Vedic Maths for Competitive Exams

In today’s competitive world, exams are the gateway to opportunities—whether it's for higher studies 🧑‍🎓, securing a dream job 🧑‍💻, or gaining admission to a top college 🏛️. Key sections like Quantitative Aptitude 🔢 and Data Interpretation 📊 often play a decisive role in these exams. To excel, you need fast, accurate calculations and a strong command over numbers 💪.

Vedic Maths—an ancient Indian system—boosts calculation speed and confidence with powerful techniques that can make all the difference in exam performance. But with so many concepts, how do you know which are essential for competitive exams? Welcome2Maths has designed a course specifically for YOU: Vedic Maths for Competitive Exams 🌟. We’ve carefully selected the most effective Vedic Maths concepts, tricks, and tools 🔧 to give you a competitive edge. Get ready to excel in exams with confidence and speed!

What You get in this Course

  • 40+ High Value recorded lectures covering concepts of Vedic Maths that can give you an edge in Competitive Exams.
  • Access to all existing Lectures immediately after enrolment. You can self-pace the learning of modules according to your convenience.
  • 300+ Practice Questions to apply the learned concepts.
  • Every exercise sheet is accompanied by detailed solutions sheet so that you can check where you can increase speed and improve accuracy
  • Validity of 1 Year: Access to all updates during the validity period of the Enrolment.

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Benefits of learning Vedic Maths

