Answer to Question #285292 in Differential Equations for Jericho

"y' = -\\dfrac{x}{y} \\\\\n\\text{To get the orthogonal trajectory}\\\\\n\\text{We replace} \\, -\\dfrac{x}{y} \\, \\text{by its negative reciprocal}\\\\\n\\text{Hence, we have}\\\\\ny' = \\dfrac{y}{x} \\\\\n\\text{We solve this D.E using separation of variables}\\\\\n\\text{Hence, we have}\\\\\n\\dfrac{dy}{dx} = \\dfrac{y}{x} \\\\\n\\text{Integrating both sides, we have}\\\\\n\\int \\dfrac{dy}{y} = \\int \\dfrac{dx}{x} \\\\\n\\text{Integrating, we obtain}\\\\\ny = cx \\\\\n\\text{which is a family of the orthogonal trajectory}\\\\\n\\text{where C is an arbitrary constant}"