@@briangreco2718 Yes! I love keynote. Way better than powerpoint. And it does real equations. Anyway - I thought you did a great job with this video and can't wait to see more.
“Not too many things can be above average or else the average will be higher than we know the average actually is.” I think most people (including me) think they are above average in general (life) but it makes sense that we aren’t. Markov’s inequality could be use as a self assessment tool which I think is cool
Compare this with the MIT lecture on the same topic and decide for yourself what is more intuitive th-cam.com/video/vjYanZ1nsZg/w-d-xo.html&ab_channel=MITOpenCourseWare
Markov’s inequality requires a non-negative random variable. If you know the variance, you may be able to use something like Chebyshev’s inequality, which gives an upper bound on the probability of being far away from the mean. Chebyshev’s inequality requires you to know the variance.
"Markov's Inequality can appear puzzling without proper comprehension, but with a well-illustrated explanation, it transforms into common sense. I appreciate the clarity with which you conveyed this concept. Additionally, I would eagerly anticipate a future video elucidating Chebyshev's inequality."
This is awesome!!! TRIPLE BAM!!! :) I watched the whole thing and was mesmerized.
Thank you! I'm so glad I found your video on how you make yours - I never used Keynote before and it is great! Thanks for the inspiration! :)
@@briangreco2718 Yes! I love keynote. Way better than powerpoint. And it does real equations. Anyway - I thought you did a great job with this video and can't wait to see more.
@statquest I DID remember you when I heard the intro
that's a fantastic visual explanation... you are about to become very popular amongst statistics students worldwide
“Not too many things can be above average or else the average will be higher than we know the average actually is.” I think most people (including me) think they are above average in general (life) but it makes sense that we aren’t. Markov’s inequality could be use as a self assessment tool which I think is cool
The BEST explanation of Markov's inequality I've ever seen! Thanks!!!
Excellent video. I finally understand Markov's inequality with this example. Thank you!
Perhaps the best video on this topic.
Thank you!
Such a good explanation!! This deserved to be seen to be more people!
This made a ton of sense! Way easier to understand than my professor.
you're a true hero, i have no other words
very underrated video. your explaination was awesome.
Thank you sir! This is the clearest explanation I saw.
AMAZING explanation!
great explanation sir, thank you.
Commendable explanation Brian.
You are amazing 😇, thank you so much!!
this is very helpful, thank you so much ❤
Wow, I can't believe Markov's Inequality walls just makes the rich get richer.
The pareto distribution would be interesting for you
Thank you so much! this is so intuitive and funny
A bring me the horizon music video led me here in a series of coincidental events LOL 😅😂 enjoyed this video though
Absolutely brilliant
Great explanation
Great explaination.
insane explanation
i would like to see more videos on statistics and probability from you
beautiful!
excellent lecture
Thank you sir :)
Loved this. Thank you :)
Thanks! :)
Master piece
Its giving a hint of Heisenberg uncertainty principle
Compare this with the MIT lecture on the same topic and decide for yourself what is more intuitive
th-cam.com/video/vjYanZ1nsZg/w-d-xo.html&ab_channel=MITOpenCourseWare
What happens if X is a random variable that takes negative numbers?
Markov’s inequality requires a non-negative random variable. If you know the variance, you may be able to use something like Chebyshev’s inequality, which gives an upper bound on the probability of being far away from the mean. Chebyshev’s inequality requires you to know the variance.
So much easier to understand than some boring blak board video.
mathematical class consciousness
😂
"Markov's Inequality can appear puzzling without proper comprehension, but with a well-illustrated explanation, it transforms into common sense. I appreciate the clarity with which you conveyed this concept. Additionally, I would eagerly anticipate a future video elucidating Chebyshev's inequality."
Thanks Adam! You're in luck! th-cam.com/video/mlelI1LA9o4/w-d-xo.html