Essentials  (Page 3/4)

c = [1;2;3;4;5;]

Or by transposing a row vector with the ' operator:

c = [1 2 3 4 5]'

Or by using the Variable Editor:

Let us type in a 2x5 matrix:

d = [2 4 6 8 10; 1 3 5 7 9]

This example is a 5x2 matrix:

Let's solve the following simultaneous equations:

First, we will create a matrix for the left-hand side of the equation using the coefficients, namely 1 and 1 for the first and 2 and -5 for the second. The matrix looks like this:

The above matrix can be entered in the command window by typing A=[1 1; 2 -5] .

Second, we create a column vector to represent the right-hand side of the equation as follows:

The above column vector can be entered in the command window by typing B= [1;9] .

To solve the simultaneous equation, we will use the left division operator and issue the following command: C=A\B . These three steps are illustrated below:

The result C indicating 2 and 1 are the values for x and y , respectively.

Create a row vector for the following function: $y=2x^4+3x^3+5x^2+x+10$

Notice that in this example we have 5 terms in the function and therefore the row vector will contain 5 elements. p=[2 3 5 1 10]

Create a row vector for the following function: $y=3x^4+4x^2-5$

In this example, coefficients for the terms involving power of 3 and 1 are 0. The row vector still contains 5 elements as in the previous example but this time we will enter two zeros for the coefficients with power of 3 and 1: p=[3 0 4 0 -5] .