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Unformatted text preview: Stat 5101 (Geyer) Fall 2011 Homework Assignment 8 Due Wednesday, November 9, 2011 Solve each problem. Explain your reasoning. No credit for answers with no explanation. If the problem is a proof, then you need words as well as formulas. Explain why your formulas follow one from another. 81. Let X have the standard Cauchy distribution, which has PDF defined in the brand name distributions handout f ( x ) = 1 1 1 + x 2 , < x < . (a) Find the quantile function for X . (b) Find the median of X . (c) Find the lower and upper quartiles of X . Hint: the indefinite integral of 1 / (1 + x 2 ) is arc tangent of x (inverse of the tangent function). 82. Suppose X has the Exp(1) distribution. (a) What is the best prediction of the value of X if minimizing expected squared error is the criterion? (b) What is the best prediction of the value of X if minimizing expected absolute error is the criterion? In this problem, we want numeric answers so we can see how different they are. 83. Suppose X has the Gam(2 , 1) distribution. (a) What is the best prediction of the value of X if minimizing expected squared error is the criterion?...
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This note was uploaded on 09/13/2011 for the course STA 4184 taught by Professor Staff during the Spring '11 term at University of Central Florida.
 Spring '11
 Staff

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