solve `x : p/(x-q)+q/(x-p)=2; x!=p , q`

Similar Questions

Explore conceptually related problems

Solve x^(2)+x(r-q)-(p-r)(p-q)=0

Prove that p x^(q-r)+q x^(r-p)+r x^(p-q)> p+q+r ,where p, q, r are distinct and x!=1.

Solve : (1)/(p)+(1)/(q)+(1)/(x)=(1)/(x+p+q)

Prove that p x^(q-r)+q x^(r-p)+r x^(p-q)> p+q+r ,w h e r ep ,q ,r are distinct and x!=1.

Show that: x p q p x q q q xx-p)(x^2+p x-2q^2) .

Show that: |x p q p x q q q x|=(x-p)(x^2+p x-2q^2)dot

In the equation (x-p)/(q)+(x-q)/(p)=(q)/(x-p)+(p)/(x-q),x is not equal to

Solve for x and y:(q)/(p)x+(p)/(q)y=p^(2)+q^(2);x+y=2pq

Find (x+2p)/(x-2p) +(x+2q)/(x-2q),"when x" = (4pq)/(p+q) .