Binary (base 2) to Base 9 Table - Base Number

Binary (base 2) to Base 9 Conversion Table

Quick Find Conversion Table

***0 - 23***
binary (base 2) to base 9
0₁₀	= 0₂	= 0₉
1₁₀	= 1₂	= 1₉
2₁₀	= 10₂	= 2₉
3₁₀	= 11₂	= 3₉
4₁₀	= 100₂	= 4₉
5₁₀	= 101₂	= 5₉
6₁₀	= 110₂	= 6₉
7₁₀	= 111₂	= 7₉
8₁₀	= 1000₂	= 8₉
9₁₀	= 1001₂	= 10₉
10₁₀	= 1010₂	= 11₉
11₁₀	= 1011₂	= 12₉
12₁₀	= 1100₂	= 13₉
13₁₀	= 1101₂	= 14₉
14₁₀	= 1110₂	= 15₉
15₁₀	= 1111₂	= 16₉
16₁₀	= 10000₂	= 17₉
17₁₀	= 10001₂	= 18₉
18₁₀	= 10010₂	= 20₉
19₁₀	= 10011₂	= 21₉
20₁₀	= 10100₂	= 22₉
21₁₀	= 10101₂	= 23₉
22₁₀	= 10110₂	= 24₉

***23 - 46***
binary (base 2) to base 9
23₁₀	= 10111₂	= 25₉
24₁₀	= 11000₂	= 26₉
25₁₀	= 11001₂	= 27₉
26₁₀	= 11010₂	= 28₉
27₁₀	= 11011₂	= 30₉
28₁₀	= 11100₂	= 31₉
29₁₀	= 11101₂	= 32₉
30₁₀	= 11110₂	= 33₉
31₁₀	= 11111₂	= 34₉
32₁₀	= 100000₂	= 35₉
33₁₀	= 100001₂	= 36₉
34₁₀	= 100010₂	= 37₉
35₁₀	= 100011₂	= 38₉
36₁₀	= 100100₂	= 40₉
37₁₀	= 100101₂	= 41₉
38₁₀	= 100110₂	= 42₉
39₁₀	= 100111₂	= 43₉
40₁₀	= 101000₂	= 44₉
41₁₀	= 101001₂	= 45₉
42₁₀	= 101010₂	= 46₉
43₁₀	= 101011₂	= 47₉
44₁₀	= 101100₂	= 48₉
45₁₀	= 101101₂	= 50₉

***46 - 69***
binary (base 2) to base 9
46₁₀	= 101110₂	= 51₉
47₁₀	= 101111₂	= 52₉
48₁₀	= 110000₂	= 53₉
49₁₀	= 110001₂	= 54₉
50₁₀	= 110010₂	= 55₉
51₁₀	= 110011₂	= 56₉
52₁₀	= 110100₂	= 57₉
53₁₀	= 110101₂	= 58₉
54₁₀	= 110110₂	= 60₉
55₁₀	= 110111₂	= 61₉
56₁₀	= 111000₂	= 62₉
57₁₀	= 111001₂	= 63₉
58₁₀	= 111010₂	= 64₉
59₁₀	= 111011₂	= 65₉
60₁₀	= 111100₂	= 66₉
61₁₀	= 111101₂	= 67₉
62₁₀	= 111110₂	= 68₉
63₁₀	= 111111₂	= 70₉
64₁₀	= 1000000₂	= 71₉
65₁₀	= 1000001₂	= 72₉
66₁₀	= 1000010₂	= 73₉
67₁₀	= 1000011₂	= 74₉
68₁₀	= 1000100₂	= 75₉

***69 - 92***
binary (base 2) to base 9
69₁₀	= 1000101₂	= 76₉
70₁₀	= 1000110₂	= 77₉

Popular conversions

binary (base 2)

In mathematics and digital electronics, a binary number is a number expressed in the binary numeral system or base-2 numeral system which represents numeric values using two different symbols: typically 0 (zero) and 1 (one). The base-2 system is a positional notation with a radix of 2. Because of its straightforward implementation in digital electronic circuitry using logic gates, the binary system is used internally by almost all modern computers and computer-based devices. Each digit is referred to as a bit.

Binary (base 2) Conversion

base 9

base 9 is a positional numeral system with nine as its base. It uses 9 different digits for representing numbers. The digits for base 9 could be 0, 1, 2, 3, 4, 5, 6, 7, and 8.

Base 9 Conversion