Mind Maths

Vedic Maths (Grade 3-6)

Bestseller ★ 4.95/5 225+ enrolled Live 1:1 & Group

Why Choose Online Vedic Maths (Grade 3-6) Classes?

Board-aligned tutors - we match the tutor to your child's curriculum (US Common Core, Ontario, Australian, CBSE, ICSE, IGCSE, Cambridge or Singapore MOE).

Live, interactive 1:1 or small-group classes - the tutor sees your child's work in real time.

Customised practice worksheets - graded, reviewed and explained class by class.

Weekly homework support - assignments and concept revision before the next class.

Periodic class tests aligned to the board's exam pattern.

Detailed progress reports for parents every month.

Flexible scheduling - pick time slots that fit school and after-school activities.

Free demo class so you can meet the tutor before you commit.

Globally available - USA, UK, Canada, Australia, Singapore, UAE, GCC and India.

Recorded sessions provided for missed classes (group format) - no concept is left behind.

Overview

Vedic Maths Grade 3-6 introduces children to the speed-math system based on the 16 Sutras of Vedic Mathematics, developed by Sri Bharati Krishna Tirtha Maharaj. Designed for CBSE / ICSE students aged 8-11 to do school math 5-10x faster than the traditional method. Suitable for board math, Olympiads, NTSE and aptitude tests.

What You'll Learn

Live interactive sessions
1st one-on-one session
Comprehensive curriculum
No long-term commitment
Personalized learning plan

Grade 3-4

Age 8+ 40 hrs

Introduction to Vedic Maths

History and origin of Vedic Maths - rediscovered by Sri Bharati Krishna Tirtha Maharaj (1884-1960) from the Atharva Veda; published 1965.
The 16 Sutras (aphorisms) - overview: e.g., Ekadhikena Purvena ("by one more than the previous"), Nikhilam Navatashcaramam Dashatah ("all from 9 and last from 10"), Urdhva-Tiryagbhyam ("vertically and crosswise").
Benefits for speed (5-10x faster than traditional methods) and accuracy (cross-verification with multiple methods).

Addition Tricks

Left-to-right addition - start with the highest place value (Vedic style) instead of right-to-left as in traditional methods.
Splitting numbers using base-10 - e.g., 47 + 28 = (50 - 3) + (30 - 2) = 80 - 5 = 75; mental shortcut.
Adding 2-digit (47 + 38 = 85) and 3-digit numbers (347 + 256 = 603) mentally using Vedic techniques.

Subtraction Tricks

Nikhilam Sutra - subtraction from base (e.g., 1000 - 387: all from 9 except last from 10 -> 613).
Subtracting from 100 (100 - 47 = 53), 1000 (1000 - 287 = 713) using Nikhilam shortcut.
Quick checking using complements - 9s complement and 10s complement for instant verification.

Multiplication - Vertically & Crosswise

Urdhva-Tiryagbhyam ("Vertically and Crosswise") - 2-digit by 2-digit in 1 line (e.g., 23 x 47); pattern shifts down by line for 3+ digits.
Multiplication of 3-digit numbers (e.g., 234 x 567) using same crosswise pattern; 3 cross-products + 2 vertical products = 5 partial answers.
Special cases - numbers near a base (e.g., 97 x 96 = (97-100) + (96-100) and (97-100) x (96-100) = ...; very fast).

Squaring Tricks

Squaring numbers ending in 5 - n5^2 = n(n+1) followed by 25 (e.g., 35^2 = 3*4 / 25 = 1225; 65^2 = 6*7 / 25 = 4225).
Yavadunam Sutra for nearby squares - based on (a+d)^2 = a^2 + 2ad + d^2; great for numbers close to 100 (e.g., 98^2, 104^2).
Yavadunam squaring of 2-digit numbers (e.g., 96^2 = 96-4 / 4^2 = 92 / 16 = 9216) using "base + deficiency" approach.

Division Tricks

Nikhilam division - for divisors close to a base (e.g., 98, 102); convert dividend using base complement.
Division by 9 and other special divisors - quick check for divisibility (digit sum) and instant answers using digit-by-digit.
Quick check of remainders using Vedic digit-sum (casting out 9s) verification - confirms answer in seconds.

