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15 Math Concepts Every Data Scientist Should Know

You're reading from   15 Math Concepts Every Data Scientist Should Know Understand and learn how to apply the math behind data science algorithms

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Product type Paperback
Published in Aug 2024
Publisher Packt
ISBN-13 9781837634187
Length 510 pages
Edition 1st Edition
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Author (1):
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David Hoyle David Hoyle
Author Profile Icon David Hoyle
David Hoyle
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Table of Contents (21) Chapters Close

Preface 1. Part 1: Essential Concepts FREE CHAPTER
2. Chapter 1: Recap of Mathematical Notation and Terminology 3. Chapter 2: Random Variables and Probability Distributions 4. Chapter 3: Matrices and Linear Algebra 5. Chapter 4: Loss Functions and Optimization 6. Chapter 5: Probabilistic Modeling 7. Part 2: Intermediate Concepts
8. Chapter 6: Time Series and Forecasting 9. Chapter 7: Hypothesis Testing 10. Chapter 8: Model Complexity 11. Chapter 9: Function Decomposition 12. Chapter 10: Network Analysis 13. Part 3: Selected Advanced Concepts
14. Chapter 11: Dynamical Systems 15. Chapter 12: Kernel Methods 16. Chapter 13: Information Theory 17. Chapter 14: Non-Parametric Bayesian Methods 18. Chapter 15: Random Matrices 19. Index 20. Other Books You May Enjoy

Summary

This chapter was about information theory. Although you are less likely to directly use the calculations demonstrated in this chapter compared to the material from other chapters, the concepts and ideas behind information theory can be invaluable. Information-theoretic concepts give us a different way to think about probability, distributions, and what is conveyed when we observe a piece of data. Those concepts are as follows:

  • Information theory concerns itself with the communication of signals and the efficiency of encoding those signals.
  • The smaller the probability of an event or outcome occurring, the higher the information associated with that event or outcome.
  • We measure information on a logarithmic scale.
  • The expected information tells us the average amount of information we get from an observation of a random variable. The expected information is more commonly known as entropy.
  • Entropy increases with the variance of a distribution, so it quantifies...
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