Statistics / Mathematical Statistics with Applications 7 / Chapter 13 / Problem 40E

Mathematical Statistics with Applications | 7th Edition | ISBN: 9780495110811 | Authors: Dennis Wackerly; William Mendenhall; Richard L. Scheaffer

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Refer to the model for the randomized block design and let

Chapter 13, Problem 40E

(choose chapter or problem)

Refer to the model for the randomized block design and let \(\bar{Y}_{* j}\) denote the average of all of the responses in block $j$ .
a Derive \(E\left(\bar{Y}_{* j}\right)\) and \(V\left(\bar{Y}_{* j}\right)\).
b Show that \(\bar{Y}_{* j}-\bar{Y}_{* j}\) is an unbiased estimator for \(\beta_{j}-\beta_{j}\) the difference in the effects of blocks $j$ and ${j}^{'}$ .
c Derive \(V\left(\bar{Y}_{* j}-\bar{Y}_{* j}\right)\).

$\$

Equation transcription:

${\overline{Y}}_{*j}$

$E({\overline{Y}}_{*j})$

$V({\overline{Y}}_{*j})$

${\overline{Y}}_{*j}-{\overline{Y}}_{*{j}^{'}}$

${\beta{}}_{j}-{\beta{}}_{{j}^{'}}$

$V({\overline{Y}}_{*j}-{\overline{Y}}_{*{j}^{'}})$

Text transcription:

bar{Y}{* j}

E(bar{Y}{* j})

V(bar{Y}{* j})

bar{Y{* j}-bar{Y}{* j}

beta{j}-\beta{j}

V{Y}{* j}-bar{Y}{* j})

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