Fast calculation can make a huge difference in exams, especially when students are solving Maths, Physics, or Chemistry questions under time pressure. Many students know the concept behind a problem, but they still lose marks because calculations take too long or careless multiplication mistakes appear in the final steps. That is why multiplication shortcuts are so useful.
These tricks are not meant to replace understanding. They are meant to improve speed, reduce repeated effort, and help students feel more confident while solving questions in the exam hall. When used correctly, fast multiplication tricks can save valuable time and improve accuracy.
At Deeksha Vedantu, we always encourage students to combine concept clarity with calculation speed. If your basics are strong and your mental maths improves, your overall exam performance becomes much smoother.
Why Fast Multiplication Tricks Matter in Exams
Students often spend too much time on calculations that can be handled in a shorter way.
Benefits of Learning Multiplication Shortcuts
| Benefit | Why it helps |
| Saves time | Reduces time spent on repeated calculations |
| Reduces rough work | Makes simple multiplication mentally manageable |
| Improves confidence | Students feel more in control during numericals |
| Supports multiple subjects | Useful in Maths, Physics, Chemistry, and aptitude practice |
| Improves speed with accuracy | Helps students finish calculations more cleanly |
These tricks are especially helpful in subjects where calculations appear again and again.
Quick Overview of the Most Useful Multiplication Tricks
This table gives students a quick summary before they study each trick in detail.
Trick Summary Table
| Trick | Best used for |
| Multiply by 11 | Two-digit numbers |
| Numbers close to 100 | Values in the 90s or slightly below 100 |
| Square just above 100 | 101, 102, 104, 107 and similar values |
| Square ending in 5 | 25, 35, 45, 105 and similar numbers |
| Multiply by 5 | Even and odd numbers with quick halving |
| Multiply by 25 | Numbers divisible or nearly divisible by 4 |
| Break-the-number method | Numbers close to 10, 20, 50, or 100 |
Trick 1: Multiply Any Two-Digit Number by 11
This is one of the easiest and most useful multiplication tricks.
How the Trick Works
If a two-digit number is written as ab, then:
- keep the first digit
- add the two digits
- keep the second digit
Example 1
52 × 11
Step 1
Write the number in the pattern:
5 _ 2
Step 2
Add the two digits:
5 + 2 = 7
Step 3
Place 7 in the middle.
Answer
52 × 11 = 572
Example 2
35 × 11
Step 1
Write the number in the pattern:
3 _ 5
Step 2
Add the digits:
3 + 5 = 8
Step 3
Place 8 in the middle.
Answer
35 × 11 = 385
Carry Case in the ×11 Trick
Sometimes the middle sum becomes 10 or more. In that case, students must carry properly.
Carry Rule Table
| Situation | What to do |
| Middle sum is a single digit | Write it directly in the middle |
| Middle sum is two digits | Carry the first digit to the left side |
Example 1
65 × 11
Step 1
Add the digits:
6 + 5 = 11
Step 2
Write 11 in the middle and carry 1 to 6.
Answer
65 × 11 = 715
Example 2
89 × 11
Step 1
Add the digits:
8 + 9 = 17
Step 2
Write 17 in the middle and carry 1 to 8.
Answer
89 × 11 = 979
Example 3
99 × 11
Step 1
Add the digits:
9 + 9 = 18
Step 2
Carry carefully across the digits.
Answer
99 × 11 = 1089
Trick 2: Multiply Numbers Close to 100
This trick is very useful for multiplying numbers in the 90s.
How the Trick Works
If both numbers are close to 100:
- write how much each number is below 100
- subtract crosswise
- multiply the shortfall numbers
- write the final answer carefully with two digits at the end
Example 1
98 × 97
Step 1
Find how far each number is from 100:
- 98 is 2 less than 100
- 97 is 3 less than 100
Step 2
Cross subtract:
98 – 3 = 95
or
97 – 2 = 95
Step 3
Multiply the shortfalls:
2 × 3 = 6
Write it as 06 because the last part should contain two digits.
Answer
98 × 97 = 9506
Example 2
95 × 94
Step 1
Find the shortfalls:
- 95 is 5 less than 100
- 94 is 6 less than 100
Step 2
Cross subtract:
95 – 6 = 89
Step 3
Multiply the shortfalls:
5 × 6 = 30
Answer
95 × 94 = 8930
Example 3
93 × 96
Step 1
Find the shortfalls:
- 93 is 7 less than 100
- 96 is 4 less than 100
Step 2
Cross subtract:
93 – 4 = 89
Step 3
Multiply the shortfalls:
7 × 4 = 28
Answer
93 × 96 = 8928
Trick 3: Square of Numbers Just Above 100
This is a very useful shortcut for numbers like 101, 102, 104, 107, and similar values.
How the Trick Works
If the number is 100 + n, then:
- add n to the original number
- square n
- place the squared value as the last two digits when needed
Example 1
104²
Step 1
The extra part above 100 is 4.
