View Detailed Profile
IMO 1964 Problem 2 Solution (by Dr. B.C.Hui) - English

IMO 1964 Problem 2 Solution (by Dr. B.C.Hui) - English

IMO 1964 Problem 2 Solution

Geometric inequality in IMO (1964) Q2 (Using Cosine Rule and Trigo Identities)

Geometric inequality in IMO (1964) Q2 (Using Cosine Rule and Trigo Identities)

matholympiad #

An IMO Divisibility Problem [IMO 1964 Problem 1]

An IMO Divisibility Problem [IMO 1964 Problem 1]

Today we solve

1964 IMO Problem #2

1964 IMO Problem #2

Rearrangement inequality.

IMO 1964 Problem 1 Solution (By Dr. B.C.Hui)

IMO 1964 Problem 1 Solution (By Dr. B.C.Hui)

IMO 1964 Problem

2020 IMO Problem 2 Solution: Mounted Power Inequality

2020 IMO Problem 2 Solution: Mounted Power Inequality

2020

Can You Solve This Math Olympiad Problem? | IMO 1962 P2

Can You Solve This Math Olympiad Problem? | IMO 1962 P2

Get ready for a mathematical showdown! This inequality

IMO 1964 - 2^n - 1 and 2^n + 1(in fact this is easier than 1959 IMO problem 1)

IMO 1964 - 2^n - 1 and 2^n + 1(in fact this is easier than 1959 IMO problem 1)

A sample

2012 IMO Problem 2  (Two solutions)

2012 IMO Problem 2 (Two solutions)

https://artofproblemsolving.com/community/c3839_2012_imo.

What Numbers Satisfy this Inequality? [IMO 1962 Problem 2]

What Numbers Satisfy this Inequality? [IMO 1962 Problem 2]

Today we solve

But what is "triangle" doing here? (IMO 1964/2)

But what is "triangle" doing here? (IMO 1964/2)

This video explores my

The unexpectedly hard windmill question (2011 IMO, Q2)

The unexpectedly hard windmill question (2011 IMO, Q2)

The famous (infamous?) "windmill"

IMO Problems can be Very Easy!! | International Mathematical Olympiad 1960 Problem 2

IMO Problems can be Very Easy!! | International Mathematical Olympiad 1960 Problem 2

IMO