" The quadratic equation "2x^(2)-sqrt(5)x+1=0" has "

The quadratic equation 2x^(2) - sqrt5 x +1 = 0 has

The quadratic equation 2x^(2)-sqrt5x+1=0 has (a) two distinct real roots (b) two equal real roots (c) no real roots (d) more than 2 real roots

The quadratic equation 2x^(2)-sqrt5x+1=0 has (a) two distinct real roots (b) two equal real roots (c) no real roots (d) more than 2 real roots

What is the nature of roots of the quadratic equation 2x^(2)-sqrt(5)x+1=0?

What is the nature of roots of the quadratic equation 2x^2-sqrt5x+1=0 ?

The quadratic equation x^(2) - (m -3)x + m =0 has

The quadratic equation x^(2) - (m -3)x + m =0 has

Solve the equation by using the general expression for roots of a quadratic equation: 2x^(2)-sqrt(3)x+1=0

One root of the quadratic equation x^(2)+(2-sqrt5)x-2sqrt5=0 is

Solve the equation by using the general expression for roots of a quadratic equation: 2x^2-sqrt(3)x+1=0