5

Part of 2010 Finnish National High School Mathematics Competition

Problems(1)

Subset of a plane with a property

Source: Finnish Mathematics Competition 2010, Final Round, Problem 5

S

be a non-empty subset of a plane. We say that the point

P

can be seen from

A

if every point from the line segment

AP

S

. Further, the set

S

can be seen from

A

if every point of

S

can be seen from

A

S

can be seen from

A

B

C

ABC

is a triangle. Prove that

S

can also be seen from any other point of the triangle

ABC

geometry unsolvedgeometry