Step 2
Add 4 to 104:
104 + 4 = 108
Step 3
Square the extra part:
4² = 16
Answer
104² = 10816
Example 2
107²
Step 1
The extra part above 100 is 7.
Step 2
Add 7 to 107:
107 + 7 = 114
Step 3
Square the extra part:
7² = 49
Answer
107² = 11449
Trick 4: Square of Numbers Ending in 5
This is one of the most famous and easiest mental maths tricks.
How the Trick Works
If a number ends in 5:
- take the part before 5
- multiply it by its next number
- write 25 at the end
Quick Rule Table
| Number pattern | Shortcut |
| n5 squared | n × (n + 1), then write 25 |
Example 1
25²
Step 1
The number before 5 is 2.
Step 2
Multiply 2 by the next number 3:
2 × 3 = 6
Step 3
Write 25 at the end.
Answer
25² = 625
Example 2
45²
Step 1
The number before 5 is 4.
Step 2
Multiply 4 by 5:
4 × 5 = 20
Step 3
Write 25 at the end.
Answer
45² = 2025
Example 3
35²
Step 1
The number before 5 is 3.
Step 2
Multiply 3 by 4:
3 × 4 = 12
Step 3
Write 25 at the end.
Answer
35² = 1225
Example 4
105²
Step 1
The number before 5 is 10.
Step 2
Multiply 10 by 11:
10 × 11 = 110
Step 3
Write 25 at the end.
Answer
105² = 11025
Trick 5: Quick Multiplication by 5
This trick is extremely useful because multiplying by 5 appears often in calculations.
How the Trick Works
To multiply any number by 5:
- divide the number by 2
- multiply the result by 10
In shortcut form, that usually means:
- divide by 2
- attach one zero
Example 1
68 × 5
Step 1
Divide 68 by 2:
68 ÷ 2 = 34
Step 2
Add one zero.
Answer
68 × 5 = 340
Example 2
74 × 5
Step 1
Divide 74 by 2:
74 ÷ 2 = 37
Step 2
Add one zero.
Answer
74 × 5 = 370
What About Odd Numbers in the ×5 Trick
For odd numbers, dividing by 2 gives a decimal. In that case, remove the decimal after multiplying by 10.
Example 3
65 × 5
Step 1
Divide 65 by 2:
65 ÷ 2 = 32.5
Step 2
Multiply by 10:
32.5 × 10 = 325
Answer
65 × 5 = 325
Example 4
48 × 5
Step 1
Divide 48 by 2:
48 ÷ 2 = 24
Step 2
Add one zero.
Answer
48 × 5 = 240
Trick 6: Break-the-Number Method
This is also called the distributive shortcut. It works well when one of the numbers is close to a round number such as 10, 20, 50, or 100.
How the Trick Works
Break one number into an easier form, then distribute.
Best Situations to Use It
| Nearby round number | Example style |
| 10 | 9 or 11 |
| 20 | 19 or 21 |
| 50 | 49 or 52 |
| 100 | 98 or 103 |
Example 1
18 × 47
Step 1
Break 47 as 50 – 3.
Step 2
Apply distribution:
18 × 47 = 18 × (50 – 3)
Step 3
Multiply separately:
= 18 × 50 – 18 × 3
= 900 – 54
Answer
18 × 47 = 846
Example 2
65 × 19
Step 1
Break 19 as 20 – 1.
Step 2
Apply distribution:
65 × 19 = 65 × (20 – 1)
Step 3
Multiply separately:
= 65 × 20 – 65 × 1
= 1300 – 65
Answer
65 × 19 = 1235
Trick 7: Quick Multiplication by 25
This trick is very useful because multiplying by 25 is the same as dividing by 4 and then multiplying by 100.
How the Trick Works
To multiply a number by 25:
- divide the number by 4
- add two zeros
Example 1
72 × 25
Step 1
Divide 72 by 4:
72 ÷ 4 = 18
Step 2
Add two zeros.
Answer
72 × 25 = 1800
Example 2
84 × 25
Step 1
Divide 84 by 4:
84 ÷ 4 = 21
Step 2
Add two zeros.
Answer
84 × 25 = 2100
Example 3
76 × 25
Step 1
Divide 76 by 4:
76 ÷ 4 = 19
Step 2
Add two zeros.
Answer
76 × 25 = 1900
What If the Number Is Not Fully Divisible by 4
Students can still use the same idea.
Example
78 × 25
Step 1
Divide 78 by 4:
78 ÷ 4 = 19.5
Step 2
Multiply by 100:
19.5 × 100 = 1950
Answer
78 × 25 = 1950
Bonus Mini Trick: Multiply 9 by a Single-Digit Number
A simple mental pattern can also help in small cases.
Example
9 × 5 = 45
This is basic multiplication, but students should memorise all 9 times table values for instant calculation in exams.
Which Tricks Are Most Useful in Board Exams
Different tricks help in different question types.
