Let p, q and r be real numbers `(p ne q,r ne 0),` such that the roots of the equation are equal in magnitude but opposite in sign, then the sum of squares of these roots is equal to.

Let p, q and r be real numbers (p ne q,r ne 0), such that the roots of the equation 1/(x+p) + 1/(x+q) =1/r are equal in magnitude but opposite in sign, then the sum of squares of these roots is equal to.

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

For what value of m the roots of the equation I are equal in magnitude and opposite in signs?

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 equation 1/(x+p) + 1/(x+q) = 1/r are equal in magnitude but opposite in sign and its product is alpha

If the roots of the equation (1)/(x+p)+(1)/(x+q)=(1)/(r) are equal in magnitude and opposite in sign, then (p+q+r)/(r)