Consider hypothesis testing with f(y|Ho) = 1/2; if y E (0,2] and f(y|H1) = 2y/4; if y E [0, 2]. Both pdfs are zero if y lies outside the interval (0,2]. Consider uniform costs. Show that minimax rule...

Consider hypothesis testing with f(y|Ho) = 1/2; if y E (0,2] and f(y|H1) = 2y/4; if y E [0, 2]. Both pdfs are zero if y lies outside<br>the interval (0,2]. Consider uniform costs. Show that minimax rule is given by: Choose H if y >r and Choose Ho if y <r. The<br>%3!<br>value of r is<br>Answer:<br>

Extracted text: Consider hypothesis testing with f(y|Ho) = 1/2; if y E (0,2] and f(y|H1) = 2y/4; if y E [0, 2]. Both pdfs are zero if y lies outside the interval (0,2]. Consider uniform costs. Show that minimax rule is given by: Choose H if y >r and Choose Ho if y

Jun 02, 2022

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Consider hypothesis testing with f(y|Ho) = 1/2; if y E (0,2] and f(y|H1) = 2y/4; if y E [0, 2]. Both pdfs are zero if y lies outside the interval (0,2]. Consider uniform costs. Show that minimax rule...

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