Most Useful During Exams
| Trick | Why it helps in exams |
| Multiply by 11 | Useful in rapid arithmetic and simplification |
| Numbers close to 100 | Useful in mental multiplication of two-digit numbers |
| Square ending in 5 | Very common in quick square-based calculations |
| Multiply by 5 | Appears often in unit conversions and arithmetic steps |
| Multiply by 25 | Useful in percentage and fraction-related calculations |
| Break-the-number method | Helps with awkward numbers near round values |
These appear often in simplification, mensuration, algebra, and numerical questions.
How to Use These Tricks Safely in Exams
Shortcuts are useful only when applied carefully.
Best Practice Rules
| Rule | Why it matters |
| Use a trick only if you remember it confidently | Prevents new mistakes under pressure |
| Check the final number of digits where needed | Avoids place-value errors |
| Be careful with carries in 11 multiplication | Prevents wrong middle placement |
| Do not force a shortcut if the normal method feels faster | Smart speed is better than forced speed |
| Practise before exams so the trick becomes natural | Shortcuts work best when familiar |
Common Mistakes Students Make While Using Tricks
These mistakes are common and easy to avoid with practice.
Mistake 1: Forgetting Carry in the ×11 Trick
For numbers like 65 × 11, students sometimes write the middle digits incorrectly instead of carrying them properly.
Mistake 2: Forgetting Leading Zero in Numbers Close to 100
For 98 × 97, the last part should be written as 06, not just 6.
Mistake 3: Mixing Up the Rule for Multiplying by 5 and 25
For ×5, divide by 2 and add one zero.
For ×25, divide by 4 and add two zeros.
Mistake 4: Using the Wrong Number in the Square-Ending-in-5 Trick
Students must multiply the number before 5 by its next number, not by itself.
Mistake 5: Choosing the Wrong Number to Break
In the break-the-number method, students should choose the number that is closer to a round value.
Common Mistakes Table
| Mistake | Correct idea |
| Wrong carry in ×11 trick | Add the digits carefully and carry to the left when needed |
| Missing 0 in close-to-100 trick | Write the last part with two digits |
| Confusing ×5 and ×25 rules | ×5 means divide by 2; ×25 means divide by 4 |
| Wrong use of square-ending-in-5 trick | Multiply the leading part by its next number |
| Forcing a bad break number | Choose a nearby round number like 10, 20, 50, or 100 |
How Students Can Practise These Tricks Daily
Mental maths improves only through repeated use.
Simple Daily Practice Plan
| Daily task | Practice count |
| ×11 questions | 5 |
| Close-to-100 questions | 5 |
| Square-ending-in-5 questions | 5 |
| ×5 or ×25 questions | 5 |
| Break-the-number questions | 2 |
This short routine can improve calculation speed quickly.
Fast Revision Summary
This section is useful before exams.
Trick Recap Table
| Trick | Shortcut idea |
| Multiply by 11 | Add the two digits and place the sum in the middle |
| Close to 100 | Use shortfalls, cross subtract, then multiply shortfalls |
| Square just above 100 | Add the extra part and write its square at the end |
| Square ending in 5 | Multiply the number before 5 by its next number and write 25 |
| Multiply by 5 | Divide by 2 and add one zero |
| Multiply by 25 | Divide by 4 and add two zeros |
| Break the number | Use distribution with a nearby round number |
Practice Questions for Students
Important Practice Questions
- 43 × 11
- 76 × 11
- 99 × 98
- 96 × 94
- 103²
- 115²
- 86 × 5
- 92 × 25
- 23 × 49 using the break-the-number method
- 67 × 19 using the break-the-number method
FAQs
Q1. Why should students learn fast multiplication tricks?
Fast multiplication tricks help students save time, reduce rough work, and improve calculation speed during exams.
Q2. Are these tricks useful only for Maths exams?
No. These tricks are also useful in Physics, Chemistry, and any subject where calculations are required.
Q3. How do I multiply a two-digit number by 11 quickly?
Write the two digits, add them, and place the sum in the middle. If the middle sum is two digits, carry properly.
Q4. How do I quickly square numbers ending in 5?
Multiply the number before 5 by its next number and write 25 at the end.
Q5. How do I multiply a number by 5 quickly?
Divide the number by 2 and then multiply by 10, which is usually the same as adding one zero after halving.
Q6. How do I multiply a number by 25 quickly?
Divide the number by 4 and then multiply by 100, which usually means adding two zeros.
Q7. What is the easiest trick for numbers close to 100?
Find how much each number is below 100, subtract crosswise, then multiply the shortfalls.
Q8. Should I use shortcuts for every multiplication in the exam?
No. Use shortcuts only when you remember them clearly and they actually make the calculation faster for you.
Conclusion
Fast multiplication tricks can genuinely help students calculate more quickly and confidently in exams. They are especially useful when time is limited and repeated calculations appear across different subjects. The main goal of these tricks is not to impress anyone with speed. The real goal is to reduce effort, improve accuracy, and help students focus more on solving the question itself.
The best way to master these tricks is to practise them regularly before exams so that they become natural. At Deeksha Vedantu, we always encourage students to build both conceptual strength and calculation speed, because together they create strong exam performance.
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