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Mastering Julia

You're reading from   Mastering Julia Enhance your analytical and programming skills for data modeling and processing with Julia

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Product type Paperback
Published in Jan 2024
Publisher Packt
ISBN-13 9781805129790
Length 506 pages
Edition 2nd Edition
Languages
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Author (1):
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Malcolm Sherrington Malcolm Sherrington
Author Profile Icon Malcolm Sherrington
Malcolm Sherrington
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Table of Contents (14) Chapters Close

Preface 1. Chapter 1: The Julia Environment 2. Chapter 2: Developing in Julia FREE CHAPTER 3. Chapter 3: The Julia Type System 4. Chapter 4: The Three Ms 5. Chapter 5: Interoperability 6. Chapter 6: Working with Data 7. Chapter 7: Scientific Programming 8. Chapter 8: Visualization 9. Chapter 9: Database Access 10. Chapter 10: Networks and Multitasking 11. Chapter 11: Julia’s Back Pages 12. Index 13. Other Books You May Enjoy

Simple matrix operations

We will be meeting matrices and matrix operations throughout this book, but let us look now at the simplest of operations.

Let’s take A and B, as defined in the following code snippet:

julia> A = [1 2 3; 4 5 6];
julia> B = [1 5; 4 3; 2 6];

The normal matrix rules apply, which is a feature of multiple dispatch; we will cover this in Chapter 4.

The transpose of B can be computed as follows:

julia> C = transpose(B)
2×3 transpose(::Matrix{Int64}) with eltype Int64
1 4 2
5 3 6

This can also be written more compactly as C = B’:

julia> A + C
2x3 Matrix{Int64}:
2 6 5
9 8 12
julia> A*B
2x2 Matrix{Int64}:
15 29
36 71

Matrix division makes more sense with square matrices, but it is possible to define the operations for non-square matrices too. Note here that the / and \ operations produce results of different sizes:

julia> A / C
2x2 Matrix{Float64}
0.332273 0.27663
0.732909 0.710652
julia> A \ C
3x3 Matrix{Float64}:
 1.27778  -2.44444  0.777778
 0.444444 -0.111111 0.444444
-0.388889  2.22222  0.111111

The type of the array was previously defined as Array{Int64,2} rather than the now more compact form of Matrix{Int64}, and ditto Array{Float64,2} has been replaced with Matrix{Float64}.

We will discuss matrix decomposition in more detail later when looking at linear algebra.

Although A * C is not allowed because the number of columns of A is not equal to the number of rows of C, the following broadcasts are all valid:

julia> A .* C 2x3 Matrix{Int64}: 1  8  6 20 15 36
julia> A ./ C 2x3 Matrix{Float64}: 1.0 0.5     1.5 0.8 1.66667 1.0
julia> A .== C 2x3 BitMatrix 1  0  0 0  0  1

So far, we have only been looking at manipulating variables representing arithmetic values. Julia has a variety of string types, which we will look at next.

You have been reading a chapter from
Mastering Julia - Second Edition
Published in: Jan 2024
Publisher: Packt
ISBN-13: 9781805129790
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