
Explore higher powers with Vedic maths by binary exponentiation: convert the exponent to binary, drop the leftmost bit, and square-and-multiply by the base while scanning left to right.
Discover methods to generate infinite pythagorean triples by expressing numbers as a difference of two squares. Use algebraic identities, factorization, and fractions like N/(2N+1) to build triples.
Explore divisibility tests from 1 to 10, master the digital root and casting out nines, and apply the oscillation method with positive escalators to test divisibility in Vedic mathematics.
Learn improvements to the Nikhilam division method by splitting large complements into two vin culums, using wind culm representations, and processing columns digit by digit to reduce calculation load.
Continue mastering universal division in Urdhva Tiryak Part 2, using flag digits, duplex calculations, and remainder tracking to perform precise division with any divisor, including decimal expansion.
Learn how to compute cube roots of any number using the general Partita division method in Vedic mathematics, including digit grouping, divisors, remainders, and decimals.
Apply Vedic mathematics techniques to calculate higher powers, perform divisibility tests, and derive square roots and cube roots, with daily practice and shared learning.
This course is a follow up course to Vedic Maths Complete Course - A Strong Foundation.
If you have been learning Vedic/Fast Maths by watching "magic math tricks" and "shortcuts" you've been DOING IT WRONG!!
This course takes a holistic approach to teaching Fast Mental Mathematics. It introduces new concepts like speedily finding squares, cubes and higher powers of numbers. You will also learn useful algorithms for serial and grid multiplication. The course will further branch into divisibility rules (of ANY number) and how you can create your own rules for divisibility as and when needed. After discussing various methods of division and auxiliary fractions we will then learn how to find square roots and cube roots of exact and inexact squares and cubes.
The course does not look at Vedic Maths as a set of "magic tricks" and "shortcuts" (and I discourage anyone to study Vedic maths as "tricks"), but instead this course teaches practical level mental mathematics while clearly explaining the logic of each method. So once the students understand the logic the methods become second-nature and there is no memorisation required.
This course also contains material never seen before anywhere in the World (e.g. Osculation, Auxiliary Fractions and General Division) and I hope that students find this enlightening.
If this course sparks in you a thirst for more (Algebra, Trigonometry, Geometry, Conics and Calculus), I will consider my purpose served and I look forward to seeing you in future courses.