Makes Math Fun

Increase Your Speed

Improves Logical Reasoning

Improve Your Accuracy

Good Marks In Exam

Beat the Competition

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Course Curriculum

🌱Vedic Maths Start: Let's Begin!
  • LECTURE - INTRODUCTION to the Course 👍
  • Pre-Course Test 📑
🧩Vedic Math Basics: Building Blocks
  • LECTURE- Fast Addition Concept
  • PRACTICE QUIZ- Fast Addition Concept
  • LECTURE- Addition With Dhashamshaha Method
  • PRACTICE QUIZ- Addition With Dhashamshaha
  • LECTURE- Concept & Application of Place Value
  • PRACTICE QUIZ- Concept & Application of Place Value
  • LECTURE- Addition With Anka Sthana Vidhi (Part-1)
  • PRACTICE QUIZ- Addition With Anka Sthana Vidhi (Part-1)
  • LECTURE- Addition With Anka Sthana Vidhi (Part-2)
  • PRACTICE QUIZ - Addition With Anka Sthana Vidhi (Part-2)
  • LECTURE- Addition With Anka Sthana Vidhi (Part-3)
  • PRACTICE QUIZ - Addition With Anka Sthana Vidhi (Part-3)
  • LECTURE- Addition With Advanced Anka Sthana Vidhi
  • PRACTICE QUIZ- Addition With Advanced Anka Sthana Vidhi
  • LECTURE- Multiplication Table Trick
  • PRACTICE QUIZ- Multiplication Table Trick
  • LECTURE- Application of Multiplication Table Trick (Part-1)
  • PRACTICE QUIZ- Application of Multiplication Table Trick (Part-1)
  • LECTURE- Application of Multiplication Table Trick (Part-2)
  • PRACTICE QUIZ- Application of Multiplication Table Trick (Part-2)
  • LECTURE- Multiply any number by 11 & its multiples With Vedic Math Trick
  • PRACTICE QUIZ- Multiply any number by 11 & its multiples With Vedic Math Trick
  • LECTURE- Squaring of any number ending with 5 With Vedic Math Trick
  • PRACTICE QUIZ- Squaring of any number ending with 5 With Vedic Math Trick
  • LECTURE- Test of Divisibility Part-1
  • PRACTICE QUIZ- Test of Divisibility Part-1
  • LECTURE- Test of Divisibility Part-2
  • PRACTICE QUIZ- Test of Divisibility Part-2
🚀Vedic Math Intermediate: Level Up!
  • LECTURE- Concept of Fast Subtraction
  • PRACTICE QUIZ- Concept of Fast Subtraction
  • LECTURE- Subtraction with Sankalana Vyavakalanabhyam ( Part-1 )
  • PRACTICE QUIZ- Subtraction with Sankalana Vyavakalanabhyam ( Part-1 )
  • LECTURE- Subtraction with Sankalana Vyavakalanabhyam ( Part-2 )
  • PRACTICE QUIZ- Subtraction with Sankalana Vyavakalanabhyam ( Part-2 )
  • LECTURE- Concept of Nikhilam Method
  • LECTURE- Subtraction by Nikhilam Method
  • PRACTICE QUIZ- Subtraction by Nikhilam Method
  • LECTURE- Subtraction with Anka Sthana Vidhi
  • PRACTICE QUIZ- Subtraction with Anka Sthana Vidhi
  • LECTURE- Multiplication by Vertically & Crosswise (Part-1)
  • PRACTICE QUIZ- Multiplication by Vertically & Crosswise (Part-1)
  • LECTURE- Multiplication by Vertically & Crosswise (Part-2)
  • PRACTICE QUIZ- Multiplication by Vertically & Crosswise (Part-2)
  • LECTURE- Multiplication of any Number by 9, 99,999.... Part-1
  • PRACTICE QUIZ- Multiplication of any Number by 9, 99,999.... Part-1
  • LECTURE- Multiplication of any Number by 9, 99,999.... Part-2
  • PRACTICE QUIZ- Multiplication of any Number by 9, 99,999.... Part-2
  • LECTURE- Concept of Base Method
  • LECTURE- Multiplication by Base Method -Part-1
  • PRACTICE QUIZ- Multiplication by Base Method -Part-1
  • LECTURE- Multiplication by Base Method -Part-2
  • PRACTICE QUIZ- Multiplication by Base Method -Part-2
  • LECTURE- Multiplication by Base Method - Part-3
  • PRACTICE QUIZ- Multiplication by Base Method -Part-3
  • LECTURE- Multiplication by Base Method -Part-4
  • PRACTICE QUIZ- Multiplication by Base Method - Part-4
  • LECTURE- Remainder trick by 9 of Division
  • PRACTICE QUIZ -LECTURE- Remainder trick by 9 of Division
  • LECTURE-Mental Division of any Number(2d, 3d,4d,5d) by Single digit number
  • PRACTICE QUIZ- Mental Division of any Number(2d, 3d,4d,5d) by 1-digit number
🌟Vedic Math Advanced: Mastering Techniques
  • LECTURE- Multiplication of any Number by Anka Sthana Vidhi.
  • PRACTICE QUIZ- Multiplication of any Number by Anka Sthana Vidhi.
  • LECTURE- Multiplication by Base Method (Above-Below) Part-5
  • PRACTICE QUIZ- Multiplication by Base Method (Above-Below) Part-5
  • LECTURE- Multiplication by Working Base Method
  • PRACTICE QUIZ- Multiplication by Working Base Method
  • LECTURE- Division of any Number by 9 WITH VEDIC MATHS
  • PRACTICE QUIZ-Mental Division of any Number by 9 WITH VEDIC MATHS
  • LECTURE-Division by Nikhilam Method
  • PRACTICE QUIZ-Division by Nikhilam Method
  • LECTURE- BIG Division By Multiplication Table .
  • PRACTICE QUIZ-BIG Division By Multiplication Table
  • LECTURE- Squaring of Numbers With Vedic Math Trick
  • PRACTICE QUIZ- Squaring of Numbers With Vedic Math Trick
  • LECTURE- Squaring of Big Numbers With Vedic Math Trick
  • PRACTICE QUIZ- Squaring of Big Numbers With Vedic Math Trick
  • LECTURE- Tricks of Finding Cube of Numbers
  • PRACTICE QUIZ- Tricks of Finding Cube of Numbers
  • LECTURE:- Finding Square root of Perfect Square With Vedic Math Trick
  • PRACTICE QUIZ- Finding Square root of Perfect Square With Vedic Math Trick
🎓Vedic Math Final Test: Show What You Know!
  • Final Evaluation Test
📚Vedic Math for Competitive Success: Exam Questions Solved (PDF)
  • Competitive Exams Worksheet -1
  • Competitive Exams Worksheet -2
  • Competitive Exams Worksheet -3
  • Competitive Exams Worksheet -4
  • Competitive Exams Worksheet -5
🧠Crack Competitive Exams with Vedic Math
  • Balancing Method of Addition Subtraction for Competitive Exams
  • Multiplication by 5,25,50, 125. (Wonderful Trick)
  • Digit Sum Concept
  • Digit Sum Application Part-1
  • Digit Sum Application Part-2
Learn Vedic Maths

