$\tan^{-1}x, \tan^{-1}y, \tan^{-1}z $ are in arithmetic progression, as are $x$, $y$, $z$. (We assume $y \ne 0,1,-1$.) Show:
- $x$, $y$, $z$ are in geometric progression
- $x$, $y$, $z$ are in harmonic progression.
- $x=y=z$
- $(x-y)^2 +(y-z)^2+(z-x)^2 =0$
My attempt:
$$\text{A}=\tan^{-1}x \qquad \text{B}=\tan^{-1}y \qquad \text{C}=\tan^{-1}z$$ $$x=\tan A \qquad y=\tan B \qquad z=\tan C $$ $$x+z=2y$$ $$A+C=2B$$ $$\tan(A + B + C)=\frac{\tan A +\tan B +\tan C - \tan A\tan B\tan C }{1-\tan A\tan B -\tan B\tan C -\tan C\tan A}$$ $$\tan(3B)=\frac{x +y +z - xyz }{1-xy -yz -zx}$$
How do I continue from here?
