**Decimal to Binary Table: **The decimal to binary conversion table can be a handy tool when you need to convert between decimal and binary numbers. Binary numbers are made up of 1s and 0s, just like digital information. Decimal numbers are the number system we use in everyday life. Most calculators and computers use a decimal number system, where each number is represented by ten digits. To convert a decimal number into its binary equivalent, just look up the row corresponding to the decimal number and find the column that corresponds to the first digit of the binary number.

**The process of converting between decimal and binary**

**Processes of conversion:**

Divide the sum by 2 to get the answer.

Determine the quotient of the integers for the following iteration.

Determine the remainder that should be applied to the binary digit.

It is necessary to repeat the processes till the quotient reaches 0.

**Decimal to Binary Table | Decimal to Binary Chart**

Decimal Number | Binary Number | Hex Number |
---|---|---|

0 | 0 | 0 |

1 | 1 | 1 |

2 | 10 | 2 |

3 | 11 | 3 |

4 | 100 | 4 |

5 | 101 | 5 |

6 | 110 | 6 |

7 | 111 | 7 |

8 | 1000 | 8 |

9 | 1001 | 9 |

10 | 1010 | A |

11 | 1011 | B |

12 | 1100 | C |

13 | 1101 | D |

14 | 1110 | E |

15 | 1111 | F |

16 | 10000 | 10 |

17 | 10001 | 11 |

18 | 10010 | 12 |

19 | 10011 | 13 |

20 | 10100 | 14 |

21 | 10101 | 15 |

22 | 10110 | 16 |

23 | 10111 | 17 |

24 | 11000 | 18 |

25 | 11001 | 19 |

26 | 11010 | 1A |

27 | 11011 | 1B |

28 | 11100 | 1C |

29 | 11101 | 1D |

30 | 11110 | 1E |

31 | 11111 | 1F |

32 | 100000 | 20 |

64 | 1000000 | 40 |

128 | 10000000 | 80 |

256 | 100000000 | 100 |

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