Question

Give shreedharacharya's rule

Answer 1

Answer:

He gave an exposition on the zero. He wrote, "If zero is added to any number, the sum is the same number; if zero is subtracted from any number, the number remains unchanged; if zero is multiplied by any number, the product is zero".

Step-by-step explanation:

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Answer 2

Answer:

He gave an exposition on the zero. He wrote, "If zero is added to any number, the sum is the same number; if zero is subtracted from any number, the number remains unchanged; if zero is multiplied by any number, the product is zero".

Sridharacharya formula is actually the quadratic formula, used for finding the roots of a quadratic equation…

Sridharacharya formula is actually the quadratic formula, used for finding the roots of a quadratic equation…ax² + bx + c = 0 , where a not =0 , & a,b, c are real coefficients of the equation.

Sridharacharya formula is actually the quadratic formula, used for finding the roots of a quadratic equation…ax² + bx + c = 0 , where a not =0 , & a,b, c are real coefficients of the equation.Being quadratic it has 2 roots..

Sridharacharya formula is actually the quadratic formula, used for finding the roots of a quadratic equation…ax² + bx + c = 0 , where a not =0 , & a,b, c are real coefficients of the equation.Being quadratic it has 2 roots..x = {-b + √(b² - 4ac) } / 2a & {-b-√(b² -4ac)} / 2a

Sridharacharya formula is actually the quadratic formula, used for finding the roots of a quadratic equation…ax² + bx + c = 0 , where a not =0 , & a,b, c are real coefficients of the equation.Being quadratic it has 2 roots..x = {-b + √(b² - 4ac) } / 2a & {-b-√(b² -4ac)} / 2aThe above Sreedharacharya's rule can be proved by solving the general form of quadratic equation ie by solving ax² + bx + c =0 by applying “Completing the square method”.

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