Gallery Items tagged Math
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![IMT Test Flight](https://writelatex.s3.amazonaws.com/published_ver/5926.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240705T194724Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240705/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=dde337cf0b758248c10fd4a80bc7aa127fe59473e1308db135cea01d912ad296)
IMT Test Flight
Proof 1
Rafael Díaz de Leon
![Homework Template](https://writelatex.s3.amazonaws.com/published_ver/5874.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240705T194724Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240705/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=d3c2d91ba0521aaa47d0d29c010235d4282973d33cf6c2c1e06e167df998b125)
Homework Template
LaTeX template I've used extensively for Engineering homeworks.
Jennifer Byford
![FSU-MATH2400-Project1](https://writelatex.s3.amazonaws.com/published_ver/7457.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240705T194724Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240705/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=17ec815654f55baf1108c6545b2d6de605b420132337590e1795fe860a651afc)
FSU-MATH2400-Project1
This is a copy of the LaTeX code for Project #1 in Math 2400 at Fitchburg State University. Students can use this to help with their write-up.
This project was adapted from Adam Graham-Squire at High Point University. Students will use this to explore properties of hyperbolic trig functions within calculus.
Sarah Wright
![MATH 304 Template](https://writelatex.s3.amazonaws.com/published_ver/5357.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240705T194724Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240705/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=24318d19399a14ffe877cb2a5b4707011520d5117a6b17610396cf3e6c77728d)
MATH 304 Template
Homework template for MATH 304 Spring 2017
Philip Hotchkiss
![Statics Lab Report 1CW (jams4)](https://writelatex.s3.amazonaws.com/published_ver/4891.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240705T194724Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240705/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=d7eaff046921b98fe357d4101a2c901c1a579c090f9cffa40a63e0f5e2c5e3c3)
Statics Lab Report 1CW (jams4)
This is a statics lab report template for first year engineers.
jams4@cam.ac.uk
Jenni Sidey
![eahf7](https://writelatex.s3.amazonaws.com/published_ver/4861.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240705T194724Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240705/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=a88a8bb20e48578cbe9363b6ca0801b809c2117aa666b7f4bf1f2b1b0b42cc00)
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
![eahf5](https://writelatex.s3.amazonaws.com/published_ver/4794.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240705T194724Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240705/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=0581caac464f09a972b2873532c457550bcca0fff1f0b73d22c187bf70ec4557)
eahf5
A test feletti polinomok maradékos osztásáról szóló tétel bizonyítása. (Az SZTE matematika alapszak Algebra és számelmélet (MBNK13) kurzusához házi feladat.)
Tamás Waldhauser
![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=20240705T194724Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240705/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=04fba48d4b78466747c2bafbfb88b1574b31fbb13cee4910d675802f79b2fa7e)
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
![Template for proofs in Discrete and Argumentative Mathematics](https://writelatex.s3.amazonaws.com/published_ver/4533.jpeg?X-Amz-Expires=14400&X-Amz-Date=20240705T194724Z&X-Amz-Algorithm=AWS4-HMAC-SHA256&X-Amz-Credential=AKIAWJBOALPNFPV7PVH5/20240705/us-east-1/s3/aws4_request&X-Amz-SignedHeaders=host&X-Amz-Signature=029aa2b2e8a1bb30959d9b8f90aca870d99eba18b54efa83fb22cbd614c10936)
Template for proofs in Discrete and Argumentative Mathematics
This is the template for DAM (discrete and argumentative mathematics).
We prove theorem $2.1$ using the method of proof by way of contradiction. This theorem states that for any set $A$, that in fact the empty set is a subset of $A$, that is $\emptyset \subset A$.
stanley