In a right triangle, the segment whose ends are the incenter and the barycenter is parallel to one of the legs. Calculate the measure of one of its acute angles.(Answer:$37^o$)
There is a theorem that says the only right triangle where it is true that the segment that joins the incenter and centroid is parallel to a leg, is the one at 37° and 53°.
Can someone prove this theorem? I try but i didin't.
$GI \parallel BC \implies IH \perp AB\\
\angle A + \angle C = 90^o\\
\angle IAC +\angle ICA = \frac{\angle A}{2}+\frac{\angle C}{2}=45^o \implies \angle AIC = 135^o$


