Recent
![Fortgeschrittenenpraktikum Astronomie - Hausarbeit](https://writelatex.s3.amazonaws.com/published_ver/5013.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240630T201945Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=6a1491adf933e902c9c7db51a1ece35e2b386d095318d5183e9dec974f96367c)
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=20240630T201945Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=b3d15622386db8bf3de1b6a52da8241c4cb66c08e81c97b43609477793521117)
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=20240630T201945Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=3dcac067f4c366e8f3e0fe147754986d006e7d86bb3a023d9302b7836ba6bdd6)
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=20240630T201945Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=0397c87f7adab46c8d3cfffc0597299f44c8d02693d8836409e2d3322e2ca4a2)
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=20240630T201945Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=7c73979fbd616377802f993407bd0593ce4d87545ae783818609d18a60e3ba4d)
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=20240630T201945Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=3396b9170f8ccd7871b5fcfc9f52e2fbdc85c128af82994324db4ff95b1f536e)
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=20240630T201945Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=8182a5e9f42c07f30e1adcb25ffe90ac700043462fa3214ab8cfbfb33180f9b7)
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=20240630T201945Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=2b9e23c5bcbf62c71961234d188138dc9def10b83e1dfeb49e1513b193709c4d)
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=20240630T201945Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240630/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=2290c5d99fec799cf7c2304dbe45f82c76015cde9b1a315e971da5d9e8e0745b)
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