Multiplication Table of 34 | 34 Times Table with Chart
Nivedita Dar8 Jan, 2026
At first, learning the table of 34 could seem hard, especially when you compare it to lower numbers. But it might be much easier if you know the patterns that are there. When trying to uncover sequence patterns in bigger three-digit computations, a lot of pupils find it helpful to compare it to the table of 345, 342, 347, or even 349. You may establish a strong base for mental math that goes beyond conventional multiplication by focusing on the multiples of 34.
Multiplication Table of 34 Chart (1 to 10)
For quick reference, here is the multiplication chart for the number 34 up to 10. You can use this to verify your calculations or to practice recitation.
|
Multiplicand |
Multiplier |
Result (Multiple) |
|
34 |
1 |
34 |
|
34 |
2 |
68 |
|
34 |
3 |
102 |
|
34 |
4 |
136 |
|
34 |
5 |
170 |
|
34 |
6 |
204 |
|
34 |
7 |
238 |
|
34 |
8 |
272 |
|
34 |
9 |
306 |
|
34 |
10 |
340 |
Multiplication Table of 34 Chart (11 to 20)
Once you've mastered the first ten, extending your knowledge to the next ten multiples is a great way to improve your speed in competitive exams.
|
Multiplicand |
Multiplier |
Result (Multiple) |
|
34 |
11 |
374 |
|
34 |
12 |
408 |
|
34 |
13 |
442 |
|
34 |
14 |
476 |
|
34 |
15 |
510 |
|
34 |
16 |
544 |
|
34 |
17 |
578 |
|
34 |
18 |
612 |
|
34 |
19 |
646 |
|
34 |
20 |
680 |
Simple Tricks to Memorize the 34 Times Table
If you're struggling to keep these numbers in your head, don't worry. There are several logical tricks you can use to reconstruct the table whenever you need it.
1. The Double of 17 Method
A very reliable trick is to use the table of 17. Since 34 is exactly double of 17, every multiple of 34 is simply the corresponding multiple of 17 multiplied by 2. For example, if you know that 17 \times 3 = 51, then 34 \times 3 must be 51 \times 2 = 102.
2. The Decomposition Method (30 + 4)
You can break 34 down into 30 + To find 34 times 6, multiply 30 by 6 (180) and 4 by 6 (24), then add them together:180 + 24 = 204.
3. Observe the One's Place Pattern
The digits in the one's place of the table of 34 follow a specific repeating pattern: 4, 8, 2, 6, 0.
-
34 \times 1 = 3\mathbf{4}
-
34 \times 2 = 6\mathbf{8}
-
34 \times 3 = 10\mathbf{2}
-
34 \times 4 = 13\mathbf{6}
-
34 \times 5 = 17\mathbf{0}
-
34 \times 6 = 20\mathbf{4}
Practical Examples
-
Example 1: If a shopkeeper sells 34 pens every day, how many pens will he sell in a week (7 days)?
Solution: Using the table of 34, we find 2134 \times 7 = 238.22 So, he sells 238 pens in a week. -
Example 2: Jessica earns 18 per hour. If she works for 34 hours, what is her total income?
Solution: Here, we calculate 34 \times 18. From our extended table, 2334 \times 18 = 612.24 Jessica earns 612.
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