![](http://spiderimg1.safalta.com/assets/images/safalta.com/2022/02/23/750x506/2-times-table_1645588119.jpeg)
Source: Safalta.com
As a school student, when you remember maths tables 2 to 20 by your heart, it boosts up your confidence about solving long calculation in the shorter time period and increase your interest in Mathematics subject. Scroll down the page and learn the maths table 2 to 20 from the building block structure in an easy and efficient method. Also, check some tricks and tips to pick up on tables. Join Safalta School Online and prepare for Board Exams under the guidance of our expert faculty. Our online school aims to help students prepare for Board Exams by ensuring that students have conceptual clarity in all the subjects and are able to score their maximum in the exams.Table Of Contents-
2. Multiplication table of 2
3. Tips for 2 times table
Multiplication Table of 2 Chart- 2 Times Table
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)
Multiplication Table of 2
Table of 2 is a basic table and is very easy to recite and learn. Let us learn how to obtain and memorize the table of 2. Basic things to observe in the table of 2 are:
- Table of 2 follows the pattern of 2, 4, 6, 8, 0 at one's digit place.
- It always has even numbers.
- It is easier because it can be learned with the help of skip counting as 2, 4, 6, 8 . . . and so on.
Go through the 2 times table that is given below for fast calculations.
2 × 1 = 2 |
2 × 2 = 4 |
2 × 3 = 6 |
2 × 4 = 8 |
2 × 5 = 10 |
2 × 6 = 12 |
2 × 7 = 14 |
2 × 8 = 16 |
2 × 9 = 18 |
2 × 10 = 20 |
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Tips for 2 Times Table
1. 2 times table follows the pattern of even numbers only. 2, 4, 6, 8, 10, 12, 14, 16, 18, 20 . . . .
2. Another way to memorize the table of 2 is by the addition pattern.
3. To memorize 2 times table, we can take help from 1 times table.
We add all the natural numbers from 1 to 10 to the multiple of 1 times table.
For example:
- 1 × 1 + 1 = 1 + 1 = 2 (multiple of 2)
- 1 × 2 + 2 = 2 + 2 = 4 (multiple of 2)
- 1 × 3 + 3 = 3 + 3 = 6 (multiple of 2)
- 1 × 4 + 4 = 4 + 4 = 8 (multiple of 2)
- 1 × 5 + 5 = 5 + 5 = 10 (multiple of 2) and so on.
Multiplication Tables
Table of 2 from 11 to 20
2 × 11 = 22 |
2 × 12 = 24 |
2 × 13 = 26 |
2 × 14 = 28 |
2 × 15 = 30 |
2 × 16 = 32 |
2 × 17 = 34 |
2 × 18 = 36 |
2 × 19 = 38 |
2 × 20 = 40 |
Multiplication Tables
Worksheet on Table of 2
Solving 2 times table worksheets will help you learn multiplication facts for the 2 times tables up to 2 × 10. These questions will help you to evaluate your understandings of the multiplication tables.
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Example 1: If Ria eats 2 chocolates per day, Using the table of 2 find how many chocolates will she have eaten at the end of the 4th day?
Solution:
Per day chocolates = 2
Chocolates at the end of 4th day = 2 × 4 = 8 chocolates
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Example 2: Using 2 times table, find 2 times 2 times 2 times 2?
Solution:
First, we will write 2 times 2 times 2 times 2 mathematically i.e. 2 × 2 × 2 × 2 = 16
Using 2 times table, we have: 2 times 2 times 2 times 2 = 16
Hence, 2 times 2 times 2 times 2 is 16.
What is the importance of learning Table 2 to 20?
How can I learn tables easily?
What is the value of 2 X 9?
What is the value of 2 X 7?
What are the 2 times tables?
- 2 x 1 = 2.
- 2 x 2 = 4.
- 2 x 3 = 6.
- 2 x 4 = 8.
- 2 x 5 = 10.
- 2 x 6 = 12.
- 2 x 7 = 14.
- 2 x 8 = 16.