Course Exam
250036 VO Number theory (2011S)
Labels
WHEN?
Thursday
01.12.2011
Examiners
Information
Examination topics
This course provides an introduction into the fundamental concepts and
results of Number Theory. We shall discuss in particular:
divisibility, prime numbers, gcd and lcm, Euclidian algorithm, congruences, chinese remainder theorem, Euler's totient function, Fermat's little theorem, quadratic reciprocity, continued fractions.
results of Number Theory. We shall discuss in particular:
divisibility, prime numbers, gcd and lcm, Euclidian algorithm, congruences, chinese remainder theorem, Euler's totient function, Fermat's little theorem, quadratic reciprocity, continued fractions.
Assessment and permitted materials
Schriftliche Prüfung (zweistündig)
Minimum requirements and assessment criteria
This course provides an introduction into the fundamental concepts and
results of Number Theory. We shall discuss in particular:
divisibility, prime numbers, gcd and lcm, Euclidian algorithm, congruences, chinese remainder theorem, Euler's totient function, Fermat's little theorem, quadratic reciprocity, continued fractions.
results of Number Theory. We shall discuss in particular:
divisibility, prime numbers, gcd and lcm, Euclidian algorithm, congruences, chinese remainder theorem, Euler's totient function, Fermat's little theorem, quadratic reciprocity, continued fractions.
Last modified: Sa 02.04.2022 00:24