# Multiplication Table From 106 to 110 With Explanation

## **106 to 110 Multiplication Table With Explanation**

Here are the multiplication tables from 106 to 110 table, along with explanations:

106 | 107 | 108 | 109 | 110 |
---|---|---|---|---|

106 | 107 | 108 | 109 | 110 |

212 | 214 | 216 | 218 | 220 |

318 | 321 | 324 | 327 | 330 |

424 | 428 | 432 | 436 | 440 |

530 | 535 | 540 | 545 | 550 |

636 | 642 | 648 | 654 | 660 |

742 | 749 | 756 | 763 | 770 |

848 | 856 | 864 | 872 | 880 |

954 | 963 | 972 | 981 | 990 |

1060 | 1070 | 1080 | 1090 | 1100 |

Let’s break down and explain each column (106 to 110) in detail, focusing on how the numbers in each column are derived.

**Column 1: Table of 106**

106 | Explanation |
---|---|

106 | 106 × 1 = 106 |

212 | 106 × 2 = 212 |

318 | 106 × 3 = 318 |

424 | 106 × 4 = 424 |

530 | 106 × 5 = 530 |

636 | 106 × 6 = 636 |

742 | 106 × 7 = 742 |

848 | 106 × 8 = 848 |

954 | 106 × 9 = 954 |

1060 | 106 × 10 = 1060 |

**Explanation**:

- Start with 106. Multiply it by increasing numbers from 1 to 10.
- Each result is simply adding 106 more than the previous result.
- For example, 106 + 106 = 212 (which is 106 × 2), then 212 + 106 = 318 (which is 106 × 3), and so on.

**Column 2: Table of 107**

107 | Explanation |
---|---|

107 | 107 × 1 = 107 |

214 | 107 × 2 = 214 |

321 | 107 × 3 = 321 |

428 | 107 × 4 = 428 |

535 | 107 × 5 = 535 |

642 | 107 × 6 = 642 |

749 | 107 × 7 = 749 |

856 | 107 × 8 = 856 |

963 | 107 × 9 = 963 |

1070 | 107 × 10 = 1070 |

**Explanation**:

- Start with 107 and multiply by numbers from 1 to 10.
- Each time we go to the next row, add 107 to the previous result.
- For instance, 107 + 107 = 214 (107 × 2), 214 + 107 = 321 (107 × 3), etc.

**Column 3: Table of 108**

108 | Explanation |
---|---|

108 | 108 × 1 = 108 |

216 | 108 × 2 = 216 |

324 | 108 × 3 = 324 |

432 | 108 × 4 = 432 |

540 | 108 × 5 = 540 |

648 | 108 × 6 = 648 |

756 | 108 × 7 = 756 |

864 | 108 × 8 = 864 |

972 | 108 × 9 = 972 |

1080 | 108 × 10 = 1080 |

**Explanation**:

- Begin with 108 and continue multiplying by integers from 1 to 10.
- The table adds 108 each time to the previous number.
- For example, 108 + 108 = 216 (108 × 2), and so forth.

**Column 4: Table of 109**

109 | Explanation |
---|---|

109 | 109 × 1 = 109 |

218 | 109 × 2 = 218 |

327 | 109 × 3 = 327 |

436 | 109 × 4 = 436 |

545 | 109 × 5 = 545 |

654 | 109 × 6 = 654 |

763 | 109 × 7 = 763 |

872 | 109 × 8 = 872 |

981 | 109 × 9 = 981 |

1090 | 109 × 10 = 1090 |

**Explanation**:

- Start with 109 and multiply by increasing integers.
- The result is always the previous result plus 109.
- For instance, 109 + 109 = 218 (109 × 2), and so on.

**Column 5: Table of 110**

110 | Explanation |
---|---|

110 | 110 × 1 = 110 |

220 | 110 × 2 = 220 |

330 | 110 × 3 = 330 |

440 | 110 × 4 = 440 |

550 | 110 × 5 = 550 |

660 | 110 × 6 = 660 |

770 | 110 × 7 = 770 |

880 | 110 × 8 = 880 |

990 | 110 × 9 = 990 |

1100 | 110 × 10 = 1100 |

**Explanation**:

- Start with 110 and keep multiplying by numbers from 1 to 10.
- Each number is simply 110 added to the previous total.
- For instance, 110 + 110 = 220 (110 × 2), and so forth.

**Summary of the Patterns**

- Each table starts with its base number (106, 107, 108, 109, 110).
- The number increases in increments equal to the base number as you go down the table.
- The 10th multiple of each table is just the base number followed by a zero, indicating it has been multiplied by 10.

Understanding these patterns helps in quick mental math and in recognizing how multiplication scales numbers predictably.

### Explanation:

**Understanding the Pattern**:- Each column represents the multiplication table of a number from 106 to 110.
- Each row multiplies the base number (106, 107, etc.) by the corresponding multiplier (1, 2, 3,… up to 10).

**Example Calculations**:**106 Table**: The first row is 106 (106 × 1). The second row is 212 (106 × 2), and so on until 1060 (106 × 10).**107 Table**: The first row is 107 (107 × 1). The second row is 214 (107 × 2), and so on until 1070 (107 × 10).

**Observing Increments**:- In the table of 106, the difference between consecutive values is consistently 106 (e.g., 106 to 212 is an increment of 106).
- Similarly, for 107, the difference between consecutive values is 107, and this pattern holds for each table.

**General Pattern**:- For any number n, the m-th row in its multiplication table is calculated as n x m.
- The last entry in each column corresponds to n×10, which is just the number followed by a zero (e.g., 1100 for 110 × 10).

This explanation helps in understanding how multiplication tables work and how the values are derived by simply multiplying the base number by consecutive integers from 1 to 10.