,0
71,5,3,1,0
72,10,9,3,0
73,4,3,2,0
74,7,4,3,0
75,6,3,1,0
76,5,4,2,0
77,6,5,2,0
78,7,2,1,0
79,4,3,2,0
80,9,4,2,0
81,6,3,2,0
82,9,6,4,0
83,7,4,2,0
84,9,7,1,0
85,8,2,1,0
86,6,5,2,0
87,7,5,1,0
88,11,9,8,0
89,6,5,3,0
90,5,3,2,0
91,8,5,1,0
92,6,5,2,0
93,6,3,2,0
94,6,5,1,0
95,7,5,1,0
96,10,9,6,0
97,6,4,2,0
98,8,7,1,0
99,7,5,4,0
100,8,7,2,0
101,7,6,1,0
102,6,5,3,0
103,9,4,1,0
104,11,10,1,0
105,7,5,2,0
106,6,5,1,0
107,9,7,4,0
108,12,11,5,0
109,5,4,2,0
110,6,4,1,0
111,7,4,2,0
112,11,6,4,0
113,5,3,2,0
114,11,2,1,0
115,8,7,5,0
116,6,5,2,0
117,5,2,1,0
118,6,5,2,0
119,9,7,4,0
120,9,6,2,0
121,8,5,1,0
122,6,2,1,0
123,8,4,1,0
124,7,6,5,0
125,7,6,5,0
126,7,4,2,0
127,7,3,1,0
128,7,2,1,0
129,5,4,1,0
130,5,2,1,0
131,8,3,2,0
132,9,5,2,0
133,9,8,2,0
134,7,5,1,0
135,6,4,3,0
136,8,3,2,0
137,11,4,1,0
138,8,7,1,0
139,8,5,3,0
140,8,4,1,0
141,13,6,1,0
142,10,3,1,0
143,5,3,2,0
144,7,4,2,0
145,6,5,1,0
146,5,3,2,0
147,11,4,2,0
148,7,5,3,0
149,10,9,7,0
150,8,3,2,0
151,3,2,1,0
152,6,3,2,0
153,8,5,4,0
154,9,5,1,0
155,7,5,4,0
156,9,5,3,0
157,6,5,2,0
158,8,6,5,0
159,11,6,3,0
160,5,3,2,0
161,6,3,2,0
162,8,7,4,0
163,7,6,3,0
164,12,6,5,0
165,9,8,3,0
166,10,3,2,0
167,6,4,2,0
168,16,9,6,0
169,8,6,5,0
170,9,4,1,0
171,6,5,2,0
172,11,7,3,0
173,8,5,2,0
174,9,8,5,0
175,6,4,2,0
176,12,11,9,0
177,5,3,2,0
178,8,7,2,0
179,4,2,1,0
180,12,10,7,0
181,7,6,1,0
182,8,6,1,0
183,8,7,4,0
184,9,8,7,0
185,8,3,1,0
186,9,8,6,0
187,7,6,5,0
188,6,5,2,0
189,6,5,2,0
190,13,6,2,0
191,7,6,4,0
192,15,11,5,0
193,9,7,4,0
194,4,3,2,0
195,8,3,2,0
196,11,9,2,0
197,9,4,2,0
198,15,8,5,0
199,9,4,1,0
200,5,3,2,0
201,6,3,2,0
202,7,6,4,0
203,8,7,1,0
204,10,4,3,0
205,9,5,2,0
206,10,9,5,0
207,9,6,1,0
208,9,3,1,0
209,5,3,2,0
210,12,4,3,0
211,11,10,8,0
212,7,4,3,0
213,6,5,2,0
214,5,3,1,0
215,6,5,3,0
216,7,3,1,0
217,6,5,4,0
218,8,7,1,0
219,8,4,1,0
220,12,10,9,0
221,8,6,2,0
222,8,5,2,0
223,5,4,2,0
224,12,7,2,0
225,10,5,1,0
226,10,7,3,0
227,10,9,4,0
228,12,11,2,0
229,10,4,1,0
230,8,7,6,0
231,7,4,2,0
232,11,9,4,0
233,9,4,1,0
234,11,7,4,0
235,9,6,1,0
236,10,8,7,0
237,7,4,1,0
238,5,2,1,0
239,12,7,1,0
