5

Part of 2008 South africa National Olympiad

Problems(1)

Perpendiculars from the orthocentre to angle bisectors

Source: South African MO 2008 Q5

ABC

has orthocentre

H

. The feet of the perpendiculars from

H

to the internal and external bisectors of

\hat{A}

P

Q

respectively. Prove that

P

is on the line that passes through

Q

and the midpoint of

BC

. (Note: The ortohcentre of a triangle is the point where the three altitudes intersect.)

geometrycircumcirclerectanglegeometry unsolved