I have never commented on a youtube video but given this video's quality and low view count I feel obliged. Your video is fantastic. Please keep up the good work.
your explanation is a bit confusing... I prefer this explanation taken off the solution paper - The memoryless property means a 'waiting time' until a certain event, does not depend on how much time has elapsed already i.e. knowing what happened before does not influence what happens after.
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I have never commented on a youtube video but given this video's quality and low view count I feel obliged. Your video is fantastic. Please keep up the good work.
Dear god, you explained it far better in less time than my prof. Thank you sir
God bless you! Thank you for this video. IDK how long I spent trying to understand this concept, and you explained it effortlessly
This added one more smart wrinkle to my brain. Thank you!
Much better explanation than MIT Probability - The Science of Uncertainty and Data course
I'm pursuing the mentioned course and also came here to be able to understand this better :)
very thorough. Cleared up my questions on this property. Thank you.
Nicely presented. Good Luck
The example on both the plot and sample space graph is helpful.
Great explanation! I wish you made more videos on probability.
this is such a good channel thank you
Thank you. Thank you. Thank you.
Fantastic explanation. So simply explained.
Clearly understood ❤❤❤❤❤
best explanation
Waal thanks a million.that was great
Great vid!..Can you do one on the Hazard Rate Functions? Thanks!!!
Thank you so much, It is easy to understand.
Why choose t as your variable which is so similar to a plus sign? Like you have so many other letters to choose from and you choose that.
Great explanation, thanks!
Very nice explanation!!! Thanks
fantastic! thank you sir!
Awesome Explanation (y)
good one! thumbs up!
Very well explained.
Great Explanation ~
thanks bro tough topic made easy
nicely explained .
good video, thx
Nice effort :)
8:23 the probability that you'll have to wait for t *or more than* t mins for the phone to ring*
more than t
Can anyone please explain why the uniform distribution is not memoryless?
@@saurabhjain2437 I don't think uniform dis. is bounded at both ends.
@@rakshaypawar7940 if it's not bounded then if you integrate the probability density function you won't get 1 but you'll get infinity.
your explanation is a bit confusing... I prefer this explanation taken off the solution paper - The memoryless property means a 'waiting time' until a certain event, does not depend on how much time has elapsed already i.e. knowing what happened before does not influence what happens after.
You messed up all.