A beautiful inequality | International Mathematical Olympiad 2012 Problem 2
#IMO #IMO2012 #MathOlympiad Here is the solution to Problem 2 of IMO 2012!! ———————————————————————————————————————————————— Follow my Instagram page for more Maths :) Link: / lets.think.critically ———————————————————————————————————————————————— I share Maths problems and Maths topics from well-known contests, exams and also from viewers around the world. Apart from sharing solutions to these problems, I also share my intuitions and first thoughts when I tried to solve these problems. Subscribe: https://www.youtube.com/c/letsthinkcr... Email me (address in video) your suggestions! [email protected]
▶︎
A Crazy Inequality under a Bizarre Condition | Turkish Junior Mathematical Olympiad 2012 Problem 3
▶︎
The unexpectedly hard windmill question (2011 IMO, Q2)
▶︎
International Mathematical Olympiad 2017 Problem 2
▶︎
A Central American inequality.
▶︎
Why Averages Are (Almost) Always Wrong: Jensen's Inequality and the Flaw of Averages
▶︎
How to Answer ANY Question (Even If You Don't Know The Answer!)
▶︎
Solving the hardest question of a British Mathematical Olympiad
▶︎
International Math Olympiad, IMO 2023, Problem 4
▶︎
Two Solutions to International Mathematical Olympiad 1986 Problem 1
▶︎
32 Game Theory & Meta Questions
▶︎
The Greatest Mathematician of Our Time
▶︎
an IMO functional equation.
▶︎
Who is Smarter? Engineer vs Chinese 5th Grader
▶︎
Iran – Neuseeland Highlights | Gruppe G, FIFA WM 2026 | sportstudio
▶︎
Solving IMO 2020 Q2 in 7 Minutes!! | International Mathematical Olympiad 2020 Problem 2
▶︎
Math Olympiad Problem | AM-GM Inequality | an example
▶︎
Almost an IMO Problem | IMO Shortlist 2019 N2
▶︎
500% ACCURACY CHESS
▶︎
The Oldest Unsolved Problem in Math
▶︎