MathDB

We say that two triangles

T_1

and

T_2

are contained one in each other, and we write

T_1 \subset T_2

, if and only if all the points of the triangle

T_1

lie on the sides or in the interior of the triangle

T_2

. Let

\Delta

be a triangle of area

S

, and let

\Delta_1 \subset \Delta

be the largest equilateral triangle with this property, and let

\Delta \subset \Delta_2

be the smallest equilateral triangle with this property (in terms of areas). Let

S_1, S_2

be the areas of

\Delta_1, \Delta_2

respectively. Prove that

S_1S_2 = S^2

.
Bonus question: : Does this statement hold for quadrilaterals (and squares)?

Problem Statement