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Essential Mathematics for Quantum Computing

You're reading from   Essential Mathematics for Quantum Computing A beginner's guide to just the math you need without needless complexities

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Product type Paperback
Published in Apr 2022
Publisher Packt
ISBN-13 9781801073141
Length 252 pages
Edition 1st Edition
Languages
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Author (1):
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Leonard S. Woody III Leonard S. Woody III
Author Profile Icon Leonard S. Woody III
Leonard S. Woody III
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Table of Contents (20) Chapters Close

Preface 1. Section 1: Introduction
2. Chapter 1: Superposition with Euclid FREE CHAPTER 3. Chapter 2: The Matrix 4. Section 2: Elementary Linear Algebra
5. Chapter 3: Foundations 6. Chapter 4: Vector Spaces 7. Chapter 5: Using Matrices to Transform Space 8. Section 3: Adding Complexity
9. Chapter 6: Complex Numbers 10. Chapter 7: EigenStuff 11. Chapter 8: Our Space in the Universe 12. Chapter 9: Advanced Concepts 13. Section 4: Appendices
14. Other Books You May Enjoy Appendix 1: Bra–ket Notation 1. Appendix 2: Sigma Notation 2. Appendix 3: Trigonometry 3. Appendix 4: Probability 4. Appendix 5: References

Functions

Functions are fundamental to mathematics, and there is no doubt that you have been exposed to them before. However, I want to go over certain aspects of them in depth, as we will define things such as matrices as representations of functions later in the book.

The definition of a function

A function, for example, y = f(x), maps every element x in a set A to another element y in set B. Each element y is called the image of x under the function f(x). Set A is called the domain of the function and set B is called the codomain of the function. The domain and codomain of a function are denoted by f: A → B . The following mapping diagram shows the function f: X → Y.

Figure 3.5 – An example function [4]

All the images of f(x) form a set called the range. The range is a subset of the codomain. In the previous diagram of our function f: X → Y, the codomain was the set Y, but the range was the set {D, C}. The image of the...

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