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question 1 it doesnt matter if you want infinitely many cookies you can still send a few our wayhow is it possible for
question wait a minute the tag says 20449 and im sure it was a much smaller number before wasnt it supposed to be 59
question the infinitely many specimens in the liver fluke lab are collected for transport a dolly stacked with boxes is
question the cataloguer avoids relabeling as follows every entry number has a value between 0 and 1 lets say i have a
question 1 in fact i think that all but finitely many of the lab assistants are here that must mean that storage is
question 1 what is the cardinality of the stools in the coffee area2 show that n n13 show that n n1000000004 show
question 1 show that n has the same cardinality as z2 show that z has the same cardinality as 2z3 show that n has the
question 1 suppose two field biologists come in each with infinitely many samples devise a simple way to store them all
question 1 what if everyone wanted two cups of coffee-what map would accomplish this goal2 prove that 12 is
question thats odd the sample tag says 134 but i thought we were told it was going to be number 59 assuming the sample
question infinitely many field biologists arrive each with infinitely many specimens ill leave the first specimen in
question 1 eight additional samples arrive and so the storage coordinator cannot guarantee that the protagonists sample
question do you have a favorite number we can move all the samples from that number onwards up a drawer and then we can
question a ladder 20 ft long leans against the wall of a house the base of the ladder is pulled away at a rate of 3
question 1 show that alefsym0 middot alefsym0 alefsym02 what should alefsym2 mean3 what is the cardinality of the
question let i be a monomial ideal in kt1tq and x vi sub aq k the associated monomial variety if k is infinite prove
question let k be an algebraically closed field then there is a one to one correspondence between affine varieties resp
question let i be an ideal of a polynomial ring s kt over an algebraically closed field k and let p1 ps be the
question if k is a field and x sub aqk then x sub v ix with equality if x is an affine variety let j be an ideal of a
question let b ax be a polynomial ring over a ring a and let i be an ideal of a prove aix bib where the left-hand
question let r be a polynomial ring over an infinite field k and i a graded ideal of height r if i is minimally
question let a be an affine algebra over a field k and let k sub k be a field extension provea dima dima otimesk kb
question let k be a field and let a be an affine k-algebra prove that a is artinian if and only if dimka let i and j be
question if a is a unique factorization domain show that a is normal show an example of an integral extension of rings
question let g be an ordered abelian group and let kxii isin g be a polynomial ring over a field k with quotient field