COMPLEX NUMBER AND QUADRCTIC EQUATION

The fact that square root of a negative number does not exist in the real number system was recognised by the Greeks. But the credit goes to the Indian mathematician Mahavira(850) who first stated this difficulty clearly. "He mentions in his work 'Ganitasara Sangraha' as in the nature of things a negative (quantity) is not a square (quantity)',it has therefore, no square root". Bhaskara, another Indian mathematician, also writes in his work Bijaganita, written in 1150. 'There is no square root of a negative quantity, for it is not a square. "Cardan(1545) considered the problem of solving x+y= 10, xy= 40. He obtained x=5+root-15 as the solution of it, which was discarded by saying that these number are 'useless'. Albert Girard (about 1625) accepted square root of negative number and said that this will enable us to get as many roots as the degree of the polynomial equation. Euler was the first to introduce the symbol ¡ For root-1 and W.R. Hamilton(about1830) regarded the complex number a+¡b as an ordered pair of real numbers (a,b)thus giving it a purely mathematical definition and avoiding use of the so called 'imaginary number'......