MathDB

Points

A_1,A_2,A_3,...,A_{12}

are the vertices of a regular polygon in that order. The 12 diagonals

A_1A_6,A_2A_7,A_3A_8,...,A_{11}A_4,A_{12}A_5

are marked, as in the picture below. Let

X

be some point in the plane. From

X

, we draw perpendicular lines to all 12 marked diagonals. Let

B_1,B_2,B_3,...,B_{12}

be the feet of the perpendiculars, so that

B_1

lies on

A_1A_6

B_2

lies on

A_2A_7

and so on.
Evaluate the ratio

\frac{XA_1+XA_2+\dots+XA_{12}}{B_1B_6+B_2B_7+\dots+B_{12}B_5}

. https://i.imgur.com/DUuwFth.png

Problem Statement