1 (a and b) Not to speak of. The key difference is that the event of finding your keys is quite different from that of (say) getting a significant result in a medical trial. When I have what looks to me exactly like my key ring in my hand, with all the usual things on it, the possible failure modes (hallucination, someone having maliciously planted a near-duplicate in my house, ...) are both rarer and weirder than when I have just found that 240 of the 400 patients in the treatment group got better, versus only 215 of the 400 in the control group. In the latter case there's a 1% chance (or whatever) of getting the result merely by chance, and if the experiment is poorly designed in other ways there are plenty of other demonstrably-high-probability ways to get misleadingly good-looking results.

All those methodological "errors" might reduce the odds that I've really found my keys by, let's generously say, a factor of 100. But once I have (as it seems to me) the keys in my hand, unless I'm knowingly impaired by drink or drugs or something, that's probably at least 1000000:1 evidence that I've found them. So even a 100:1 discount, which would kill most published experimental findings, would leave me something like 99.99% confident of actually having my keys.

Other relevant differences, more relevant to (b) than to (a) and perhaps also relevant to whatever point you're trying to make: once I've got my keys I will then try to use them and thereby rapidly get more evidence for (or, improbably, against) the correctness of my experimental result; the consequences of an error are rather minor compared with (e.g.) those of thinking a treatment cures cancer when it really doesn't; bringing in some impartial other person to replicate my search is a bigger increment of relative effort than arranging a replication of a typical scientific experiment.

2 (a) Yes. A typical prize with that sort of probability might be on the order of $10M, for an expected benefit of 10c from checking the ticket. It takes only a few seconds to check. (b) First I would double-check it, because the single highest-probability way to be wrong is self-deception. There are other hypotheses but empirically they seem to be improbable: e.g., I would expect a non-negligible fraction of cases in which someone is convincingly hoaxed into thinking that they have a majorly-winning lottery ticket to get publicized (because it seems like it makes quite a good story). So I might be, I dunno, 80% confident of having actually won at this point, which is plenty enough to justify attempting to claim. Note that the relevant probability to compare against is not "someone carried out a successful lottery hoax" (or whatever) but "someone carried out a successful lottery hoax on this occasion with me as target", which is much lower in the same way as the probability of "I just won the lottery" is lower than that of "someone won a lottery once". (c) I think I would define "really did win the lottery" so that once I've had my claim checked and been paid there's no further question (barring extreme options like having hallucinated the whole thing). Until that point I would still entertain the possibility that some kind of hoax or error is at work, though after getting confirmation from the organizers I don't think this would make a big difference to my actions beyond encouraging me to check the subsequent steps in the process.

( I know you said you want numerical answers to everything, with good justification for them all, but you haven't provided any reason why I should actually put in the effort to do that and I have chosen not to.)

I think I might summarize the lesson here (at least from part 1) as "strong enough evidence covereth a multitude of sins", but I'd like to hear the poster's thoughts as to what the lesson is meant to be.

2a) Yes, because lottery tickets have a large number of smaller prizes, and there's a non-trivial chance I won one of those.

b) Aside from natural human disbelief, fairly high. The only alternative hypotheses that come to mind(assuming it's a reputable lottery and I'm sure I'm on the right site) are that they mis-posted the numbers, but there's no good reason to believe they'd have picked mine there, and their posting error rate can be estimated at perhaps 0.1%, so I'd be 99.9% confident if that's the only alternative. Some sort of smartass scam is possible, but really unlikely. (I'd double-check the dates, of course)

c) Ticket verification, again assuming it's a reputable lottery. Money in the bank if it's a fly-by-night operation.

1.

(a) No, they should not modify anyone's confidence that you have found your keys. The procedure for determining whether you are holding your keys is sufficiently reliable that there is no need to doubt its results. What the factors mentioned should affect is your (and others') confidence in the efficacy of the procedure you used to find them. If you made 100 attempts to find your keys and 1 succeeded, this is weak evidence at best that the attempt that happened to succeed had a good a priori reason to.

(b) No.

Follow-up question:

1) You've flipped a (fair) coin 100 times and recorded the results. The odds of you having gotten that exact sequence is 1 in 2^100, or about one in 10^30. Things that improbable just don't happen, so if you tell me your sequence, why should I believe you?

2.

(a) Assuming you are perfectly rational and that money has logarithmic VNM utility, checking the lottery ticket is not worth the time spent. However, System 1 doesn't understand very low probabilities, so it will probably distract you by wondering whether you won. Given bounded rationality, it's probably worthwhile to check just to make the distraction go away.

(b) There is a ~1 in 1000 chance that I would read the numbers wrong. If misreading the numbers and actually having won are the only possibilities, there is about a 1 in 100k chance that I've won. Depending on the specific circumstances of how I came to posses the ticket and how legitimate it and the website look, I would also entertain the possibility that it's a scam or a prank.

(c) I would expect banks to be pretty careful about confirming large deposits, so I would be pretty confident that I had won (p > 0.5) when the deposit was confirmed. A few weeks later if the bank had not reported any issues with the deposit, I would be very confident (p > 0.99) that I had won.

The prior improbability of this whole scenario would cause me to update in favor of the simulation hypothesis, because a simulator would probably have a greater propensity to simulate people receiving large windfalls than a natural world is to generate them.

I consider the hypothesis "I am living in a simulation where I just won an extremely large amount of money" to be a subset of "I just won an extremely large amount of money".

1: I submit that I merely tested one hypothesis--that the keys were in my house--and sampled with replacement. While non-optimal, the use of a probabilistic search algorithm has precedent, e.g. in paleontology and astronomy.

