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2007 honors examination in statistics1 let y have a gammaalpha beta distribution with density given bywhere alpha and
honors exam in real analysis 20071 suppose k is a subset of rn prove that k is compact if and only if every continuous
2007 honors examination in probability1 let y have a gamma alpha beta distribution with density given bywhere alpha and
honors exam in geometry 20071 let p q isin h2 be any two distinct points in the hyperbolic plane and suppose p q isin
honors exam in complex analysis 20071 suppose k is a subset of rn prove that k is compact if and only if every
2007 honors examination in algebra-1 let sn denote the symmetric group of permutations of 1 2 n consider s3 sube s4
honors examination in topology 20081 suppose x is a set the finite-complement topology tf is given by tf u sub xx - u
2008 honors examination in probability1 suppose that you ask a random sample of 36 male students at swarthmore how many
2008 honors exam in complex analysispart i - real analysis1 find a metric dmiddot middot on the real line r that makes
2008 honors examination in algebra1 decide whether each of the following statements is true or false give brief reasons
2009 honors examination topology1 define the terms compact hausdorff and closed in the following theorem and prove the
2009 honors examination in statistics-1 sixteen people volunteered to be part of an experiment all sixteen people were
2009 honors examination real analysisi basic analysis1 a define the terms compact and complete as they apply to a
honors exam - spring 2009 probabilityi exercises-1 three people a b and c play a game in which they throw coins one
2009 honors examination in geometry1 the map gamma r rarr r3 given bygammat t t2 t3defines a curve in r3 compute its
2009 honors examination in algebra1a let h be a subgroup of a finite group g show that the number of conjugates ghg-1
2010 honors exam in topologypoint-set topology1 let f x rarr y be a bijective continuous map of topological spacesa
honors exam in real analysis 20101 in this problem all matrices and vectors are given with respect to the standard
honors exam complex analysis 2010part i - real analysis1 if we equip the set e of all continuous functions f 0 1 rarr r
honors exam 2010 combinatorics1 patrol officers are to be paired for the 3-11 pm shift each pair must have an
honors exam 2010 algebra1 let g be a nonabelian group of order 28 whose sylow 2 subgroups are cyclica determine the
2011 honors exam in topologypoint-set topology1 prove that a topological space x is connected if and only if every
honors exam 2011 statistics1 at age 35 1 in 270 pregnant women carry a fetus with down syndromea an article in the
honors exam 2011 real analysispart i real analysis1 a topological space is called separable if it contains a countable
honors exam 2011 probability1 suppose that x1 x2 are an infinite collection of random variables defined on some