Gallery Items tagged Math
Recent
![Álgebra Linear II](https://writelatex.s3.amazonaws.com/published_ver/5739.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240701T011439Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240701/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=97ab4bbaf733e4d2ef650abc0edfb04dd53bc4d8ca31295ef8ee04e31ed1a186)
Álgebra Linear II
Álgebra Linear II
eu
![FSU-MATH2400-Project5](https://writelatex.s3.amazonaws.com/published_ver/5666.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240701T011439Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240701/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=0fe8e1bb396df11746e3dfec58ef426f3cd518b7af29d6f394c63d008fed50ac)
FSU-MATH2400-Project5
The fifth project for Spring 2017 Calculus 2 at Fitchburg State. This project covers fractals and geometric series.
Sarah Wright
![The addition formulas for the hyperbolic sine and cosine functions via linear algebra](https://writelatex.s3.amazonaws.com/published_ver/4599.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240701T011439Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240701/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=8350dc3e215e7a98ccc149763a89f977512d70bc0b18d0e0933f2cab6b4f8768)
The addition formulas for the hyperbolic sine and cosine functions via linear algebra
We present a geometric proof of the addition formulas for the hyperbolic sine and cosine functions, using elementary properties of linear transformations.
David Radcliffe
![hf-latex](https://writelatex.s3.amazonaws.com/published_ver/6851.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240701T011439Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240701/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=189d24b76baa31bd5276f013a477233a9d08f4db935e32f7d88e0ecee1585f4a)
hf-latex
Egy kis segítség azoknak az SZTE-s hallgatóknak, akik a házi feladatokat LaTeX-ben szeretnék elkészíteni.
Tamás Waldhauser
![Poker Theorems](https://writelatex.s3.amazonaws.com/published_ver/15554.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240701T011440Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240701/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=4171f8318cd73e1b6ffa9227633fd61bee74310bc3b8d84b2b660f20b5535431)
Poker Theorems
A simple trick to decorate Theorem-like environments with poker suits QED symbols.
I did not come up with this theorem decoration style (I've first seen it here) nor with the whole code (I salvaged it from TeX StackExchange and other sources over the years). This is just my current implementation of the code.
Níckolas Alves
![Riemann's Rearrangement Theorem](https://writelatex.s3.amazonaws.com/published_ver/3859.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240701T011440Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240701/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=737f02c96b9fd4103408d9c325c3c6ed64d27ab56a52869c48cef1e094783e01)
Riemann's Rearrangement Theorem
"(Infinite) series are the invention of the devil, by using them, on
may draw any conclusion he pleases, and that is why these series
have produced so many fallacies and so many paradoxes."
-Neils Hendrik Abel
Courtney Ticer
![Math 351 templates](https://writelatex.s3.amazonaws.com/published_ver/2259.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240701T011440Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240701/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=d7090459950bd878bfb4cab6f62ad5869275fd170759c694850636cb5130c6b3)
Math 351 templates
Template for Math 351
Junyi Zhang
![Newton's Method Cycles](https://writelatex.s3.amazonaws.com/published_ver/3875.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240701T011440Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240701/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=a873c654b8518b4d08fe6f158bf7479227da7e4ad827ee71b7a58dba7aae3e1c)
Newton's Method Cycles
Based on the paper Sometimes Newton's Method Cycles, we first asked ourselves if there were any Newtonian Method Cycle functions which have non-trivial guesses. We encountered a way to create functions that cycle between a set number of points with any initial, non-trivial guesses when Newton's Method is applied. We exercised these possibilities through the methods of 2-cycles, 3-cycles and 4-cycles. We then generalized these cycles into k-cycles. After generalizing Newton's Method, we found the conditions that skew the cycles into a spiral pattern which will either converge, diverge or become a near-cycle. Once we obtained all this information, we explored additional questions that rose up from our initial exploration of Newton's Method.
Edgara Vanoye & MacKay Martin
![Homework Template](https://writelatex.s3.amazonaws.com/published_ver/922.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240701T011440Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240701/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=eb1e9ab2a29c29d05a65d6b1bef338bcedb11ab165e6115efd5054ff12d51ee2)
Homework Template
Template for mathematics *group* homework assignments.
Kristen Beck