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

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)

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 (a)/(x+a+k)+(b)/(x+b+k)=2 are equal in magnitude but opposite in sign, then the value of k is

If the roots of the equation (1)/(x+p)+(1)/(x+q)=(1)/(r) are equal in magnitude and opposite in sign,then (A)p+q=r(B)p+q=2rC ) product of roots =-(1)/(2)(p^(2)+q^(2)) (D) sum of roots =1