Great programme on this distribution. Really enjoyed the derivations of the 1st and 2nd moments using the sum of Bernouill RVs. Way easier than the weight sum approach!
Thanks for watching, I'm glad it was helpful! I'll make videos on all those distributions eventually, but it will take some time. These videos are always time consuming as a lot of thought needs to go in to exactly what to include about the distribution in question.
Well, that was a pretty good effort of yours...it was very helpful. can you please make videos on counting method, conditional CDF/PDF, as well as problems involving graphs ....to calculate expected values and variance under continuous and discrete Random variables separately
This channel is singlehandedly saving my grade/helping me study for the final
Great programme on this distribution. Really enjoyed the derivations of the 1st and 2nd moments using the sum of Bernouill RVs. Way easier than the weight sum approach!
Excellent explanation once again. Without knowing how we arrive at a formula makes it difficult to remember. You made it crystal clear. Thank you!
Glad to help!
@@WrathofMath Have you created any videos on Poisson's distribution already ?
I have not, but I plan to!
Much helpful video !! can you make video on geometric ,negative binomial ,hypergeometric,gamma distributions
Thanks for watching, I'm glad it was helpful! I'll make videos on all those distributions eventually, but it will take some time. These videos are always time consuming as a lot of thought needs to go in to exactly what to include about the distribution in question.
@@WrathofMath Thank you, I understand.. Hoping that you can it happen as early as you can.
Well, that was a pretty good effort of yours...it was very helpful. can you please make videos on counting method, conditional CDF/PDF, as well as problems involving graphs ....to calculate expected values and variance under continuous and discrete Random variables separately
so much better than my prof
can you please make a video about poisson distribution