MATLAB Programming/Arrays/Basic vector operations - Wikibooks, open books for an open world (2024)

[MATLAB Programming\|/MATLAB Programming]m]

Chapter 1: MATLAB ._.

 Introductions .
Fundamentals of MATLAB
MATLAB Workspace
MATLAB Variables
*.mat files

Chapter 2: MATLAB Concepts

MATLAB operator
Data File I/O

Chapter 3: Variable Manipulation

Numbers and Booleans
Strings
Portable Functions
Complex Numbers

Chapter 4: Vector and matrices

Vector and Matrices
Special Matrices
Operation on Vectors
Operation on Matrices
Sparse Matrices

Chapter 5: Array

Arrays
Introduction to array operations
Vectors and Basic Vector Operations
Mathematics with Vectors and Matrices
Struct Arrays
Cell Arrays

Chapter 6: Graphical Plotting

Basic Graphics Commands
Plot
Polar Plot
Semilogx or Semilogy
Loglog
Bode Plot
Nichols Plot
Nyquist Plot

Chapter 7: M File Programming

Scripts
Comments
The Input Function
Control Flow
Loops and Branches
Error Messages
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Chapter 8: Advanced Topics

Numerical Manipulation
Advanced File I/O
Object Oriented Programming
Applications and Examples
Toolboxes and Extensions

Chapter 9: Bonus chapters

MATLAB Benefits and Caveats
Alternatives to MATLAB
[MATLAB_Programming/GNU_Octave|What is Octave= (8) hsrmonic functions]
Octave/MATLAB differences

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A vector in MATLAB is defined as an array which has only one dimension with a size greater than one. For example, the array [1,2,3] counts as a vector. There are several operations you can perform with vectors which don't make a lot of sense with other arrays such as matrices. However, since a vector is a special case of a matrix, any matrix functions can also be performed on vectors as well provided that the operation makes sense mathematically (for instance, you can matrix-multiply a vertical and a horizontal vector). This section focuses on the operations that can only be performed with vectors.

Contents

  • 1 Declaring a vector
    • 1.1 Declaring a vector with linear or logarithmic spacing
  • 2 Vector Magnitude
  • 3 Dot product
  • 4 Cross Product

Declaring a vector

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Declare vectors as if they were normal arrays, all dimensions except for one must have length 1. It does not matter if the array is vertical or horizontal. For instance, both of the following are vectors:

>> Horiz = [1,2,3];>> Vert = [4;5;6];

You can use the isvector function to determine in the midst of a program if a variable is a vector or not before attempting to use it for a vector operation. This is useful for error checking.

>> isvector(Horiz)ans = 1>> isvector(Vert)ans = 1

Another way to create a vector is to assign a single row or column of a matrix to another variable:

>> A = [1,2,3;4,5,6];>> Vec = A(1,:)Vec = 1 2 3

This is a useful way to store multiple vectors and then extract them when you need to use them. For example, gradients can be stored in the form of the Jacobian (which is how the symbolic math toolbox will return the derivative of a multiple variable function) and extracted as needed to find the magnitude of the derivative of a specific function in a system.

Declaring a vector with linear or logarithmic spacing

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Suppose you wish to declare a vector which varies linearly between two endpoints. For example, the vector [1,2,3] varies linearly between 1 and 3, and the vector [1,1.1,1.2,1.3,...,2.9,3] also varies linearly between 1 and 3. To avoid having to type out all those terms, MATLAB comes with a convenient function called linspace to declare such vectors automatically:

>> LinVector = linspace(1,3,21) LinVector = Columns 1 through 9 1.0000 1.1000 1.2000 1.3000 1.4000 1.5000 1.6000 1.7000 1.8000 Columns 10 through 18 1.9000 2.0000 2.1000 2.2000 2.3000 2.4000 2.5000 2.6000 2.7000 Columns 19 through 21 2.8000 2.9000 3.0000

Note that linspace produces a row vector, not a column vector. To get a column vector use the transpose operator (') on LinVector.

The third argument to the function is the total size of the vector you want, which will include the first two arguments as endpoints and n - 2 other points in between. If you omit the third argument, MATLAB assumes you want the array to have 100 elements.

If, instead, you want the spacing to be logarithmic, use the logspace function. This function, unlike the linspace function, does not find n - 2 points between the first two arguments a and b. Instead it finds n-2 points between 10^a and 10^b as follows:

>> LogVector = logspace(1,3,21) LogVector = 1.0e+003 * Columns 1 through 9 0.0100 0.0126 0.0158 0.0200 0.0251 0.0316 0.0398 0.0501 0.0631 Columns 10 through 18 0.0794 0.1000 0.1259 0.1585 0.1995 0.2512 0.3162 0.3981 0.5012 Columns 19 through 21 0.6310 0.7943 1.0000

Both of these functions are useful for generating points that you wish to evaluate another function at, for plotting purposes on rectangular and logarithmic axes respectively.

Vector Magnitude

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The magnitude of a vector can be found using the norm function:

>> Magnitude = norm(inputvector,2);

For example:

>> magHoriz = norm(Horiz) magHoriz = 3.7417>> magVert = norm(Vert)magVert = 8.7750

The input vector can be either horizontal or vertical.

Dot product

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The dot product of two vectors of the same size (vertical or horizontal, it doesn't matter as long as the long axis is the same length) is found using the dot function as follows:

>> DP = dot(Horiz, Vert)DP = 32

The dot product produces a scalar value, which can be used to find the angle if used in combination with the magnitudes of the two vectors as follows:

>> theta = acos(DP/(magHoriz*magVert));>> theta = 0.2257

Note that this angle is in radians, not degrees.

