Analysis of Variance - Statsclick
Introduction Suppose that we wish to be more objective in our analysis of the data. Specifically, suppose that we wish to test for differences …
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Regular Exponential Family of Distributions
Let \(X_{1},X_{2},X_{3},...............X_{n}\) be an identically independent sample drawn from the exponential family. `f(x …
Cramer Rao lower bound in Bernoulli Distribution
Finding the UMVUE and CR Bound Let $X_1, X_2, X_3, \dots, X_n$ be a random sample drawn from a Bernoulli distribution $B(1, \theta)$. We aim to fin…
Cramer Rao lower bound in uniform distribution - statsclick
Lower bound and UMVUE estimation Let $X_1, X_2, \dots, X_n$ be a random sample from $U(0, \theta)$. We examine the application of the Cramér-…
Estimation of Lower Bound in Poisson Distribution
Example 4.3: Let \( X_1, X_2, \dots, X_n \) be a random sample from the Poisson distribution \( P(\theta) \) with parameter \( \thet…
Cramer Rao Inequality - statsclick
Information Inequality In this chapter, the lower bounds $B(\theta)$ for the variance, which is the smallest variance that can be attained…
Maximum Likelihood Estimators in Uniform Distribution
Let $x_1, x_2, x_3,...........,x_n$ denote the observations taken from a $Uniform \\ Distribution$ with pdf: `f(x, \theta) = 1 ; \theta …
Maximum Likelihood Estimator for Negative Binomial
If we consider a sequence of independent $Bernoulli \, Trials$ each trials has two outcomes called "success" or "failure".…
Maximum Likelihood Estimator in Binomial Distribution
Let $r$ be the number of success resulting from $n$ independent trials with unknown success probability $p$, such that $X$ follows $Binomial$ …