
Students will be able to multiply any 2 Digit number by 2 Digit Number
For example 24*27,81*12 etc
Master the criss cross multiplication method for two-digit by two-digit and three-digit by three-digit problems, including no-carry and carry workflows, with emphasis on speed, accuracy, and observation.
Master the crisscross method to multiply any three-digit numbers with five steps. Manage carries and perform cross multiplication to get accurate results.
Master three-digit by two-digit multiplication using vedic maths techniques, with step-by-step crosswise methods and carrying, through worked examples.
Master the seven-step 4d by 4d multiplication method for four-digit numbers, using cross-diagonal, corner, and middle-number calculations with practical examples.
Learn to multiply any two-digit number by 99 using two steps: subtract one from the other number, then subtract that from 99 and join the results to form the product.
Students will be able to multiply any 3 digit number by 999
For example 241*999 ,872*999 etc
Learn a simple vedic maths method to multiply any two-digit or three-digit number by 11 using three steps, carry handling, and mental calculation.
Learn to multiply two-digit numbers by 111, identify no carry cases by adding adjacent digits to single-digit sums, and copy the digits before applying the addition from either side.
Discover the no-carry method for multiplying three-digit numbers by 111: copy the first and last digits and sum the middle digits, with examples like 123×111 and 314×111.
Learn to multiply four-digit numbers by 111 using the no carry case: copy the first and last digits, then sum adjacent digits, as shown in examples 1232 and 4123.
Multiply a two-digit number by nine using the base method, count the rightmost digit, draw a dotted line, add one, then subtract to get the result (65×9=585).
Explore a base-ten method for multiplying any three-digit number by nine, using a one-step adjustment, a dotted line, and attaching the resulting digit to form the product.
Demonstrates multiplying a five-digit number by 99 using the base method with base 100, including splitting, adding one to the left part, and subtracting to finish.
Master the base method for multiplying numbers using base 10, 100, and 1000 by rewriting digits as base complements and applying crosswise operations to compute results.
Master base method multiplication for 2d x 2d, 3d x 3d, and 4d numbers using bases 100, 1000, and 10000, applying crosswise operations, digit products, and carries.
Apply a three-step method to multiply numbers from 11 to 19: add the first number to the ones digit of the second, multiply the ones digits, and combine the results.
Learn the base-100 method to multiply 91–99 with four steps—near hundred, crosswise subtraction, multiply the differences, and insert a zero for exact single-digit results in cases like 91×99.
apply the base technique for numbers near 100 using four steps: express as 100 plus a and 100 plus b, crosswise add, multiply a and b, assemble the final result.
Learn the special-case method for multiplying numbers whose ones digits sum to 10, using two steps to handle tens and ones, with detailed examples and zero-insertion adjustments for near-100 cases.
Explore subtraction fundamentals through the complement concept and match and mismatch ideas, and learn to solve problems without borrowing using vedic maths.
Learn a three-step method to subtract two-digit numbers from two-digit numbers, starting from the left, handling mismatch and match cases, and using complements for the lower digit.
Learn special case subtraction in Vedic maths, handling same numbers and match or mismatch conditions. Apply complements and one-step adjustments to obtain results like nine in the given examples.
Learn a vedic maths shortcut to subtract a four-digit number from another four-digit number using match and mismatch rules, one-step adjustments, and the complement method.
Master the line method for adding two-digit numbers, drop tens at sums of ten, and transfer line counts to the next column with step-by-step examples.
Add four-digit and five-digit numbers by starting from the bottom right, using carries when sums exceed 10, and tracking carries with lines to form the final total.
Master the addition of five-digit numbers using a step-by-step Vedic maths method. Add from the bottom right, draw lines for totals over ten, and propagate digits through each column.
Learn the basics of division in Vedic maths, defining divisor, dividend, quotient, and remainder through simple examples. Verify results by checking that dividend equals divisor times quotient plus remainder.
Discover the Nikhilam method for division using bases near powers of ten, with three columns, the divisor's complement, and strategies to handle digits up to four without memorizing tables.
Learn the Type-1 division method from Vedic maths, using base 100 for numbers near 100, computing complements, multiplying complements, and applying the killer method to simplify division.
Learn a type-2 division method for dividing a four-digit dividend by numbers near 100, using base 100, splitting the dividend, and applying the complement to obtain the quotient and remainder.
Learn type-3 division in Vedic maths using a thousand-base framework, splitting the dividend into two parts, applying complements to reach one thousand, and calculating quotients and remainders.
Defines square numbers as numbers multiplied by themselves and demonstrates 1×1 through 12×12 with concrete examples, and previews methods to find squares for two-digit and three-digit numbers.
Learn to square any two-digit number using a modified algebraic identity with digits a and b.
Learn how to square any three-digit number using the E b method, with examples like 102 and 600, applying two-digit-by-two steps, carries, and final results.
Learn the base method for squaring numbers, using deficit and surplus concepts for single digit, two digit, and three digit numbers near bases like ten, hundred, and thousand.
Learn to find the square of a single-digit number using the base ten method, leveraging deficit and deficit square to form a two-digit result, as shown with 8 and 9.
