The mooronic solution to the surprise quiz paradox says students know there will be a surprise quiz one day this week but they lose this knowledge on the penultimate day. This is because ‘there will be a surprise quiz one day this week’ then becomes an instance of Moore's paradox. This view has surprising consequences. Furthermore, even though the surprise quiz announcement becomes an instance of Moore's paradox on the penultimate day, this does not prevent the students from knowing the (...) quiz is coming. I conclude that the first stage of the paradoxical argument succeeds and the mooronic solution fails. (shrink)

Can victims of the oracle paradox, which is known primarily through its unexpected hanging and surprise examination versions, extricate themselves from their difficulties of reasoning? No. For they do not, contrary to recent opinion, commit errors of fallacious elimination. As I shall argue, the difficulties of reasoning faced by these victims do not originate in the domain of concepts, propositions and their entailment relations; nor do they result from misapprehensions about limitations on what can be known. The difficulties of reasoning (...) flow, instead, from conflicts that arise in the practical dimension of life. The oracle paradox is in this way more evocative of problems faced in the theory of computation than it is like the celebrated Russell’s paradox. (shrink)

This paper is intended to show how epistemologists can profit from the study of ways in which 'know' is vague. Topics include the kk thesis, Incorrigibility of sense data, A resemblance between infinity and vagueness, Common knowledge, Naive holism, Question-Begging, Epistemic universalizability, The prediction paradox, The completability of epistemology, And harman's social knowledge cases.

In this paper I consider the surprise examination paradox from a practical perspective, paying special attention to the communicative role of the teacher’s promise to the students. This perspective, which places the promise within a practice, rather than viewing it in the abstract, imposes constraints on adequate solutions to the paradox. In the light of these constraints, I examine various solutions which have been offered, and suggest two of my own.

The Surprise Exam Paradox continues to perplex and torment despite the many solutions that have been offered. This paper proposes to end the intrigue once and for all by refuting one of the central pillars of the Surprise Exam Paradox, the 'No Friday Argument,' which concludes that an exam given on the last day of the testing period cannot be a surprise. This refutation consists of three arguments, all of which are borrowed from the literature: the 'Unprojectible Announcement Argument,' the (...) 'Wright & Sudbury Argument,' and the 'Epistemic Blindspot Argument.' The reason that the Surprise Exam Paradox has persisted this long is not because any of these arguments is problematic. On the contrary, each of them is correct. The reason that it has persisted so long is because each argument is only part of the solution. The correct solution requires all three of them to be combined together. Once they are, we may see exactly why the No Friday Argument fails and therefore why we have a solution to the Surprise Exam Paradox that should stick. (shrink)

RÉSUMÉ: Les philosophes, au cours des cinquante dernières années, se sont efforcés de démontrer qu’un professeur peut, d’une manière cohérente et exacte, annoncer à ses étudiants qu’un examen surprise aura lieu lors d’une journée non spécifiée d’une période donnée, le problème étant qu’une telle annonce peut sembler s’annuler ellemême lorsqu’elle est soumise à une induction régressive. Deux grandes approches, l’une épistémique et l’autre logique, one été développées à ce propos. Le présent article adopte une approche logique, mais repose aussi d’une (...) manière cruciale sur une compréhension épistémique du problème, pour essayer de montrer que l’annonce du professeur peut effectivement être cohérente et exacte. (shrink)

Roy Sorensen introduced the concept of an epistemic blindspot in the 1980s. A proposition is an epistemic blindspot for some individual at some time if and only if that proposition is consistent but unknowable by that individual at that time. In the first half of this paper, I extend Sorensen work on blindspots by arguing that there exist blindspots that essentially involve hopes. In the second half, I show how such blindspots can contribute to and impair different pursuits of self-understanding. (...) My arguments throughout this paper draw on Luc Bovens’s account of hope. (shrink)

Roy A. Sorensen has advanced an ingenious variation of the prediction or surprise event paradox, which he calls the designated student paradox. Sorensen reduces the temporal dimension of the problem by eliminating reference to future occasions on which an announced surprise event might occur, and substituting a surprise location to which epistemic agents have progressively limited spatial-perceptual access, in order to sidestep what he regards as inessential solutions to the standard formulation.

RÉSUMÉ: Les philosophes, au cours des cinquante dernières années, se sont efforcés de démontrer qu’un professeur peut, d’une manière cohérente et exacte, annoncer à ses étudiants qu’un examen surprise aura lieu lors d’une journée non spécifiée d’une période donnée, le problème étant qu’une telle annonce peut sembler s’annuler ellemême lorsqu’elle est soumise à une induction régressive. Deux grandes approches, l’une épistémique et l’autre logique, one été développées à ce propos. Le présent article adopte une approche logique, mais repose aussi d’une (...) manière cruciale sur une compréhension épistémique du problème, pour essayer de montrer que l’annonce du professeur peut effectivement être cohérente et exacte. (shrink)