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Sridharacharya Equation. The Sridharacharya formula is used to solve the Sridharacharya equation (also known as the quadratic equation). The Sridharacharya equation is given by ax 2 + bx + c = 0, where a, b, c are real numbers and a ≠ 0.
May 4, 2023 · Learn to solve quadratic equations using the famous Sridharacharya formula. Also know its derivation, nature of roots, alternative method with solved examples. English
The Sridharacharya method is a rule for finding the roots of a quadratic equation. Let us consider a quadratic equation, a x 2 + b x + c = 0. Where a, b and c are real coefficients and a ≠ 0. The roots of the quadratic equation are computed as, x = - b ± b 2 - 4 a c 2 a.
The quadratic formula is also known as Shreedhara Acharya’s formula. In this article, you will learn the quadratic formula, derivation and proof of the quadratic formula, along with a video lesson and solved examples.
Unlock the secrets of quadratic equations with the Sridhar Aacharya formula! 🎓 In this tutorial, discover step-by-step instructions to effortlessly solve qu...
Quadratic Formula (Shridharacharya Sutra) – The quadratic formula is given by the great Indian mathematician Shridharacharya and is also known as Shridharacharya Sutra. This formula is used to solve the quadratic equation. x = –b ± √ (b2 – 4ac)/2a. Where, x = variable. a, b, c = Coefficients of quadratic equation.
The quadratic formula, is of the form \( x = \frac { - b \pm \sqrt{ b^2 - 4ac } } { 2a} .\) It is also known as Shreedhara Acharya's formula, named after the ancient Indian mathematician who derived it.
Jun 29, 2014 · Quadratic Equations and Roots. Sridhar Acharya (c. 870, India — c. 930 India) was an Indian mathematician, Sanskrit pundit and philosopher. He was born in Bhurishresti (Bhurisristi or...
Formula to Solve a Quadratic Equation: The roots of the quadratic equation is given by the following formula: This formula is known as Sridhar Acharya’s formula. Example3: Solve . Solution: According to Sridhar Acharya’s Formula, here, a=2, b=(-10), c=13. which are complex roots. To know more about complex numbers and ‘i’ refer Complex ...
The next major achievement in this equation also includes the different concepts and theories of Sridhar Acharya, an ancient Indian mathematician. The other equations that are also included in this equation also include (ax 2 + bx+c) =0. The quadratic formula is a useful alternative to obtain information about the different variables in this ...