240,8,5,3,0
241,9,8,4,0
242,11,6,1,0
243,8,5,1,0
244,9,4,1,0
245,6,4,1,0
246,11,2,1,0
247,9,4,2,0
248,15,14,10,0
249,7,4,1,0
250,10,5,3,0
251,7,4,2,0
252,11,5,1,0
253,7,3,2,0
254,7,2,1,0
255,5,3,2,0
256,10,5,2,0
257,7,6,2,0
258,9,6,4,0
259,10,6,2,0
260,10,8,7,0
261,7,6,4,0
262,9,8,4,0
263,11,5,2,0
264,10,9,1,0
265,5,3,2,0
266,7,6,1,0
267,8,6,3,0
268,10,4,1,0
269,7,6,1,0
270,10,7,3,0
271,11,7,6,0
272,9,6,2,0
273,7,2,1,0
274,9,7,2,0
275,11,10,9,0
276,6,3,1,0
277,12,6,3,0
278,5,4,1,0
279,5,4,1,0
280,9,5,2,0
281,9,4,1,0
282,10,5,4,0
283,12,7,5,0
284,8,6,5,0
285,10,7,5,0
286,15,10,1,0
287,6,5,2,0
288,11,10,1,0
289,12,4,3,0
290,5,3,2,0
291,12,11,5,0
292,7,3,1,0
293,11,6,1,0
294,9,3,2,0
295,5,4,2,0
296,11,9,4,0
297,5,4,1,0
298,11,8,4,0
299,11,6,4,0
300,13,12,10,0
301,9,5,2,0
302,12,9,5,0
303,13,12,6,0
304,11,2,1,0
305,7,6,2,0
306,7,3,1,0
307,8,4,2,0
308,15,9,2,0
309,10,6,4,0
310,8,5,1,0
311,7,5,3,0
312,11,10,5,0
313,7,3,1,0
314,14,9,3,0
315,10,9,1,0
316,12,11,7,0
317,7,4,2,0
318,8,6,5,0
319,11,2,1,0
320,4,3,1,0
321,7,5,2,0
322,17,2,1,0
323,10,3,1,0
324,6,4,3,0
325,10,5,2,0
326,10,3,1,0
327,8,5,2,0
328,9,7,5,0
329,8,6,3,0
330,8,7,2,0
331,10,6,2,0
332,12,11,7,0
333,8,4,2,0
334,7,4,1,0
335,10,7,2,0
336,7,4,1,0
337,10,6,1,0
338,6,3,2,0
339,16,10,7,0
340,11,4,3,0
341,14,11,5,0
342,11,2,1,0
343,10,8,5,0
344,11,10,6,0
345,8,4,2,0
346,11,7,2,0
347,11,10,3,0
348,8,7,4,0
349,6,5,2,0
350,14,13,10,0
351,8,6,3,0
352,13,11,6,0
353,9,7,4,0
354,14,13,5,0
355,6,5,1,0
356,10,9,7,0
357,11,10,2,0
358,14,8,7,0
359,9,7,1,0
360,26,25,1,0
361,7,4,1,0
362,18,8,7,0
363,8,5,3,0
364,12,5,1,0
365,9,6,5,0
366,14,7,4,0
367,9,4,2,0
368,17,9,7,0
369,11,10,2,0
370,5,3,2,0
371,8,3,2,0
372,15,7,3,0
373,8,7,2,0
374,8,6,5,0
375,8,7,1,0
376,8,7,5,0
377,8,3,1,0
378,15,13,4,0
379,10,8,5,0
380,14,6,3,0
381,5,2,1,0
382,18,7,3,0
383,9,5,1,0
384,16,15,6,0
385,6,4,2,0
386,10,6,5,0
387,9,8,2,0
388,14,3,1,0
389,10,9,5,0
390,13,10,2,0
391,6,2,1,0
392,13,10,6,0
393,7,2,1,0
394,8,7,2,0
395,11,6,5,0
396,7,6,4,0
397,12,7,6,0
398,14,6,5,0
399,11,9,2,0
400,5,3,2,0
