What is Vedic Mathematics?
Vedic mathematics was introduced by Saint Tirthaji in the 1960s and since then it has become very popular among the students of different ages.
The techniques in Vedic mathematics helps us in doing faster mental calculations. In today’s world with the use of technology we hardly use our brains for calculations and thus learning Vedic mathematics can help in many ways. Not only it enables us to do faster calculations but it also gives us a new way of thinking.
Mathematics is always seen as a very hard subject by students but if we know Vedic mathematics, we really start enjoying mathematics and it becomes fun and easy.
Whether you are preparing for competitive exams like CAT, GMAT etc or you are studying in school or you are preparing for a job interview, this course is for you. In fact, anyone looking to improve their mathematical skills should take this course.
The total duration of the course is 2 hours 20 minutes and it contains 15 video lectures which cover all the multiplication and division techniques.
At the end of the course, there are two quizzes which have to be completed in order to finish this course. You will also receive a certificate after finishing this course.
|Introduction to Vedic Mathematics||00:00:00|
|EKADHIKENA PURVENA (ONE MORE THAN THE PREVIOUS ONE)|
|“Ekadhikena Purvena” in Multiplication||00:00:00|
|“Ekadhikena Purvena” in Division||00:00:00|
|NIKHILAM NAVATASCARAMAM DASHATAH (ALL FROM 9, LAST FROM 10)|
|“Nikhilam Sutra” In Multiplication||00:00:00|
|“Nikhilam Sutra” in Division||00:00:00|
|URDHVA TIRYAGBHYAM (VERTICALLY AND CROSSWISE)|
|Multiplication of 2 digit Numbers using “Urdhva Tiryag”||00:00:00|
|Multiplication of 3 digit Numbers using “Urdhva Tiryag”||00:00:00|
|Multiplication of any Number or any equation using “Urdhva Tiryag”||00:00:00|
|PARAVARTYA VOJAYET (TRANSPOSE AND APPLY)|
|Division by number near to 10^n||00:00:00|
|“Paravartya Vojayet” in algebra||00:00:00|
|EKANYUNENA PURVENA (ONE LESS THAN THE PREVIOUS ONE)|
|Mutliplcation by 9, 99, 999, etc.||00:00:00|
|Mutliplicand is bigger than multiplier||00:00:00|
|Mutliplication of numbers near to any base.||00:00:00|
|YAVADUNAM TAVADUNIKRTYA VARGANCA YOJAYET (DEFICIT METHOD)|
|Squares of Numbers||00:00:00|
|Cubes of Numbers||00:00:00|