If $x.y.z=1$ show that $\dfrac 1{1+x+y^{-1}}+\dfrac1{1+y+z^{-1}}+\dfrac1{1+z+x^{-1}}=1$
My attempt - L.H.S$=\dfrac 1{1+x+y^{-1}}+\dfrac1{1+y+z^{-1}}+\dfrac1{1+z+x^{-1}}$
$=\dfrac y{y+xy+1}+\dfrac z{z+yz+1}+\dfrac x{x+zx+1}$
$=\dfrac{yz}{yz+xyz+z}+\dfrac z{z+yz+1}+\dfrac x{x+zx+1}$
What to do next?
$$\frac1{1+x+y^{-1}}=\frac y{y+xy+1}=\frac{yz}{yz+xyz+z}(\text{ multiplying by } z)$$
$$\implies\frac1{1+x+y^{-1}}=\frac{yz}{yz+1+z}$$
$$\frac1{1+y+z^{-1}}=\frac z{z+yz+1}(\text{ multiplying by } z)$$
$$\frac1{1+z+x^{-1}}=\frac x{x+zx+1}=\frac{xyz}{xyz+yz(zx)+yz}(\text{ multiplying by } yz)$$
$$\implies\frac1{1+z+x^{-1}}=\frac1{1+z+yz}$$