In the equations `ax^(2) + bx+ c =0 , ` if one roots is negative of the other then:

For the equation 3 x^(2)+p x+3=0, p gt 0 , if one root is square of the other, then p=

Statement -1 In the equation ax^(2)+3x+5=0 , if one root is reciprocal of the other, then a is equal to 5. Statement -2 Product of the roots is 1.

Find the value of k so that the equation 49x^(2) - kx -81 =0 has one root as the negative of the other.

In the equations ax^(2) +bx +c=0 , if b=0 then the equations.

If one root of the equation ax^(2) + bx + c =0 is reciprocal of the one root of the equation a_(1)x^(2) + b_(1) x + c_(1) = 0 , then :

If one root of the equation x^(2) + px + q = 0 is square of the other root, then :

If one root of the ax^(2) + bx + c = 0 is equal to nth power of the other root, then the value of (ac^(n))^((1)/(n+1)) + (a^(n)c)^((1)/(n+1)) equal :

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

If 2a+3b+6c = 0, then show that the equation a x^2 + bx + c = 0 has atleast one real root between 0 to 1.

If the equation ax^(2)+bx+c=0 has equal roots, find c in terms of 'a' and 'b'.