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About Mentor

Swarnali Saha

Swarnali Mam is one of the most sought-after Math Life Skills mentors today in India. Her unique teaching style is loved by students and appreciated by parents across the country. In the past few years, thousands of students have taken guidance from her through her courses and gotten benefited from it. Since 2019, she has made her presence felt online too through her courses in Welcome2Maths. All Welcome2Maths online courses have been rated very highly by students and parents alike.

Learn Vedic Maths

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Crack Competitive Exams with Vedic Maths

What are important Maths Shortcut tricks for Competitive Exams?

Mastering mathematical shortcuts can significantly enhance your speed and accuracy in competitive exams. Here are some essential Vedic Maths techniques and shortcuts to help you solve problems more efficiently:

1. Multiplication by 11

To multiply any number by 11, you can use a simple trick:

  • For a two-digit number (e.g., 24 x 11):
    • Write the digits with a space in between: 2_4.
    • Add the digits and place the result in the middle: 2(2+4)4.
    • The answer is 264.

2. Squaring Numbers Ending in 5

Squaring numbers that end in 5 is straightforward:

  • For example, to square 25:
    • Take the first digit (2) and multiply it by itself plus one: 2 x 3 = 6.
    • Append 25 to the result: 625.
    • So, 25² = 625.  Similarly 35² = (3x4) (5x5) =1225

3. Multiplying Numbers Close to 100

When multiplying numbers near 100, use the following technique:

  • For example, 97 x 96:
    • Subtract each number from 100: (100 - 97 = 3) and (100 - 96 = 4).
    • Add the results: 3 + 4 = 7.
    • Subtract this sum from 100: 100 - 7 = 93 (this is the first part of the answer).
    • Multiply the differences: 3 x 4 = 12 (this is the second part of the answer).
    • Combine the two parts: 9312.
    • So, 97 x 96 = 9312.

4. Divisibility Rules

Quickly determine if a number is divisible by another:

  • 2: If the last digit is even.
  • 3: If the sum of the digits is divisible by 3.
  • 5: If the last digit is 0 or 5.
  • 7: Double the last digit and subtract it from the rest of the number; if the result is divisible by 7, so is the original number.

5. Addition of Large Numbers

Break down the addition of large numbers into smaller parts:

  • For example, adding 1234 + 5678:
    • Split the numbers: (1000 + 200 + 30 + 4) and (5000 + 600 + 70 + 8).
    • Add corresponding parts: (1000 + 5000) + (200 + 600) + (30 + 70) + (4 + 8).
    • Sum the results: 6000 + 800 + 100 + 12 = 6912.
    • So, 1234 + 5678 = 6912.

6. Subtraction Using Complements

Use complements for faster subtraction:

  • For example, 1000 - 643:
    • Find the complement of 643 (complement of 6 is 9, of 4 is 9, and of 3 is 7): 357.
    • Add 1 to the least significant digit: 357 + 1 = 358.
    • So, 1000 - 643 = 358.

7. Cross Multiplication for Fractions

Simplify the multiplication of fractions:

  • For example, (2/3) x (4/5):
    • Multiply the numerators: 2 x 4 = 8.
    • Multiply the denominators: 3 x 5 = 15.
    • So, (2/3) x (4/5) = 8/15.