Speed Tests & Worksheets

10-minute mental math drills - 50 questions on +, -, x, /; track time + accuracy weekly.
Comparison - traditional vs Vedic time (e.g., 87 x 96: traditional ~30 sec, Vedic ~5 sec); show speedup.
Building confidence with timed practice - leaderboards, weekly challenges, parent-shared progress reports.

Introduction to Vedic Maths

History and origin of Vedic Maths - rediscovered by Sri Bharati Krishna Tirtha Maharaj (1884-1960) from the Atharva Veda; published 1965.
The 16 Sutras (aphorisms) - overview: e.g., Ekadhikena Purvena ("by one more than the previous"), Nikhilam Navatashcaramam Dashatah ("all from 9 and last from 10"), Urdhva-Tiryagbhyam ("vertically and crosswise").
Benefits for speed (5-10x faster than traditional methods) and accuracy (cross-verification with multiple methods).

Addition Tricks

Left-to-right addition - start with the highest place value (Vedic style) instead of right-to-left as in traditional methods.
Splitting numbers using base-10 - e.g., 47 + 28 = (50 - 3) + (30 - 2) = 80 - 5 = 75; mental shortcut.
Adding 2-digit (47 + 38 = 85) and 3-digit numbers (347 + 256 = 603) mentally using Vedic techniques.

Subtraction Tricks

Nikhilam Sutra - subtraction from base (e.g., 1000 - 387: all from 9 except last from 10 -> 613).
Subtracting from 100 (100 - 47 = 53), 1000 (1000 - 287 = 713) using Nikhilam shortcut.
Quick checking using complements - 9s complement and 10s complement for instant verification.

Multiplication - Vertically & Crosswise

Urdhva-Tiryagbhyam ("Vertically and Crosswise") - 2-digit by 2-digit in 1 line (e.g., 23 x 47); pattern shifts down by line for 3+ digits.
Multiplication of 3-digit numbers (e.g., 234 x 567) using same crosswise pattern; 3 cross-products + 2 vertical products = 5 partial answers.
Special cases - numbers near a base (e.g., 97 x 96 = (97-100) + (96-100) and (97-100) x (96-100) = ...; very fast).

Squaring Tricks

Squaring numbers ending in 5 - n5^2 = n(n+1) followed by 25 (e.g., 35^2 = 3*4 / 25 = 1225; 65^2 = 6*7 / 25 = 4225).
Yavadunam Sutra for nearby squares - based on (a+d)^2 = a^2 + 2ad + d^2; great for numbers close to 100 (e.g., 98^2, 104^2).
Yavadunam squaring of 2-digit numbers (e.g., 96^2 = 96-4 / 4^2 = 92 / 16 = 9216) using "base + deficiency" approach.

Division Tricks

Nikhilam division - for divisors close to a base (e.g., 98, 102); convert dividend using base complement.
Division by 9 and other special divisors - quick check for divisibility (digit sum) and instant answers using digit-by-digit.
Quick check of remainders using Vedic digit-sum (casting out 9s) verification - confirms answer in seconds.

Speed Tests & Worksheets

10-minute mental math drills - 50 questions on +, -, x, /; track time + accuracy weekly.
Comparison - traditional vs Vedic time (e.g., 87 x 96: traditional ~30 sec, Vedic ~5 sec); show speedup.
Building confidence with timed practice - leaderboards, weekly challenges, parent-shared progress reports.

Grade 5-6

Age 10+ 40 hrs

Introduction to Vedic Maths

History and origin of Vedic Maths - rediscovered by Sri Bharati Krishna Tirtha Maharaj (1884-1960) from the Atharva Veda; published 1965.
The 16 Sutras (aphorisms) - overview: e.g., Ekadhikena Purvena ("by one more than the previous"), Nikhilam Navatashcaramam Dashatah ("all from 9 and last from 10"), Urdhva-Tiryagbhyam ("vertically and crosswise").
Benefits for speed (5-10x faster than traditional methods) and accuracy (cross-verification with multiple methods).

