Find the roots of the equation
`1/(a+b+x)-1/x=1/a+1/b`?

The sum of the roots of the equation 1/(x+a) + 1/(x+b) = 1/c is zero. What is the product of the roots of the equation ?

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 sum of the roots of the equation (1)/(x+a)+(1)/(x+b)=1/c is zero,the prove that the product of the root is (-(1)/(2))(a^(2)+b^(2))

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 (x-a)/(ax-1)=(x-b)/(bx+1) are reciprocal to each other.then a.a=1 b.b=2 c.a=2b d.b=0

Find the roots of the following equations : x - (1)/(x) = 3, x != 0

Find the roots of the following equations: (a) |sin x|=sin x+1 (b) x^(2)-2|x|-3=0

-If a,b,c in R then prove that the roots of the equation (1)/(x-a)+(1)/(x-b)+(1)/(x-c)=0 are always real cannot have roots if a=b=c

Find the roots of the quadratic equation. x+(1)/(x)=3,(x!=0)

If alpha,beta are the roots of the equations ax^(2)+bx+c=0 then the roots of the equation a(2x+1)^(2)+b(2x+1)(x-1)+c(x-1)^(2)=0