CAT  >  Cube root of any number in 10 seconds: Vedic Mathematics

# Cube root of any number in 10 seconds: Vedic Mathematics Video Lecture - Quantitative Aptitude (Quant) - CAT

## Quantitative Aptitude (Quant)

174 videos|144 docs|110 tests

## FAQs on Cube root of any number in 10 seconds: Vedic Mathematics Video Lecture - Quantitative Aptitude (Quant) - CAT

 1. What is Vedic Mathematics?
Ans. Vedic Mathematics is a system of mathematical calculations that originated in ancient India. It is based on a set of 16 sutras (aphorisms) and 13 sub-sutras (corollaries) that provide various techniques for solving mathematical problems quickly and efficiently.
 2. How does Vedic Mathematics help in finding the cube root of any number?
Ans. Vedic Mathematics provides a specific technique called "Nikhilam Navatashcaramam Dasatah" to find the cube root of any number. This technique involves a step-by-step process of simplifying the given number and finding its cube root using certain algebraic manipulations.
 3. Can Vedic Mathematics be used for finding the cube root of complex numbers?
Ans. Yes, Vedic Mathematics can be used to find the cube root of complex numbers as well. The techniques and principles of Vedic Mathematics can be applied to simplify complex numbers and determine their cube root using the same process as for real numbers.
 4. Is it necessary to memorize all the sutras and sub-sutras of Vedic Mathematics to find the cube root of any number?
Ans. No, it is not necessary to memorize all the sutras and sub-sutras of Vedic Mathematics to find the cube root of any number. Understanding the concept and principles behind the techniques is more important. With practice, one can become proficient in using Vedic Mathematics for cube root calculations without relying solely on memorization.
 5. Are there any limitations to using Vedic Mathematics for finding the cube root of any number?
Ans. Vedic Mathematics, like any mathematical system, has its limitations. While it provides efficient techniques for finding the cube root of most numbers, it may not be suitable for extremely large or complex numbers. In such cases, alternate methods or computer algorithms may be more appropriate.

## Quantitative Aptitude (Quant)

174 videos|144 docs|110 tests

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