MathDB

Let

L_i,\ i=1,2,3

, be line segments on the sides of an equilateral triangle, one segment on each side, with lengths

l_i,\ i=1,2,3

. By

L_i^{\ast}

we denote the segment of length

l_i

with its midpoint on the midpoint of the corresponding side of the triangle. Let

M(L)

be the set of points in the plane whose orthogonal projections on the sides of the triangle are in

L_1,L_2

, and

L_3

, respectively;

M(L^{\ast})

is defined correspondingly. Prove that if

l_1\ge l_2+l_3

, we have that the area of

M(L)

is less than or equal to the area of

M(L^{\ast})

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