Why the hell am I just now finding this guy? Some of the clearest explanations on topics that I've been struggling with the last couple days and dude sets me straight in 17 minutes. Great video!
EXCELLENT explanation, sucks how we pay thousands to universities when this is 100 times better and more clearly explained in 15 mins than what they spend 3 hours on. Channel is MASSIVELY underrated, you are a great teacher
Amazing video, exceptionally well explained. A couple of questions: 1. What is it called if you are not allowed to have two disjoint sub-structures in the Hasse diagram? As in, if all elements would have to be connected somehow to just the one structure. 2. What type of ordering would it be if the relation were allowed to be symmetrical?
Hi @WrathofMath! Thanks for the explanation, it helped me clear up some confusion. Though I still have a small doubt you might be able to help me with. What if we have a set with that has some elements that only relate to themselves, even though other elements present all properties of transitivity. Would these just be drawn to the side alone like with (7,35)? Would they also be considered maximal and minimal of themselves?
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Why the hell am I just now finding this guy? Some of the clearest explanations on topics that I've been struggling with the last couple days and dude sets me straight in 17 minutes. Great video!
EXCELLENT explanation, sucks how we pay thousands to universities when this is 100 times better and more clearly explained in 15 mins than what they spend 3 hours on. Channel is MASSIVELY underrated, you are a great teacher
Thanks so much, I am glad it was helpful! I was pretty happy with how this lesson came out. Let me know if you ever have any questions!
True 100%
BEST HASSE DIAGRAM VIDEO EVER
you explained better in 15 min than my university professor who took 3 hours!
Glad to help!
this is exactly what I'm studying at my uni and this is very helpful thank you
Glad to help!
Uni ? I'm studying this at school 💀.
Bro saved my life
Glad to help!
This has been very helpful! Thank you so much
Great explanation, thank you!
My pleasure, thanks for watching!
Amazing video, exceptionally well explained.
A couple of questions:
1. What is it called if you are not allowed to have two disjoint sub-structures in the Hasse diagram? As in, if all elements would have to be connected somehow to just the one structure.
2. What type of ordering would it be if the relation were allowed to be symmetrical?
you hav gained a subscriber bruh!!
Thanks!
Thank you so much for the very helpful video!!!
Glad it was helpful!
very helpful, thank you!
You're welcome!
Wow. Thank you So much!
Amazing work! Keep it up!
"what you might notice if you look closely, is that its a complete disgusting mess"
god I choked on my water hahahah
magical video
Glad you liked it - thanks for watching!
5:11 GOLDEN
Excellent
Thank you!
Thanks you are a good theacher 👏💙
Thank you!
Thank you 😇
You're welcome 😊
Amazing, thanks.
Glad to help - thanks for watching!
Thank you for this so much!!!! you are so appreciated man
Thanks for watching!
thank you , was really helpful 🥰
why is the empty set a subset of every set? seems kinda of flimsy definition
thank you soooo much!!
Thank you so much
Thanks for watching!
Why would a hasse diagram on a total order not be arranged vertically? 4 is still maximal, 1 is still minimal, right? Nice video btw
Hi @WrathofMath! Thanks for the explanation, it helped me clear up some confusion. Though I still have a small doubt you might be able to help me with. What if we have a set with that has some elements that only relate to themselves, even though other elements present all properties of transitivity. Would these just be drawn to the side alone like with (7,35)? Would they also be considered maximal and minimal of themselves?
Yes, exactly =)
Thank youu, this was so helpful
Glad to hear it! Thanks for watching and let me know if you have any questions!
Thanks a lot!
You're welcome and thanks for watching!
You're the 🐐
Appreciate it!
Thank you!!!
My pleasure, thanks for watching!
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