KOMATH

<Qua-2025-781>, hint

<Qua-2025-781 > general, vector

<Tri-2025-2250>, hint

Let AYA'Z be parallelogram, then AA'=2AH=2 x 2R cosA

O' is symmetric to O about BC, hence OO'=2 RcosA.

Thus AA'= 2OO'=4R cosA

<Tri-2025-2250>, general, orthocenter

<Tri-2025-2249>, hint

Let M be the center of arc AB, opposite of C.

Since CM//NQ arc CQ=arc MN, <BCN=<CNQ=<CBQ=15, and <CQB=180- <CH(2)B

<CH(2)B=60. Triangles CQB, BNA, APC are congruent.

Since <MAC=90 NP//MA, arc MN=arcAP=arcNB, triangles NBQ and PAN are congruent

and since arc AMB=arc PAM (arc PA=arcNM) . Smilarly arcPAM=arcCQN

Triangle NQP is equilateral. <AH(1)B=<BH(2)C=<CH(3)B =180-<ANB=180-<BQC=180<-CPA

=60 . H(1),B,H(2) are collinear because <H(2)BQ=90-60=30, <CBQ=15, <ABC=60, <ABH(1)=90--15(=<ABN)=75. Finally triangle H(1)H(2)H(3) is equilateral