Addition Tricks

Left-to-right addition - start with the highest place value (Vedic style) instead of right-to-left as in traditional methods.
Splitting numbers using base-10 - e.g., 47 + 28 = (50 - 3) + (30 - 2) = 80 - 5 = 75; mental shortcut.
Adding 2-digit (47 + 38 = 85) and 3-digit numbers (347 + 256 = 603) mentally using Vedic techniques.

Subtraction Tricks

Nikhilam Sutra - subtraction from base (e.g., 1000 - 387: all from 9 except last from 10 -> 613).
Subtracting from 100 (100 - 47 = 53), 1000 (1000 - 287 = 713) using Nikhilam shortcut.
Quick checking using complements - 9s complement and 10s complement for instant verification.

Multiplication - Vertically & Crosswise

Urdhva-Tiryagbhyam ("Vertically and Crosswise") - 2-digit by 2-digit in 1 line (e.g., 23 x 47); pattern shifts down by line for 3+ digits.
Multiplication of 3-digit numbers (e.g., 234 x 567) using same crosswise pattern; 3 cross-products + 2 vertical products = 5 partial answers.
Special cases - numbers near a base (e.g., 97 x 96 = (97-100) + (96-100) and (97-100) x (96-100) = ...; very fast).

Squaring Tricks

Squaring numbers ending in 5 - n5^2 = n(n+1) followed by 25 (e.g., 35^2 = 3*4 / 25 = 1225; 65^2 = 6*7 / 25 = 4225).
Yavadunam Sutra for nearby squares - based on (a+d)^2 = a^2 + 2ad + d^2; great for numbers close to 100 (e.g., 98^2, 104^2).
Yavadunam squaring of 2-digit numbers (e.g., 96^2 = 96-4 / 4^2 = 92 / 16 = 9216) using "base + deficiency" approach.

Division Tricks

Nikhilam division - for divisors close to a base (e.g., 98, 102); convert dividend using base complement.
Division by 9 and other special divisors - quick check for divisibility (digit sum) and instant answers using digit-by-digit.
Quick check of remainders using Vedic digit-sum (casting out 9s) verification - confirms answer in seconds.

Speed Tests & Worksheets

10-minute mental math drills - 50 questions on +, -, x, /; track time + accuracy weekly.
Comparison - traditional vs Vedic time (e.g., 87 x 96: traditional ~30 sec, Vedic ~5 sec); show speedup.
Building confidence with timed practice - leaderboards, weekly challenges, parent-shared progress reports.

Introduction to Vedic Maths

History and origin of Vedic Maths - rediscovered by Sri Bharati Krishna Tirtha Maharaj (1884-1960) from the Atharva Veda; published 1965.
The 16 Sutras (aphorisms) - overview: e.g., Ekadhikena Purvena ("by one more than the previous"), Nikhilam Navatashcaramam Dashatah ("all from 9 and last from 10"), Urdhva-Tiryagbhyam ("vertically and crosswise").
Benefits for speed (5-10x faster than traditional methods) and accuracy (cross-verification with multiple methods).

Addition Tricks

Left-to-right addition - start with the highest place value (Vedic style) instead of right-to-left as in traditional methods.
Splitting numbers using base-10 - e.g., 47 + 28 = (50 - 3) + (30 - 2) = 80 - 5 = 75; mental shortcut.
Adding 2-digit (47 + 38 = 85) and 3-digit numbers (347 + 256 = 603) mentally using Vedic techniques.

Subtraction Tricks

Nikhilam Sutra - subtraction from base (e.g., 1000 - 387: all from 9 except last from 10 -> 613).
Subtracting from 100 (100 - 47 = 53), 1000 (1000 - 287 = 713) using Nikhilam shortcut.
Quick checking using complements - 9s complement and 10s complement for instant verification.

Multiplication - Vertically & Crosswise

Urdhva-Tiryagbhyam ("Vertically and Crosswise") - 2-digit by 2-digit in 1 line (e.g., 23 x 47); pattern shifts down by line for 3+ digits.
Multiplication of 3-digit numbers (e.g., 234 x 567) using same crosswise pattern; 3 cross-products + 2 vertical products = 5 partial answers.
Special cases - numbers near a base (e.g., 97 x 96 = (97-100) + (96-100) and (97-100) x (96-100) = ...; very fast).

