Polya’s method for extremums

The segment of the shortest length

The segment $AB$ has the ends on the sides of a right angle and contains a point $C(x_C, y_C).$ Find the shortest length of such a segment. Solution

Let's imagine that $AB$ is a spring rod that cannot bend, but tends to shorten its length. The rod is fixed at point $C$ on a hinge without friction. The hinge allows the rod to rotate and slide. The ends of the rod can slide without friction along the grooves - the sides of the corner. Let the rod be balanced, and the force pulling it together is equal to $T.$ The grooves can create a force only along the normal, so they act on the rod with forces $F_B = \frac {T}{\sin \alpha}, F_A = \frac {T}{\cos \alpha}.$ For the rod to be balanced, it is required that the moments of the forces be equal relative to point $C.$ The moments of forces are: $F_A \cdot AC \cdot \sin \alpha = F_B \cdot BC \cdot \cos \alpha \implies \frac {BC}{AC} = \tan^2 \alpha,$ $\frac {y_C}{x_C} = \frac {BC \cdot \sin \alpha}{AC \cdot \cos \alpha} = \tan^3 \alpha \implies$ $AB = \left ( x_C^ {\frac {2}{3}} + y_C^ {\frac {2}{3}}\right ) ^{\frac {3}{2}}.$

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Polya’s method for extremums

The segment of the shortest length