Master the surplus method to square two-digit numbers above the base ten by finding the surplus, computing number plus surplus, and using surplus squared (carry) to obtain the final result.
Learn the base method to square two-digit numbers near 100, using deficit from base 100, to compute squares like 97^2 = 9409 and 96^2 = 9216.
Learn to square three-digit numbers using the base method for surplus cases, with base 100, subtract base, apply number plus surplus, and combine with the surplus square.
Demonstrates the base method to square three-digit numbers using base 1000, calculates deficits, and applies the oblique sign to produce results such as 998^2 = 996004 and 995^2 = 990025.
Master squaring four-digit numbers using the base method with a 10,000 base, apply the deficit and its square, use oblique, and insert zeros to keep four-digit results.
Explore square roots as the inverse of squaring, use the radical symbol, verify with examples like 16 and 25, noting roots are ± but we use positive values.
Learn the concept of square roots in vedic maths using a paired-digit table, bring down pairs, and apply last-digit patterns with examples like 10, 25, and 28.
Learn a step-by-step Vedic method to compute square roots of 3-digit and 4-digit numbers, using digit pairing, the smaller-number rule, and verification with examples such as 529, 361, and 625.
Learn to find the square root of five-digit numbers using a two-digit grouping method, splitting the number and locating the first part between 10 and 20 to guide the root.
Learn a two-digit cube method from Vedic maths that uses a and b to compute n^3, with step-by-step substitution and carry handling, illustrated by 13^3, 21^3, and 56^3.
Learn to cube any three-digit number using a modified two-digit cube method, with the first two digits as e and the last as b, demonstrated on 102 and 909.
Demonstrate the cube root concept, its symbol, and how to find cube roots by factoring numbers like 125, 64, and 343 using the trial method.
Explore the cube root concept in Vedic maths, using a table of last-digit patterns to identify cube endings and build cube roots through worked examples.
Master cube roots of four-digit and five-digit numbers in Vedic maths using a three-digit right-to-left split, cube comparisons from one to ten, and the smaller-number rule.
Group the number into three-digit parts from the right, pick the first root digit by the cube-range between seven and eight, then use a table to find the remaining digits.
Solve linear equations in one variable quickly by spotting a common factor like x plus four or seven, using multiplication and equating the common part to zero for instant solutions.
Learn how to solve a special type of algebraic expression where (x+a)(x+b) equals (x+c)(x+d); if a×b equals c×d, set x to zero.
Master Type-3 algebraic expressions by equating equal numerators and adding denominators, then setting their sum to zero with practical x-values. Explore how this lesson fits into the Vedic maths course.
Vedic Maths is a methodology of fast calculations having Vedic Sutras which saves time in maths and has benefits & features to develop mental maths and speed in maths. It is an ancient system of calculation found in the Vedas between 1911 and 1918 by Shri Bharati Krishna Tirathji. He was born in 1884 in Puri, Orrisa. He had a great hold in the subjects of Maths, Science, Sanskrit, and Humanities. He had learned these techniques from “Rig Veda”.
It helps faster calculations with a lot of tricks, short-cut methods also called Sutras.
This course is designed interactively for beginners to improve speed and accuracy.
The syllabus consists of the following topics
1. Multiplication
2. Division
3. Addition
4. Subtraction
5. Square
6. Square-root
7. Cube
8. Cube-root
9. LCM (Lowest Common Multiple)
10. HCF (Highest Common Factor)
11.Fractions
12.Decimals
13.Calendar
14.Tables 1 to 50
15.Percentage
Benefits of this wonderful course
1. Reduce Rough Work
2. Builds Speed and Accuracy in Maths
3. Save Time in Calculations
4. Students Confidence is Higher
5. Higher Ranks in Competitions
6. Easy to Pick up and Learn
7. Make Maths Interesting and Fun
8. It Increases Visualization
9. It develops Logical Reasoning
10. It Develops your Concentration
Explanation with Examples in Vedic Methodology
Vedic Mathematics Methods of doing Maths helps to solve difficult sums easily and quickly. And these are systematic methods implying these are far easier than conventional methods taught in the school. It reduces a lot of steps for children and thereby increases their speed of calculation making them competitive. Hence in school competitions and Olympiads kids trained with this system of learning do better than others otherwise.
Nowadays the interest in the Vedic System of Learning is growing a lot. The children are comfortably applying Vedic Sutras in Geometry, Calculus, Computing Etc.
It is said “Practice Makes the Man Perfect”, the more you practice the better is the speed of calculation and mental maths of the students.
The benefit of Vedic Maths to Teachers
1. Learn to Calculate Faster
Knowing the techniques for faster calculations will help you to train students excellently in maths.
2. Develops Logical Ability of Students
Vedic Maths helps to grow students' brains and their mathematical ability.
3. Start your Center
One can easily start center online or offline as there is a huge demand for Vedic Maths to develop the mental maths ability of children.
4. Better Career Opportunities
Vedic Maths Teachers have better opportunities to grow than otherwise. It adds a feather in their teaching cap for growth in their career.
Each topic is elaborated in detail so that everybody can understand very easily.
After every lecture, a student has to attempt a quiz that will improve his/her speed & accuracy.