Difference between revisions of "Workshop: Advanced Computation (with Python)"

From Design and Build Lab
Jump to navigation Jump to search
(Added intro and Reformatting Arrays)
(Numpy.reshape)
 
Line 84: Line 84:
 
<br />
 
<br />
  
=== Reformatting Arrays ===
+
===Reformatting Arrays===
  
==== '''Numpy.reshape''' ====
+
===='''Numpy.reshape'''====
 +
[[File:Reshape Example.png|thumb]]
 
The reshape command is super useful if you have an array of good data and you just want to change the arrangement. Maybe you have a 5x5 matrix that you want to convert to a list, or maybe you have a 6x4 matrix that you want to be a 8x3 matrix. Whatever the case, the syntax to this command is straightforward:  
 
The reshape command is super useful if you have an array of good data and you just want to change the arrangement. Maybe you have a 5x5 matrix that you want to convert to a list, or maybe you have a 6x4 matrix that you want to be a 8x3 matrix. Whatever the case, the syntax to this command is straightforward:  
  
Line 95: Line 96:
 
'''Remember: The components of the new array size must multiply to equal the total number of elements in the array.'''
 
'''Remember: The components of the new array size must multiply to equal the total number of elements in the array.'''
  
==== '''Numpy.transpose''' ====
+
===='''Numpy.transpose'''====
 
If you have taken Linear Algebra before then you know the importance of the “transpose matrix”. For those of you who haven’t taken Linear Algebra, the transpose matrix is the matrix that forms when you flip the x and y components of an array. The syntax is simply np.transpose(A), where A is the original matrix. This is best seen with an example.<br />
 
If you have taken Linear Algebra before then you know the importance of the “transpose matrix”. For those of you who haven’t taken Linear Algebra, the transpose matrix is the matrix that forms when you flip the x and y components of an array. The syntax is simply np.transpose(A), where A is the original matrix. This is best seen with an example.<br />

Latest revision as of 23:10, 7 October 2019

This workshop focuses on developing your computational skills with python. What does this mean? Over the course of this workshop you will learn NumPy and Matplotlib (two popular libraries for python). Using these libraries, you can run computations over matrices. This might not mean much to you now, but what this effectively means is that after taking this workshop you will have the tools to build scripts with the ability to do linear algebra, convolution, image analysis, and much more.

Modules and Packages

Modules and packages are a feature of Python wherein, you can import subtasks (or modules) into your code. Using modules and packages leads to cleaner code because the files you create are less verbose.

Modules

Suppose you write an algorithm called sort.py which sorts a given dataset alphanumerically. Anytime you write a python script where you want to utilize this alphanumeric sorting function you can import the sort.py script into your existing code as a module with the following line:

import sort


Packages

Some coders write large modules and publish them for public use. We call these open source modules “packages”. SciPy, NumPy and matplotlib are all examples of popular python packages. We import them into our code with the same syntax as with modules. We can create a nickname for each package, simply “import [packagename] as [nickname]”.

import numpy as np

import scipy

import matplotlib as plt


Install Some Packages

For this tutorial we will be installing three packages. Please follow along.

  • For Windows - Open command prompt (go to the search bar, type “cmd” then enter).
  • For Mac - Open terminal

Now that you are in either command prompt or terminal, we are going to install NumPy, SciPy, and Matplotlib. Type in the following commands one-by-one, waiting for them to execute completely before entering the next one.

python -m pip install numpy

python -m pip install scipy

python -m pip install matplotlib

So what are these packages?

  • NumPy - This package gives you methods allow you to make arrays/matrices. It makes representing, analyzing and computing data easy.
  • SciPy - This package gives you further scientific computational resources including functions for optimization, linear algebra, FFT, signal and image processing and much more.
  • Matplotlib - This is a plotting library which gives you an easy way to visually represent data sets.


Using Packages

When you decide that you want to implement a package it is important to refer to the package’s official documentation. The documentation is a guide which can show you the capabilities, limitations and implementation of the package. The documentation for SciPy, NumPy and Matplotlib can be found under “Other Educational Resources for Python” at the end of this workshop.

All methods and functions which come along with the package can be called by their nickname (or the package name if no nickname was assigned in the import command).

NumPy example documentation.png
Np example.png


Useful NumPy Commands

Creating Arrays

numpy.zeros

Example of numpy.zeros

In numpy we can create an array in many different ways. Firstly I will show you how to create a matrix to any shape with every value set to 0. For this case where we want a blank array we can use the zeros method. Referring to the NumPy documentation, we find that the syntax is simply numpy.zeros((shape)) where shape is a shape enclosed by parentheses with each axis separated by a comma.

numpy.matrix

Example of numpy.matrix

We can also use numpy.matrix if we know the values we want in our array. Again, referring to the NumPy documentation, we see that there are actually two different ways we can represent arrays in NumPy. One syntax uses spaces and semicolons to separate elements. Another syntax uses commas and square brackets to separate elements.


Building / Appending to Arrays

numpy.append

We can append a new row or column to our matrix using the “append” method. Referring to the documentation you can see that the append method takes 3 arguments. 2 ‘array-like’ variables and an integer. The first variable is the original matrix that you want to add to. The second variable is the row or column of information to append. Finally, the last variable refers to the axis in which the row should be added to the end of. Numpy differentiates between axes like this:

  • 0 refers to X
  • 1 refers to Y
  • 2 refers to Z
  • 3+ refers to additional arbitrary axes

numpy.concatenate

Maybe instead of appending data to your array line-by-line you want to take data from multiple arrays and add them to the end of an existing axis. In this case you should use the concatenate method. It takes 2 main arguments; a list of arrays to concatenate and an integer to differentiate which axis it should be appended to. It is important to note that this command only works if the arrays are the same size EXCEPT in the axis which they are being concatenated to.

numpy.stack

(See also: numpy.dstack, numpy.hstack, numpy.vstack)

Let’s imagine you have many arrays of data and you want to stack them onto of each other. (Example: You have x,y arrays of light intensity on different materials like plastic, wood and glass. You want to create a new matrix with size x,y,z where z represents different materials.) This is the perfect use for numpy.stack. The command takes two main arguments; a list of arrays to stack (It is important to note that the stack command only works for array with the same shape) and an integer representing the new axis where the stacked arrays will grow.


Reformatting Arrays

Numpy.reshape

Reshape Example.png

The reshape command is super useful if you have an array of good data and you just want to change the arrangement. Maybe you have a 5x5 matrix that you want to convert to a list, or maybe you have a 6x4 matrix that you want to be a 8x3 matrix. Whatever the case, the syntax to this command is straightforward:

np.transpose(A,new_shape)

Here A is the original matrix and new_shape is a tuple of integers (a tuple is basically a list surrounded by parentheses, so don’t forget those parenthesis!).

Remember: The components of the new array size must multiply to equal the total number of elements in the array.

Numpy.transpose

If you have taken Linear Algebra before then you know the importance of the “transpose matrix”. For those of you who haven’t taken Linear Algebra, the transpose matrix is the matrix that forms when you flip the x and y components of an array. The syntax is simply np.transpose(A), where A is the original matrix. This is best seen with an example.