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1995 British Mathematics Olympiad problem

This problem is from the 1995 BMO

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(n-1)!+1 = n^2
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(n-1)!+1 = n^2

USA Math Olympiad question with @PK Math
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USA Math Olympiad question with @PK Math

Solving the hardest question of a British Mathematical Olympiad
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Solving the hardest question of a British Mathematical Olympiad

A beautiful trick for solving quartic  polynomials
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A beautiful trick for solving quartic polynomials

The Shape that Broke Math
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The Shape that Broke Math

Romanian Mathematics Olympiad
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Romanian Mathematics Olympiad

Has an AI discovered new maths?
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Has an AI discovered new maths?

Prove that n⁷ +7 is never a perfect square.
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Prove that n⁷ +7 is never a perfect square.

Prove that the nested radical is less than 2 for all n
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Prove that the nested radical is less than 2 for all n

Find all integer solutions (Russian Math Olympiad)
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Find all integer solutions (Russian Math Olympiad)

When Math Isn’t Based in Reality
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When Math Isn’t Based in Reality

Why the Speed of Light Is NOT a Speed - Leonard Susskind
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Why the Speed of Light Is NOT a Speed - Leonard Susskind

f(x+1) = f(x+2) +1
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f(x+1) = f(x+2) +1

A System of Prime Equations
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A System of Prime Equations

Integrate x^-x dx
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Integrate x^-x dx

I Analyzed All 30,093,975,536 Battleship Boards So You Don't Have To
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I Analyzed All 30,093,975,536 Battleship Boards So You Don't Have To

Meet The World's Smartest Man
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Meet The World's Smartest Man

Find all n greater than 1 such that (2^n + 1)/n^2 is an integer.
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Find all n greater than 1 such that (2^n + 1)/n^2 is an integer.

Math Olympiad 3^m–2^m=65 | Math Olympiad Problems | Algebra
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Math Olympiad 3^m–2^m=65 | Math Olympiad Problems | Algebra

From Child Prodigy to Winning Fields Medal, Nobel of Math
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From Child Prodigy to Winning Fields Medal, Nobel of Math

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