`a, b, c in R, a!= 0` and the quadratic equation`ax^2+bx+c=0` has no real roots, then

The roots of the quadratic equations ax^(2)+ bx =0 are:

If 1 is the root of the quadratic equation 3x^(2)+ax-2=0 and the quadratic equation a(x^(2)+6x)-b=0 has equal roots, find 'b'.

In a quadratic equations ax^(2) + bx+ c=0 , If a=0 then it becomes:

The discriminant of the quadratic equations ax^(2) + bx+ c =0 is :

If a+b+c=0 , then the equation 3ax^(2)+2bx+c=0 has :

Statement -1 If the equation (4p-3)x^(2)+(4q-3)x+r=0 is satisfied by x=a,x=b nad x=c (where a,b,c are distinct) then p=q=3/4 and r=0 Statement -2 If the quadratic equation ax^(2)+bx+c=0 has three distinct roots, then a, b and c are must be zero.

If a,b, c epsilon R(a!=0) and a+2b+4c=0 then equatio ax^(2)+bx+c=0 has

If a=0 in the quadratic equation ax^(2)+bx+2=0 , which type of equation is obtained?

Find the sum of roots of quadratic equations ax^(2) +bx+ c=0