The roots of the equation `x^(2)-2sqrt(3)x+3=0` are

Two sides of a triangle are given by the roots of the equation x^(2) -2sqrt3 x+2 =0. The angle between the sides is (pi)/(3). Find the perimeter of Delta.

For the equation 2x^(2)-6sqrt(2)x-1=0

If one roots of the equation x^(2)-sqrt(5)x-19=0 is (9+sqrt(5))/2 then find the other root.

If m_(1) and m_(2) are the roots of the equation x^(2) + ( sqrt(3) + 2) x + sqrt(3) - 1 =0 then prove that area of the triangle formed by the lines y=m_(1) x, y=m_(2) x and y=c is (c^2)/( 4) ( sqrt(33) + sqrt(11)) .

Verify whether 1 and (3)/(2) are the roots of the equation 2x^(2)-5x+3=0

The range of values of a so that all the roots of the equations 2x^(3)-3x^(2)-12x+a=0 are real and distinct, belongs to

If both roots of the equation x^(2)-(m-3)x+m=0(m in R) are positive, then

If 1,omega,omega^(2) are the cube roots of unity, then the roots of the equation (x-1)^(3)+8=0 are

If the roots of the equation x^2-2a x+a^2+a-3=0 are real and less than 3, then

If the roots of the equation 10x^(3)-cx^(2)-54x-27=0 are in harmonic progression the value of c is