decimal | base 2 |
---|---|

0 | 0 |

1 | 1 |

2 | 10 |

3 | 11 |

4 | 100 |

5 | 101 |

6 | 110 |

7 | 111 |

8 | 1000 |

9 | 1001 |

decimal | base 2 |
---|---|

10 | 1010 |

11 | 1011 |

12 | 1100 |

13 | 1101 |

14 | 1110 |

15 | 1111 |

16 | 10000 |

17 | 10001 |

18 | 10010 |

19 | 10011 |

decimal | base 2 |
---|---|

20 | 10100 |

21 | 10101 |

22 | 10110 |

23 | 10111 |

24 | 11000 |

25 | 11001 |

26 | 11010 |

27 | 11011 |

28 | 11100 |

29 | 11101 |

decimal | base 2 |
---|---|

30 | 11110 |

31 | 11111 |

32 | 100000 |

33 | 100001 |

34 | 100010 |

35 | 100011 |

36 | 100100 |

37 | 100101 |

38 | 100110 |

39 | 100111 |

- Binary (base 2) to Base 10
- Binary (base 2) to Base 11
- Binary (base 2) to Base 12
- Binary (base 2) to Base 13
- Binary (base 2) to Base 14
- Binary (base 2) to Base 15
- Binary (base 2) to Base 16
- Binary (base 2) to Base 17
- Binary (base 2) to Base 18
- Binary (base 2) to Base 19
- Binary (base 2) to Base 2
- Binary (base 2) to Base 20
- Binary (base 2) to Base 21
- Binary (base 2) to Base 22
- Binary (base 2) to Base 23
- Binary (base 2) to Base 24
- Binary (base 2) to Base 25
- Binary (base 2) to Base 26
- Binary (base 2) to Base 27
- Binary (base 2) to Base 28
- Binary (base 2) to Base 29
- Binary (base 2) to Base 3
- Binary (base 2) to Base 30
- Binary (base 2) to Base 31
- Binary (base 2) to Base 32
- Binary (base 2) to Base 33
- Binary (base 2) to Base 34
- Binary (base 2) to Base 35
- Binary (base 2) to Base 36
- Binary (base 2) to Base 4
- Binary (base 2) to Base 5
- Binary (base 2) to Base 6
- Binary (base 2) to Base 7
- Binary (base 2) to Base 8
- Binary (base 2) to Base 9
- Binary (base 2) to Decimal
- Binary (base 2) to Duodecimal (base 12)
- Binary (base 2) to Hexadecimal (base 16)
- Binary (base 2) to Hexatrigesimal (base 36)
- Binary (base 2) to Octal (base 8)
- Binary (base 2) to Quaternary (base 4)
- Binary (base 2) to Quinary (base 5)
- Binary (base 2) to Senary (base 6)
- Binary (base 2) to Ternary (base 3)
- Binary (base 2) to Hexadecimal (base 16)

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.