Let be a triangle with . The points , , are the midpoints of the sides , , , respectively. The inscribed circle of with centre touches the side at point . The line , which passes through the midpoint of segment and is perpendicular to , intersects the line at point .
Prove that .
Let $ABC$ be a triangle with $|AB| \neq |AC|$. The points $K$, $L$, $M$ are the midpoints of the sides $BC$, $CA$, $AB$, respectively. The inscribed circle of $ABC$ with centre $I$ touches the side $BC$ at point $D$. The line $g$, which passes through the midpoint of segment $ID$ and is perpendicular to $IK$, intersects the line $LM$ at point $P$.
\\\\Prove that $|\angle{PIA}| = 90^{\circ}$.
Source: Srednjoeuropska matematička olimpijada 2016, ekipno natjecanje, problem 6
Školjka 
be a triangle with 
. The points 
, 
, 
are the midpoints of the sides 
, 
, 
, respectively. The inscribed circle of 
touches the side 
. The line 
, which passes through the midpoint of segment 
and is perpendicular to 
, intersects the line 
at point 
. 
.