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Essential Statistics for Non-STEM Data Analysts

You're reading from   Essential Statistics for Non-STEM Data Analysts Get to grips with the statistics and math knowledge needed to enter the world of data science with Python

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Product type Paperback
Published in Nov 2020
Publisher Packt
ISBN-13 9781838984847
Length 392 pages
Edition 1st Edition
Languages
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Author (1):
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Rongpeng Li Rongpeng Li
Author Profile Icon Rongpeng Li
Rongpeng Li
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Table of Contents (19) Chapters Close

Preface 1. Section 1: Getting Started with Statistics for Data Science
2. Chapter 1: Fundamentals of Data Collection, Cleaning, and Preprocessing FREE CHAPTER 3. Chapter 2: Essential Statistics for Data Assessment 4. Chapter 3: Visualization with Statistical Graphs 5. Section 2: Essentials of Statistical Analysis
6. Chapter 4: Sampling and Inferential Statistics 7. Chapter 5: Common Probability Distributions 8. Chapter 6: Parametric Estimation 9. Chapter 7: Statistical Hypothesis Testing 10. Section 3: Statistics for Machine Learning
11. Chapter 8: Statistics for Regression 12. Chapter 9: Statistics for Classification 13. Chapter 10: Statistics for Tree-Based Methods 14. Chapter 11: Statistics for Ensemble Methods 15. Section 4: Appendix
16. Chapter 12: A Collection of Best Practices 17. Chapter 13: Exercises and Projects 18. Other Books You May Enjoy

Understanding common discrete probability distributions

In this section, we will introduce you to some of the most important and common distributions. I will first demonstrate some examples and the mechanism behind them that exhibits corresponding probability. Then I will calculate the expectation and variance of the distribution, show you samples that generated from the probability, and plot its histogram plot and boxplot.

The expectation of X that follows a distribution is the mean value that X can take. For example, with PDF the mean is calculated as follows:

The variance measures the spreading behavior of the distribution and is calculated as follows:

μ and σ2 are the common symbols for expectation and variance.

X is called a random variable. Note that it is the outcome of a random experiment. However, not all random variables represent outcomes of events. For example, you can take Y = exp(X), and Y is also...

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