Base 31 to Senary (base 6) Conversion Table

Quick Find Conversion Table

0 - 23
base 31 to senary (base 6)
010 = 031= 06
110 = 131= 16
210 = 231= 26
310 = 331= 36
410 = 431= 46
510 = 531= 56
610 = 631= 106
710 = 731= 116
810 = 831= 126
910 = 931= 136
1010 = a31= 146
1110 = b31= 156
1210 = c31= 206
1310 = d31= 216
1410 = e31= 226
1510 = f31= 236
1610 = g31= 246
1710 = h31= 256
1810 = i31= 306
1910 = j31= 316
2010 = k31= 326
2110 = l31= 336
2210 = m31= 346
23 - 46
base 31 to senary (base 6)
2310 = n31= 356
2410 = o31= 406
2510 = p31= 416
2610 = q31= 426
2710 = r31= 436
2810 = s31= 446
2910 = t31= 456
3010 = u31= 506
3110 = 1031= 516
3210 = 1131= 526
3310 = 1231= 536
3410 = 1331= 546
3510 = 1431= 556
3610 = 1531= 1006
3710 = 1631= 1016
3810 = 1731= 1026
3910 = 1831= 1036
4010 = 1931= 1046
4110 = 1a31= 1056
4210 = 1b31= 1106
4310 = 1c31= 1116
4410 = 1d31= 1126
4510 = 1e31= 1136
46 - 69
base 31 to senary (base 6)
4610 = 1f31= 1146
4710 = 1g31= 1156
4810 = 1h31= 1206
4910 = 1i31= 1216
5010 = 1j31= 1226
5110 = 1k31= 1236
5210 = 1l31= 1246
5310 = 1m31= 1256
5410 = 1n31= 1306
5510 = 1o31= 1316
5610 = 1p31= 1326
5710 = 1q31= 1336
5810 = 1r31= 1346
5910 = 1s31= 1356
6010 = 1t31= 1406
6110 = 1u31= 1416
6210 = 2031= 1426
6310 = 2131= 1436
6410 = 2231= 1446
6510 = 2331= 1456
6610 = 2431= 1506
6710 = 2531= 1516
6810 = 2631= 1526
69 - 92
base 31 to senary (base 6)
6910 = 2731= 1536
7010 = 2831= 1546

base 31

base 31 is a positional numeral system with thirty-one as its base. It uses 31 different digits for representing numbers. The digits for base 31 could be 0, 1, 2, 3, 4, 5, 6, 7, 8, 9, a, b, c, d, e, f, g, h, i, j, k, l, m, n, o, p, q, r, s, t, and u.

senary (base 6)

The senary numeral system (also known as base-6 or heximal) has six as its base. It has been adopted independently by a small number of cultures. Like decimal, it is a semiprime, though being the product of the only two consecutive numbers that are both prime (2 and 3) it has a high degree of mathematical properties for its size. As six is a superior highly composite number, many of the arguments made in favor of the duodecimal system also apply to this base-6.