Solving Putnam Problems: Math Requirements

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SUMMARY

To effectively tackle Putnam Problems, a solid understanding of various mathematical disciplines is essential. Key areas include Algebra (identities, inequalities, polynomials, linear algebra, abstract algebra, functional equations, complex numbers), Real Analysis (sequences, series, continuity, derivatives, integrals, multivariable calculus), and additional topics such as Geometry, Trigonometry, Differential Equations, Elementary Number Theory, Combinatorics, and Probability. Mastery of these subjects is crucial, but creativity and extensive problem-solving experience are equally important for success in Putnam competitions.

PREREQUISITES
  • Algebra: identities, inequalities, polynomials, linear algebra
  • Real Analysis: sequences, series, continuity, derivatives
  • Elementary Number Theory: infinite descent, greatest integer function
  • Combinatorics and Probability
NEXT STEPS
  • Study advanced topics in Algebra, focusing on functional equations and abstract algebra
  • Explore Real Analysis concepts, particularly multivariable calculus and integrals
  • Practice solving problems in Elementary Number Theory, especially diophantine equations
  • Engage with Combinatorics and Probability problems to enhance problem-solving skills
USEFUL FOR

Mathematics students, competitive problem solvers, and educators seeking to deepen their understanding of the mathematical foundations necessary for success in Putnam Problems.

qspeechc
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Hello.

I was just wondering, what mathematics do you need to do the Putnam Problems? I looked at one of the books, and I could not do most of the problems, because I didn't know the relevant mathematics. I'm thinking you need at least linear algebra and real analysis?

Thanks.
 
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You need to know the following topics:

Algebra: identities, inequalities (primarily AM-GM and Cauchy-Schwarz), polynomials, linear algebra, abstract algebra, functional equations, complex numbers
Real Analysis: sequences, series, continuity, derivatives, integrals, multivariable calculus

Geometry, Trigonometry, Differential equations, Elementary number theory (infinite descent, greatest integer function, theorems relating to prime numbers, diophantine equations), Combinatorics and Probability.

But just knowing these topics won't enable you to crack putnam problems immediately unless you are extremely creative or gain a lot of experience doing putnam/olympiad problems. The problems that could be considered part of a good elementary math curriculum such as those from number theory, counting, and elementary algebra could be as difficult as tough math olympiad questions.
 
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