Orthogonal Trajectories of One-Parameter Family of Curves

Theorem
Every one-parameter family of curves has a unique family of orthogonal trajectories.

Proof
Let $f \left({x, y, z}\right)$ define a one-parameter family of curves $\mathcal F$.

From One-Parameter Family of Curves for First Order ODE‎, there is a corresponding first order ODE:
 * $F \left({x, y, \dfrac{\mathrm{d}{y}}{\mathrm{d}{x}}}\right)$

whose solution is $\mathcal F$.

From Slope of Orthogonal Curves, the slope of one curve is the negative reciprocal of any curve orthogonal to it.

So take the equation:
 * $F \left({x, y, \dfrac{\mathrm{d}{y}}{\mathrm{d}{x}}}\right)$

and from it create the equation:
 * $F \left({x, y, -\dfrac{\mathrm{d}{x}}{\mathrm{d}{y}}}\right)$

i.e. replace $\dfrac{\mathrm{d}{y}}{\mathrm{d}{x}}$ with $-\dfrac{\mathrm{d}{x}}{\mathrm{d}{y}}$.

This is also a first order ODE, which corresponds with a one-parameter family of curves $\mathcal G$ defined by the implicit function $f \left({x, y, z}\right)$.

There is clearly one way of doing the above.

Hence the result.