Koustav Das

Data Analytics Trainee

MedTourEasy•  September 2023 - October 2023

During this period I had experienced the hands on working of a Data Analytics Professional and worked under the supervision of project mentor & developed the project entitled “Analyze Death Age Difference of Right Handers with Left Handers”.

IIT, Madras (Indian Institute of Technology)

Data Science and Programming, Diploma•  January 2023 - Present

After completing my M.Sc. in Mathematics, I am eager to join a diploma in data science to bridge the gap between theoretical knowledge and practical applications. My strong analytical foundation from mathematics, coupled with a keen interest in the real-world impact of data-driven solutions, motivates my pursuit of data science. The evolving career landscape and interdisciplinary nature of data science align with my goal to diversify my skill set, ensuring I remain at the forefront of technological advancements. I am excited to apply my mathematical expertise to solve complex problems in the dynamic field of data science.

Vidyasagar University

Applied mathematics, M.Sc.•  July 2019 - August 2021

In this period I have gain many skills like Statistical analysis, Linear Algebra, Numerical analysis, Vector Analysis, few Operations Research Techniques, Optimization, Problem solving, Critical thinking etc. I also learn few programming language here like Matplotlib, Lingo. I had also done a project in "Notes on Generalized Skew Derivation". Under this project work, our target is to generalize the concept of Jordan skew derivation by considering the situation D( x^(n+1) )= D(x) x^n+ α(x)D(x) x^(n-1) + (α(x))^2 D(x) x^(n-2) + ⋯ + (α(x))^n D(x) where D is an additive mapping and α is an automorphism of R. It is very clear that for n=1, D becomes a Jordan skew derivation. Similarly, we generalize the concept of Jordan generalized skew derivation by considering the situation F( x^(n+1) )= F(x) x^n+ α(x)D(x) x^(n-1) + (α(x))^2 D(x) x^(n-2) + ⋯ + (α(x))^n D(x) where F, D are additive mappings and α is an automorphism of R. It is very clear that for n=1, D becomes a Jordan generalized skew derivation. In this project work, we investigate these mappings and prove under some conditions when these mappings to be Jordan skew derivation or Jordan generalized skew derivation.