For what value of m will the equation `(x^2-bx)/(ax-c)=(m-1)/(m+1)` have roots equal in magnitude but opposite in sign?

The value of m for which the equation x^(3) + x + 1 = 0 . Has two roots equal in magnitude but opposite in sign, is :

In the equation (x(x-1)-(m+1))/((x-1)(m-1))=x/m , the roots are equal when m=

For what values of m the equation (1+m)x^(2)-2(1+3m)x+(1+8m)=0 has (m in R) (ii) both roots are equal?

If the roots of the equation 1/ (x+p) + 1/ (x+q) = 1/r are equal in magnitude but opposite in sign, show that p+q = 2r & that the product of roots is equal to (-1/2)(p^2+q^2) .

For what value of m, roots of the equations x^(2) +mx+ 4 =0 are equal?

The value of a for which the equation (1-a^2)x^2+2ax-1=0 has roots belonging to (0,1) is

If the roots of the equation (x^(2) -bx)/(ax -c) = (lambda - 1)/(lambda + 1) are shuch that alpha + beta = 0, then value of lambda is :

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

A value of b for which the equations : x^(2) + bx - 1= 0, x^(2) + x + b = 0 Have one root in common is :

The equation e^x = m(m +1), m<0 has