Squaring Tricks

Squaring numbers ending in 5 - n5^2 = n(n+1) followed by 25 (e.g., 35^2 = 3*4 / 25 = 1225; 65^2 = 6*7 / 25 = 4225).
Yavadunam Sutra for nearby squares - based on (a+d)^2 = a^2 + 2ad + d^2; great for numbers close to 100 (e.g., 98^2, 104^2).
Yavadunam squaring of 2-digit numbers (e.g., 96^2 = 96-4 / 4^2 = 92 / 16 = 9216) using "base + deficiency" approach.

Division Tricks

Nikhilam division - for divisors close to a base (e.g., 98, 102); convert dividend using base complement.
Division by 9 and other special divisors - quick check for divisibility (digit sum) and instant answers using digit-by-digit.
Quick check of remainders using Vedic digit-sum (casting out 9s) verification - confirms answer in seconds.

Speed Tests & Worksheets

10-minute mental math drills - 50 questions on +, -, x, /; track time + accuracy weekly.
Comparison - traditional vs Vedic time (e.g., 87 x 96: traditional ~30 sec, Vedic ~5 sec); show speedup.
Building confidence with timed practice - leaderboards, weekly challenges, parent-shared progress reports.

Requirements

A laptop or desktop with stable internet
Notebook and pencil for practice
A simple timer / stopwatch (or phone)
No prior Vedic Maths experience required

Reviews

4.95 / 5 ★ · 225+ students enrolled

Parents consistently rate our mentors for personalised attention, clear concepts and steady progress. Book a free demo to experience a class first-hand.

Frequently Asked Questions

How do I get started?

Click the Book a Demo button on this page and fill in your child's grade and school board (CBSE / ICSE / IGCSE / Cambridge / US Common Core / Singapore MOE etc.). We will schedule a free trial session with a matching tutor. For details, contact our coordinator on WhatsApp at +91 93308 11581 or email contact@winquestonline.com.

Will the tutor follow my child's school board?

Yes. Every WinQuest tutor is mapped to specific curricula. Before the first class we ask which board your child follows; the tutor uses that board's scope and sequence, supports the school textbook chapter by chapter, and adds worksheets in the board's exam style. We currently support US Common Core, Ontario, Australian v9.0, CBSE (NCERT), ICSE (CISCE), IGCSE 0580 / 0500 / 0610 / 0620 / 0625, Cambridge Primary / Lower Secondary, and Singapore MOE.

How does payment work?

We require monthly advance payments for the number of classes scheduled in that calendar month. We accept Zelle, PayPal, UPI (for India), Stripe and major credit / debit cards. You can select your preferred payment method during the initial enrolment.

What if my child misses a class?

For 1:1 sessions we reschedule a make-up at a mutually convenient time at no extra cost (with at least 24 hours notice). For group classes we share a timed recording of the session on parent request, so your child can catch up before the next class.

How long is each class?

Each class session is 60 minutes long for academic subjects. Frequency is typically twice a week for K-7 grades and 2-3 times a week for high school, based on the board exam timeline and parent preference.

How is progress measured?

Tutors give written feedback on every homework assignment, run a short formative quiz every 4-6 classes, and a longer chapter test at the end of each topic. Parents receive a monthly progress report covering concept mastery, homework completion and test scores.

What is the class size?

For 1:1 sessions the class is just your child and the tutor. For group classes we cap each batch at 6-8 students so every learner gets individual attention and can ask questions in real time.

Are the tutors qualified?

All our tutors are highly qualified subject-matter experts with proven track records - many hold Master's degrees in their subject and several years of school-curriculum teaching experience. Each tutor is interviewed by our academic head before joining and is mapped to specific boards and grades.

What if my child needs to pause for a school break or exam?

Just let us know in advance. There are no contracts - you can pause for a school holiday or final-exam stretch and resume when the student is ready, with no penalty.

What are the requirements?

A laptop or desktop with a stable internet connection is required. Pencil, eraser, ruler and a notebook for working out solved problems. For higher grades a basic calculator. The tutor will list any board-specific requirements (textbook, geometry box, etc.) before the first class.