These shortcuts are not only useful for quickly solving problems during exams but also help in reducing errors, thereby increasing your chances of scoring higher. Practice these techniques regularly to improve your speed and confidence in handling mathematical problems.

maths for competitive exams

Maths Tricks for SSC/BANK/IBPS/RRB Exams

Cracking competitive exams like SSC, BANK, IBPS, and RRB requires a strong command of mathematical concepts and the ability to solve problems quickly. Here are some effective maths tricks tailored for these exams:

1. Percentage to Fraction Conversion

Quickly convert percentages to fractions to simplify calculations:

  • 25% = 1/4
  • 33.33% = 1/3
  • 50% = 1/2
  • 75% = 3/4
  • Knowing these conversions can help you solve problems related to profit and loss, discounts, and interest rates more efficiently.

2. Simplifying Ratios

Use the simplest form of ratios to make comparisons easier:

  • For example, to compare 20:25 and 40:50, simplify both to their lowest terms:
    • 20:25 simplifies to 4:5.
    • 40:50 simplifies to 4:5.
  • Thus, the ratios are equal.

3. Square Root Shortcut

To quickly estimate the square root of a number:

  • For numbers close to perfect squares, use the nearest perfect square for reference.
    • For example, to estimate √50:
      • √49 = 7 (since 49 is a perfect square).
      • So, √50 is approximately 7.1.

4. Multiplication by 5

Multiplying any number by 5 quickly:

  • For even numbers: Divide by 2 and multiply by 10.
    • Example: 68 x 5 = (68 / 2) x 10 = 34 x 10 = 340.
  • For odd numbers: Subtract 1, follow the even rule, and add 5.
    • Example: 37 x 5 = (37 - 1) x 5 + 5 = 36 x 5 + 5 = 180 + 5 = 185.

5. Addition of Consecutive Numbers

Quickly add a series of consecutive numbers:

  • Use the formula: Sum = n(n + 1)/2, where n is the last number in the series.
    • Example: Sum of numbers from 1 to 10:
      • Sum = 10(10 + 1)/2 = 10 x 11 / 2 = 55.

6. Time and Work

Solve time and work problems using the concept of efficiency:

  • If A can complete a task in 5 days and B in 10 days, their combined work per day = 1/5 + 1/10 = (2 + 1)/10 = 3/10.
  • Together, A and B can complete the task in 10/3 days, or 3.33 days.

7. Simple and Compound Interest

Quickly calculate simple interest and compound interest:

  • Simple Interest (SI): SI = PRT/100, where P = principal, R = rate, T = time.
    • Example: For Rs. 1000 at 5% per annum for 2 years, SI = 1000 x 5 x 2 / 100 = Rs. 100.
  • Compound Interest (CI): Use the formula CI = P (1 + R/100)^T - P.
    • Example: For Rs. 1000 at 5% per annum for 2 years, CI = 1000 (1 + 5/100)^2 - 1000 = Rs. 102.50.

8. Cross Multiplication for Ratios

Quickly solve ratio problems using cross multiplication:

  • For example, to find the value of x in 3/x = 4/12:
    • Cross multiply: 3 * 12 = 4 * x.
    • 36 = 4x.
    • x = 36 / 4 = 9.

9. Approximation Techniques

Use approximation to quickly solve complex calculations:

  • For example, to multiply 198 by 206:
    • Approximate to 200: (200 - 2) x (200 + 6).
    • Use the difference of squares: (200^2 - 2200 + 6200 - 2*6).
    • 200^2 = 40000, -2200 = -400, 6200 = 1200, -2*6 = -12.
    • Sum = 40000 + 1200 - 400 - 12 = 40800 - 412 = 40388.

Practicing these tricks regularly can improve your speed and accuracy, giving you an edge in competitive exams like SSC, BANK, IBPS, and RRB.

maths for competitive exams

How to prepare maths for a competitive exam?

Hey there, aspirants! Preparing for maths in a competitive exam can be challenging, but with the right approach, you can tackle it successfully. Let me walk you through some strategies that will help you excel.

First, understand the syllabus and exam pattern thoroughly. Knowing what topics are covered and how the questions are structured is crucial. Make a list of all the topics you need to study and prioritize them based on your strengths and weaknesses. This way, you can focus more on the areas where you need improvement.

