Hello,

Below you’ll see that I typed some words and formed them into sentences. Hopefully you find them interesting!

Understanding Dashboard Limits and Tiles

Dynatrace offers a lot of capability with its dashboarding and you can put a lot of tiles on it. If you’ve checked out the JSON metadata, read documentation, or used the API to create dashboards you probably know these constraints.

• The Dashboard has a 5016x5016 pixel area
• Tiles must be divisible by 38

The Puzzle

If you’re in charge of creating dashboards for your organization one option would be to use the UI tools. Frankly, this option is boring and if you have to create a lot of dashboards it can become tedious and time-consuming. Instead you should write an application that automates your work and luckily the Dashboards API offers all the endpoints you need to do this.

If you’re like me and work for a large enterprise you’ll probably have hundreds of different variations of dashboards you’ll need to automate. Maintaining consistency with your application’s logic will be important as your work scales. That will be especially true for the code that organizes and places the tiles on your dashboard.  

Geometry!

As I was brainstorming ideas on how to automate the grouping of tiles I realized that this dashboard has two sides of the same length. I’m 87% sure this means that the Dynatrace dashboard is a square. So I checked out some geometric proofs and came up with a potential way of organizing tiles.

This proof is based off rational lengths. You can prove the area of a square by coming up with a smaller square with side-length ‘p’ and separating its sides into ‘q’ equal parts while maintaining that p/q is RATIONAL.

We can test it out using the constraints I mentioned previously. First we know that the Dynatrace dashboard has side lengths of 5016 pixels. That means that

A= 5016^2

L = 5016

Now we need to come up with a square with a smaller area. How about a square with a side length of 912 pixels. (912 is divisible by 38)

p = 912

Now we have to separate the sides into q equal parts and p/q must be rational

q = 4

912/4 = 228

Looks like that checks out. See below picture for a visual representation on the dashboard

912/2 = 456 is also rational so we could replace some of these tiles with larger ones

The entire square doesn't need to be populated with tiles either, you can still understand the two equal sides here in this picture 

Q&A

So yeah one possible way to maintain a way of organizing your tiles automatically would be to create smaller squares of tiles that meet the rational side length proof.

I'm honestly still not sure if I'm even correct on this but hopefully this can generate some discussion!

Cheers,

Nick