For the geometric distribution with probability mass function f(x; 4) = 0(1 - 0)", I = 0,1,2,..., 0
Posted: Wed May 11, 2022 12:29 pm
- For The Geometric Distribution With Probability Mass Function F X 4 0 1 0 I 0 1 2 0 O 1 The Method Of M 1 (28.66 KiB) Viewed 31 times
For the geometric distribution with probability mass function f(x; 4) = 0(1 - 0)", I = 0,1,2,..., 0<o<1, the method of moments estimator of based on a random sample of size n is found by solving for 0. (a) (1 - 0)** = X (b) Rio ;(1 - 0)* = X (C) (11-10(1 - 0)*:) = 0 (d) (n log(0) + Xx; log(1 - 0)) = 0 (e) 4E (esx) = 0 =
Posted: Wed May 11, 2022 12:29 pm
- For The Geometric Distribution With Probability Mass Function F X 4 0 1 0 I 0 1 2 0 O 1 The Method Of M 1 (28.66 KiB) Viewed 31 times