Geometric Distribution - Derivation of Mean, Variance & Moment Generating Function (English)
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- Опубліковано 8 вер 2024
- This video shows how to derive the Mean, the Variance and the Moment Generating Function for Geometric Distribution explained in English.
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Thanks man. I have been struggling to see the Converging Geometric series. And it's funny because I have been teaching grade 12's this series but I struggle to recognize it in this.LOL. 😆 🤣 😂
I am your fan. Thank you so much❤
Great work! Thank you, sir!
thx bro
This is wild
The value of K should be started with zero.....if value of k is started with 1, the mean is equal to 1/p, not q/p.....
Yes, but you will still manipulate the series to start at k=1 so you can use the sum of geometric progression formula, which is sum(k=1 to n, ar^k-1) = a(1-r^n)/1-r with abs(r)