Hallo zusammen,
ich bin neu hier und habe kaum Ahnung vom Programmieren doch wir sollen in der Schule in Datenverarbeitung zur Übung ein Programm entwerfen, dass ein Sierprinski Dreieck zeichnet. Doch leider habe ich keine Ahnung wie es funktioniert
![](data:image/png;base64,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)
So soll es aussehen. Ich bitte um Hilfe, danke
ich bin neu hier und habe kaum Ahnung vom Programmieren doch wir sollen in der Schule in Datenverarbeitung zur Übung ein Programm entwerfen, dass ein Sierprinski Dreieck zeichnet. Doch leider habe ich keine Ahnung wie es funktioniert
![?(](https://www.vb-paradise.de/wcf/images/smilies/confused.png)
So soll es aussehen. Ich bitte um Hilfe, danke
![:)](https://www.vb-paradise.de/wcf/images/smilies/smile.png)