From c98972ced700b6250915a21af4b76459365743f3 Mon Sep 17 00:00:00 2001 From: Christian Kolset Date: Thu, 24 Apr 2025 23:31:17 -0600 Subject: Updated markdown files to look better after converting to latex files. --- tutorials/module_1/array.md | 2 +- 1 file changed, 1 insertion(+), 1 deletion(-) (limited to 'tutorials/module_1/array.md') diff --git a/tutorials/module_1/array.md b/tutorials/module_1/array.md index 3385231..449135a 100644 --- a/tutorials/module_1/array.md +++ b/tutorials/module_1/array.md @@ -15,7 +15,7 @@ A two-dimensional array would be like a table: A three-dimensional array would be like a set of tables, perhaps stacked as though they were printed on separate pages. If we visualize the position of each element as a position in space. Then we can represent the value of the element as a property. In other words, if we were to analyze the stress concentration of an aluminum block, the property would be stress. - From [Numpy documentation](https://numpy.org/doc/2.2/user/absolute_beginners.html) -![Mathworks 3-D array](https://www.mathworks.com/help/examples/matlab/win64/nddemo_02.gif) +![Mathworks 3-D array](figures/multi-dimensional-array.gif) If the load on this block changes over time, then we may want to add a 4th dimension i.e. additional sets of 3-D arrays for each time increment. As you can see - the more dimensions we add, the more complicated of a problem we have to solve. It is possible to increase the number of dimensions to the n-th order. This course we will not be going beyond dimensional analysis. -- cgit v1.2.3