Cross Product

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The cross product of two vectors of size 3 is computed using the 'cross' function:

>> CP = cross(Horiz, Vert)CP = -3 6 -3

Note that the cross product is a vector. Analogous to the dot product, the angle between two vectors can also be found using the cross product's magnitude:

>> CPMag = norm(CP);>> theta = asin(CPMag/(magHoriz*magVert))theta = 0.2257

The cross product itself is always perpendicular to both of the two initial vectors. If the cross product is zero then the two original vectors were parallel to each other.

MATLAB Programming/Arrays/Basic vector operations - Wikibooks, open books for an open world (2024)

FAQs

How to do vector operation in MATLAB? ›

Vector (or Array) Operations
  1. Adding a single value to every element in an array: [5 6 7] + 3; % == [8 9 10]
  2. Adding two arrays together (element by element): [5 6 7] + [1 2 3]; % == [6 8 10]

What is a vector array in MATLAB? ›

A vector is a one-dimensional array of numbers. MATLAB allows creating two types of vectors − Row vectors. Column vectors.

What is the difference between a vector and a matrix in MATLAB? ›

A vector is a 1-dimensional matrix, either a vertical vector (N × 1) or horizontal vector (1 × N). Vectors are a subclass of matrices, so every vector is a matrix. xL and xU are horizontal (1 × N) vectors and therefore they are also matrices. ib.

What is the difference between an array and a matrix in MATLAB? ›

The ismatrix documentation states that a matrix "A matrix is a two-dimensional array that has a size of m-by-n, where m and n are nonnegative integers." Arrays have any number of dimensions, as far as I am concerned an array does not need to have pages, it can also be 2D (i.e. matrix) or scalar or empty.

What is an example of a vector in MATLAB? ›

In MATLAB a vector is a matrix with either one row or one column. In two dimensional system, a vector is usually represented by 1 × 2 matrix. For example, a vector, B in Figure 1 is 6i + 3j, where i and j are unit vectors in the positive direction for x and y axes, respectively in the Cartesian coordinate system.

How to create a MATLAB vector? ›

You can create a vector both by enclosing the elements in square brackets like v=[1 2 3 4 5] or using commas, like v=[1,2,3,4,5]. They mean the very same: a vector (matrix) of 1 row and 5 columns.

Why use vector instead of array? ›

In conclusion, while arrays are a fundamental part of C++, vectors provide a more flexible and convenient way to handle collections, especially when the size is not known in advance, or when elements need to be inserted or deleted. Vectors also offer better compatibility with the STL and are safer to use than arrays.

What is the basic difference between vector and array? ›

Size Flexibility: Arrays are fixed in size, whereas Vectors are dynamic and can automatically adjust their size. Performance: Arrays can be faster to access due to their fixed size and direct access nature. Vectors, being synchronized, might have a performance overhead due to thread safety.

How do you check if an array is a vector MATLAB? ›

TF = isvector( A ) returns logical 1 ( true ) if A is a vector. Otherwise, it returns logical 0 ( false ). A vector is a two-dimensional array that has a size of 1-by-N or N-by-1, where N is a nonnegative integer.

Is a vector just a matrix? ›

Note that a vector is the special case of a matrix, where there is only one row or column - In this case, the second subscript is dropped.

Can a vector be written as a matrix? ›

Because a vector is just a list of numbers, we can represent it as a matrix. This is why we can write vectors with matrix notation.

Is a vector not a matrix? ›

They are all the same thing. Vector is a synonym for a 1d Array and Matrix is a synonym for a 2d Array . The short names are just to make it easier to type and talk about. Array (e.g. Array{Any, 2} ) is the general name for a collection of some type (e.g. Any ) across some number of dimensions (e.g. 2 ).

Why is MATLAB better than Python? ›

MATLAB's integration with Simulink and specialized toolboxes makes it an ideal choice for certain engineering applications. On the other hand, Python's vast ecosystem and interoperability work well with a broader range of applications and more collaborative-based tasks and projects.

Is everything in MATLAB an array? ›

Every variable in MATLAB® is an array that can hold many numbers.

What does a * b do in MATLAB? ›

C = A . * B multiplies arrays A and B by multiplying corresponding elements. The sizes of A and B must be the same or be compatible. If the sizes of A and B are compatible, then the two arrays implicitly expand to match each other.

What are vectorized operations in MATLAB? ›

Vectorization is one of the core concepts of MATLAB. With one command it lets you process all elements of an array, avoiding loops and making your code more readable and efficient. For data stored in numerical arrays, most MATLAB functions are inherently vectorized.

How do vector operations work? ›

Vector operations are fundamental mathematical operations that involve manipulating and combining vectors. They are governed by a set of simple laws. Vectors are quantities that have both magnitude and direction. Scalar quantities can be handled using simple algebraic rules.

What is work vector in MATLAB? ›

All DWork vectors are S-function memory that the Simulink® engine manages. The Simulink software supports four types of DWork vectors: General DWork vectors contain information of any data type. DState vectors contain discrete state information.

How to do dot product in MATLAB? ›

C = dot( A,B ) returns the scalar dot product of A and B . If A and B are vectors, then they must have the same length. If A and B are matrices or multidimensional arrays, then they must have the same size.

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