Orthocenter on perpendicular bisector | INMO 2013

Join Trial or Access Free Resources

This is a problem from Indian National Mathematics Olympiad, INMO, 2013 based on Orthocenter on perpendicular bisector. Try out this problem.

Problem: Orthocenter on perpendicular bisector

In an acute angled triangle ABC with AB < AC the circle $latex \Gamma $ touches AB at B and passes through C intersecting AC again at D. Prove that the orthocenter of triangle ABD lies on $latex \Gamma $ if and only if it lies on the perpendicular bisector of BC.

Discussion

RMO 2013 Q3Suppose H is the orthocenter of triangle ABD and it lies on the circle $latex \Gamma $. We show that HB = HC (if we can show this then the perpendicular from H on BC will bisect BC).

DF and BE are altitudes of triangle ABD.

First we note that $latex \angle FBH = \angle HCB $ for FB is tangent to the circle and angle made by a chord with a tangent is equivalent to an angle in the alternate segment. In this case the chord is BH.

Again FBDE is cyclic (since $latex \angle BFD = \angle BED = 90^0 $ ). Hence $latex \angle FBH = \angle EDH $ (angle in the same segment FE). .... (ii)

But HDCB is also cyclic (all vertices are on the circle). Hence $latex \angle EDH = \angle HBC $ (exterior angle is equal to the interior opposite angle in a cyclic quadrilateral). .... (iii)

Combining (ii) and (iii) we have $latex \angle HCB = HBC$ implying HB = HC.

Conversely if we have HB = HC, this implies $latex \angle HBC = \angle HCB $ . Also $latex \angle FBD = \angle DCB $ (angles in the alternate segment subtended by chord BD)

Now consider triangles BEC and BFD. We have $latex \angle BEC = \angle BFD = 90^0 $ and $latex \angle ECB = \angle FBD $. Therefore remaining angles BDF and EBC are also equal. But $latex \angle DBC = \angle HCB $ implying $latex \angle BDF = \angle HCB $. Thus HDCB is cyclic. Hence proved.

  • If you are a student of Online Advanced Math Olympiad Program visit cheenta.com and login. Further discussions are happening in our forum.
  • If you are not a student of Cheenta, visit this place again. We will post all the solutions soon. You may click on the "Follow" button to get notified about updates.

Some Important Links:

ISI Entrance Course

ISI Entrance Problems and Solutions

Inequality with Twist – Video

More Posts
ISI M.Stat Entrance Success Story 2026

ISI M.Stat Entrance Success Story 2026

June 27, 2026

In 2026, the following Cheenta students have been successful for Indian Statistical Institute's M.Stat Entrance. They ranked within the first 50 in the entire country in these entrances. I.S.I. M.Stat Entrance

Read More
ISI B.Stat-B.Math and CMI BSc. Math Entrance Success Story 2026

ISI B.Stat-B.Math and CMI BSc. Math Entrance Success Story 2026

In 2026, the following Cheenta students have been successful for Indian Statistical Institute's B.Stat Entrance and Chennai Mathematical Institute's B.Sc. Math Entrance. They ranked within the first 200 in the entire country in these entrances. Most of these students attended the problem solving workshops regularly, which happen 5 days every week. CMI B.Sc. Math Entrance […]

Read More
8 Cheenta students cracked the Regional Math Olympiad 2025 

8 Cheenta students cracked the Regional Math Olympiad 2025 

December 26, 2025

In 2025, 8 students from Cheenta Academy cracked the prestigious Regional Math Olympiad. In this post, we will share some of their success stories and learning strategies. The Regional Mathematics Olympiad (RMO) and the Indian National Mathematics Olympiad (INMO) are two most important mathematics contests in India.These two contests are for the students who are […]

Read More
Cheenta Students Shine at IOQM 2025

Cheenta Students Shine at IOQM 2025

October 26, 2025

Cheenta Academy proudly celebrates the success of 27 current and former students who qualified for the Indian Olympiad Qualifier in Mathematics (IOQM) 2025, advancing to the next stage — RMO. This accomplishment highlights their perseverance and Cheenta’s ongoing mission to nurture mathematical excellence and research-oriented learning.

Read More

Leave a Reply

Your email address will not be published. Required fields are marked *

This site uses Akismet to reduce spam. Learn how your comment data is processed.

© 2010 - 2025, Cheenta Academy. All rights reserved.
linkedin facebook pinterest youtube rss twitter instagram facebook-blank rss-blank linkedin-blank pinterest youtube twitter instagram