If `a,b,c in R ` and the roots of ` ax^2+bx+c=0` are equal in magnitude but opposite in sign , then which of the following can be true :

If roots of ax^2+bx+c=0 are equal in magnitude but opposite in sign, then

If two roots of x ^(3) -ax ^(2) + bx -c =0 are equal in magnitude but opposite in sign. Then:

If two roots of x^3-a x^2+b x-c=0 are equal in magnitude but opposite in signs, then prove that a b=c

If two roots of the equation x^3 - px^2 + qx - r = 0 are equal in magnitude but opposite in sign, then:

If the roots of the equations x^(2) - (a-b)x + c = 0 are integers which are equal in magnitude and opposite in sign, which of the following statements are true ? I. a = - b II. a =b III. c+a^(2) = 0

a, b, c, in R, a ne 0 and the quadratic equation ax^(2) + bx + c = 0 has no real roots, then which one of the following is not true?

If the roots of the equation (1)/(x+a) + (1)/(x+b) = (1)/(c) are equal in magnitude but opposite in sign, then their product, is

If b=0,c<0, is it true that the roots of x^2+bx+c=0 are numerically equal and opposite in sign? Justify your answer.

If the roots of (x^(2)-bx)/(ax-c)=(k-1)/(k+1) are numerically equal but opposite in sign, then k =

If the equation a/(x-a)+b/(x-b)=1 has two roots equal in magnitude and opposite in sign then the value of a+b is