Question:medium

If $X_{1}=17, X_{2}=10, X_{3}=32$ and $X_{4}=5$ be the observed values of a random sample from the discrete distribution $P(X=x)=\begin{cases}\frac{\theta^{2x} e^{-\theta^2}}{x!} & \text{if } x=0,1,2,\dots, \theta>0 \\ 0 & \text{otherwise}\end{cases}$. Then MLE is

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By the invariance property of MLE, if $\hat{\lambda}$ is the MLE of $\lambda$, then $g(\hat{\lambda})$ is the MLE of $g(\lambda)$. Since $\hat{\lambda} = \overline{x} = 16$ and $\theta = \sqrt{\lambda}$, then $\hat{\theta} = \sqrt{16} = 4$.
Updated On: Jun 6, 2026
  • $16$
  • $12$
  • $8$
  • $4$
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The Correct Option is D

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