TI-BASIC:SK:Matrices
Matrices are a step up from lists. Lists are a string of elements, like {5,4,3,2,1,0}. A matrix, on the other hand, is a list of lists, like [[5,5,5],[4,4,4],[3,3,3],[2,2,2]]. Below, we will start learning how to handle this more complex data type
Setting up Matrices
Unfortunately, unlike lists, there is no SetUpEditor command to make it easy for matrices. Fortunately, though, matrices [A] through [J] always exist, unless otherwise removed. This gets rid of the need to Dim( first. You do need to be careful with UnArchive. To ask if the user has already run the program, you could use a routine such as the following:
:Menu("CONTINUE?","YES",Y,"NO",N) :Lbl Y :UnArchive [J] :Lbl N :{2,3}→dim([J])
What's that last line of code do? Well, this is just like setting the size of lists in the last lesson. The only difference is that we need to have two numbers, separated by a comma, surrounded by curly braces. The last line of code above says to give matrix [J] 2 rows and 3 columns. If you prefer to think of matrices as lists of lists, you can say that the last line of code says, "Provide 2 lists, each with 3 elements."
Using Matrices
Writing
It is really simple to store an element into a matrix. To store then number 5 into row 1 and column 2 of our matrix [J], we use this line:
:5→[J](1,2)
Simple, right? What if you want to store the powers of 2 from element (1,1) to (2,3), we have to use this code:
:{2,3}→dim([J]) :0→P :For(R,1,2) :For(C,1,3) :P+1→P :2^P→[J](R,C) :End :End
Notice how it is a lot more complicated than the version with the list. It is because we first start the For( loop for both rows of our matrix, and then within that we start the for loop for every column of the current row.
Reading
Let's make this simple. To store a matrix element to a variable, use this line of code:
:[J](1,2)→A
This stores element (1,2) of [J] into the real variable A.
To display it, use this line:
:Disp [J](1,2)
Now, let's modify our program to show some results.
:ClrHome :{2,3}→dim([J]) :0→P :For(R,1,2) :For(C,1,3) :P+1→P :2^P→[J](R,C) :Disp [J](R,C) :End :End
We've added a ClrHome command to the beginning, and a Disp command above the two Ends. If you do it right, your output should be:
2 4 8 16 32 64 Done
Cleaning Up
Fortunately, you only need to Archive the matrix if you need to.
Final Notes
Now, you see how much more powerful a matrix is, when coming from a list. Matrices usually are used to store map data and such. Still, the bigger step up is the string data type. This is the most powerful variable type, and you will learn about it next.
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