Next, create a study plan. Break down your preparation into manageable chunks. Allocate specific time slots for each topic and stick to your schedule. Consistency is key when preparing maths for competitive exams. Daily practice will reinforce your understanding and help you retain concepts better.

Practice is your best friend when it comes to maths. Solve as many problems as you can from different sources. Start with basic problems to build your foundation, then gradually move on to more complex ones. Use previous years’ question papers and mock tests to get a feel of the actual exam. Time yourself while solving these papers to improve your speed and accuracy.

Understanding the concepts is more important than just memorizing formulas. Make sure you grasp the underlying principles behind each topic. If you encounter a difficult problem, try breaking it down into smaller, more manageable parts. This will help you understand the logic behind the solution.

Don’t hesitate to seek help if you’re stuck. Join a study group or find a study buddy with whom you can discuss problems and solutions. Sometimes, explaining a concept to someone else can also reinforce your own understanding. If you need more structured guidance, consider enrolling in a coaching class or using online resources tailored for maths for competitive exams. The Vedic Maths for Competitive Exams course is an excellent resource that can help you speed up your calculations and improve your problem-solving skills.

Regular revision is crucial. Make summary notes for each topic and revise them periodically. This will help you retain the information and quickly recall formulas and methods during the exam. Practice mental math regularly to improve your calculation speed and accuracy, which is vital in a competitive exam setting.

Stay positive and confident. Believe in your ability to conquer maths for competitive exams. Remember, preparation is a marathon, not a sprint. Keep a balanced approach, take breaks, and maintain a healthy lifestyle to ensure you’re at your best both mentally and physically.

By following these strategies and practicing diligently, you’ll be well-prepared to tackle maths in your competitive exams. Keep pushing yourself, stay focused, and you’ll see great results. Good luck!

How can I score good marks in maths in competitive exams?

Hi, aspirants! Scoring good marks in maths for competitive exams requires a blend of understanding concepts, practicing regularly, and employing smart strategies. Let me guide you through the steps to excel in your maths preparation.

First, you need to have a clear understanding of the syllabus and the exam pattern. This will give you a roadmap of what to study and how to allocate your time. List all the topics you need to cover and identify which ones you find challenging. Prioritize these topics and focus on strengthening your weaknesses while maintaining your strengths.

Creating a structured study plan is essential. Break your preparation into manageable chunks and allocate specific time slots for each topic. Consistency is key, so make sure you stick to your schedule. Daily practice is crucial when preparing maths for competitive exams. It helps reinforce concepts and improves your problem-solving speed.

One of the most effective ways to prepare is by practicing a variety of problems. Start with basic problems to build a solid foundation, then gradually move on to more complex questions. Use previous years’ question papers and mock tests to get a feel of the actual exam. Time yourself while solving these papers to improve your speed and accuracy.

Understanding the concepts deeply is more important than just memorizing formulas. Make sure you grasp the underlying principles behind each topic. If you encounter a difficult problem, break it down into smaller, more manageable parts. This will help you understand the logic and method to solve it.

If you find yourself stuck, don’t hesitate to seek help. Join a study group or find a study buddy with whom you can discuss problems and solutions. Sometimes, explaining a concept to someone else can also reinforce your own understanding. For more structured guidance, consider enrolling in a course like Vedic Maths for Competitive Exams. This course can help you speed up your calculations and improve your problem-solving skills by teaching you unique and efficient methods.

Regular revision is crucial for retention. Make summary notes for each topic and revise them periodically. This will help you quickly recall formulas and methods during the exam. Practicing mental math regularly is also important as it improves your calculation speed and accuracy, which is vital in a competitive exam setting.

Stay positive and confident. Believe in your ability to conquer maths for competitive exams. Remember, preparation is a marathon, not a sprint. Keep a balanced approach, take regular breaks, and maintain a healthy lifestyle to ensure you’re at your best both mentally and physically.

By following these strategies and practicing diligently, you’ll be well-prepared to score good marks in maths for competitive exams. Keep pushing yourself, stay focused, and you’ll see great results. All the best!

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