Artikler — Math
Artikler tagget Math
Seneste
![Fortgeschrittenenpraktikum Astronomie - Hausarbeit](https://writelatex.s3.amazonaws.com/published_ver/5013.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240630T221519Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=d6f014c486d4140fabd9af2683e97dd437058a3e09ebe1ecc0a543d618388900)
Fortgeschrittenenpraktikum Astronomie - Hausarbeit
Fortgeschrittenenpraktikum Astronomie Hausarbeit an der Universitäts-Sternwarte München (LMU).
Jean Amadeus Elsner
![Simple Mathematical Induction](https://writelatex.s3.amazonaws.com/published_ver/2101.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240630T221519Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=d8a4a5491fabaeba31a577d9e4497801cf5d1b2f473de233640195e515b0fd7e)
Simple Mathematical Induction
This is a simple step by step on how to do mathematical induction.
Ernest Michael Nelson
![Homework 4m](https://writelatex.s3.amazonaws.com/published_ver/1002.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240630T221519Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=021075601ff40c34dc2984a1864b84e8310c4a197315a7761ee1097ec182bd38)
Homework 4m
homework 4m
Geoffrey Bostany
![First Principle of Finite Induction](https://writelatex.s3.amazonaws.com/published_ver/2058.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240630T221519Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=218ca796683e16dee1925294e3e1c2cede405c500d931a0f30eb4aa15442c398)
First Principle of Finite Induction
Mathematical Induction paper
Ernest Michael Nelson
![E6 Übungsblatt 11](https://writelatex.s3.amazonaws.com/published_ver/4147.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240630T221519Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=f1cf7e40d343aced39bcf50c6944a178f8522de16c55d10a4192b961afa3ca97)
E6 Übungsblatt 11
Experimentalphysik 6: Festkörperphysik
Jean Amadeus Elsner
![Homework 2 for Statistical Methods 3025Q](https://writelatex.s3.amazonaws.com/published_ver/8599.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240630T221519Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=16d2aa3e3b0553ff60054e232217974f67a794a5f08ae706a7906bc80db68c29)
Homework 2 for Statistical Methods 3025Q
Statistical Methods 3025Q
Sydney Hyde
![FSU-MATH2400-Project2](https://writelatex.s3.amazonaws.com/published_ver/5566.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240630T221519Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=72bb0bd4d58aceb21e9f2f3074f027cfe1ee0211b2da1626fe2fa4ca5221d751)
FSU-MATH2400-Project2
The second project for MATH 2400, Calculus II, at Fitchburg State. Estimating volume using definite integrals.
Sarah Wright
![Multiport conversions between S, Z, Y, h, ABCD, and T parameters (IEEE INMMiC 2018 Poster)](https://writelatex.s3.amazonaws.com/published_ver/8187.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240630T221519Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=47d01ff3d806221b50fcc0fe50aa211b8b88caff8e2d5e6eb1a65df7c8a2522f)
Multiport conversions between S, Z, Y, h, ABCD, and T parameters (IEEE INMMiC 2018 Poster)
«Multiport conversions between S, Z, Y, h, ABCD, and T parameters.»
Integrated Nonlinear Microwave and Millimetre-wave Circuits (INMMIC 2018), Brive-la-gaillarde, France, July 2018.
Article:
http://www.microwave.fr/publications/151.pdf
Poster:
http://www.microwave.fr/publications/151p.pdf
Tibault Reveyrand
![eahf7](https://writelatex.s3.amazonaws.com/published_ver/4861.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240630T221519Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=b736fef8eaeb0f3ab410d10f1b73b8e56bd6ce9f3ee5460b66de4b8ef7bb75ce)
eahf7
Az egész együtthatós polinomok Q és Z feletti felbontásainak kapcsolatáról szóló tétel bizonyítása. (Az SZTE matematika alapszak Algebra és számelmélet (MBNK13) kurzusához házi feladat.)
Tamás Waldhauser