(a) No less confidence than one would have in the theory of evolution. The manner of finding support among the fossil record consists of excavating likely locations, and in a like manner I have performed a search of the likely location for my keys, being my domicile, and proceeded until all locations were exhausted.

(b) The uncertainty of my keys being in my pocket is no greater than the uncertainty in the door being locked (as my door only has a sliding bolt that requires a key to operate). If the probability of my keys not being in my pocket is a (being less than or equal to the probability of the door failing to lock), then the probability of failing to open the door is a(1-a) = a - a^2. This reaches its maximum value at a = 1/2, which still leaves me with a 3/4 chance of entering my house.

2: (a) Naturally. As my Internet use generally has a negative value, anything with a positive expectation can only be a benefit.

(b) We wish to compute the probability of winning given the event that I observed the winning numbers on the lottery website. Suppose, then, that a given observation of the winning lottery numbers has a 95% chance of being correct. This can be found by a trivial application of Bayes' theorem, obtaining 19 in 1,000,000, which is roughly one part in 50 thousand. The question, then, becomes: how many independent observations would it take for the expected probability of winning make it worth submitting a claim to the lottery office? I leave this as an exercise.

Alternative hypotheses include: misreading the page, looking at the wrong drawings, erroneous information on the page, and pranks by some rogue.

(c) Once I'm able to spend the money, I expect to be far too intoxicated to ponder the metaphysics of the matter.

(a) Should these considerations modify your confidence or anyone else's that you have in fact found your keys? If not, why not, and if so, what correction is required?

a) Yes - these considerations should have an impact on your confidence. However, this being a evolutionary familiar scenario, your intuition has already made the necessary adjustment such as correcting for multiple comparisons and all the other hyper-complex issues, so don't whip out a pencil and "correct" yourself..

b) Yes.It is not always negligible. For example, if you were searching an entire apartment complex with identical doors for your keys and you found one in the hall you'd check the key against the lock first to see if it were yours before locking yourself out. Or, you might ask your roommate if they had their keys, to ensure you didn't accidentally steal it. The considerations can alter your certainty.

Once the lottery results are out, do you check your ticket? Why, or why not?

a) I am weighing opportunity cost against potential winnings and you did not say how much the prize was or where I got the ticket from or what the URL was and if I recognized the domain name. (In practice, I don't actually check the bottle cap codes on soda or follow up on coupons making similar offers.)

b) My intuition is automatically factoring in estimates for pranks, scams, matched tickets made in error which were not honored, and so on. If a smarmy guy in a suit standing around handing out URLs promising money, or if cameras are hiding in the bushes...

c) See (b)....What's the lesson here? I don't think I got it. Mine would be "we automatically do all this stuff in non-abstract scenarios".

I like this post but am a little curious why you posed this as an imaginary statistics exam... perhaps because I am in the midst of preparing some non-imaginary exam questions related to making inferences from data at the moment. Pushing the exam theme a little further, I am curious about how you might evaluate the answers, were this a non-imaginary exam.

(a) Should these considerations modify your confidence or anyone else's that you have in fact found your keys? If not, why not, and if so, what correction is required?

No, the evidence that the keys were found is strong enough to outweigh the problems in the searching method.

(b) Should these considerations affect your subsequent decisions (e.g. to go out, locking the door behind you)?

No.

(a) Once the lottery results are out, do you check your ticket? Why, or why not?

Personally, I'd probably check it for fun. It would take less than a minute, and provides enough amusement to be worth the time. I could easily see myself not checking if I forgot, though.

(b) Suppose that you do, and it appears that you have won a very large sum of money. But you remember that the prior chance of this happening was 1 in 100 million. How confident are you at this point that you have won? What alternative hypotheses are also raised to your attention by the experience of observing the coincidence of the numbers on your ticket and the numbers on the lottery web site?

Very confident, let's say >99.9%.

No other hypotheses are raised to my attention. You could ask for hypotheses conditioning on me not really winning, but none of those are likely enough to outweigh the 1/100 million chance of actually winning.

Perhaps I'd check the numbers a few other times, using proxies to rule out the "hacked" hypotheses, but that's only because that's easy to check, not because I would take it seriously.

(c) Suppose that you go through the steps of contacting the lottery organisers to make a claim, having them verify the ticket, collecting the prize, seeing your own bank confirm the deposit, and using the money in whatever way you think best. At what point, if any, do you become confident that you really did win the lottery? If never, what alternative hypotheses are you still seriously entertaining, to the extent of acting differently on account of them?

The point I become confident is after I check the numbers.

Edit: after reading devas's comment: I had assumed that the lottery ticket was state-run and well-known. If not, I would be a lot less confident (in fact, I've already won dozens of these lotteries by virtue of having an email account! Aren't those people who randomly choose email accounts to win money so nice?)

2) a) I check the ticket, assuming I have nothing better to do and that I remember it. To be more precise, if there is a family emergency and I have to drive to the hospital for whatever reason, I will not go out of my way to jury-rig an internet connection and I won't look for the ticket before going out. I check the ticket because even a one in a million chance of free money is still free money. b)I am not very confident; I'm not sure, but a grossly inaccurate measure of how confident I would be is that I'd think there is a 1/10 chance of me having won. Other alternative hypotheses are the lottery site being a phishing trap, the site being nothing more than advertisement, additional requirements which would make the collection of the prize impossible (you need the lottery ticket, the receipt, it must be collected yesterday and it can only be deposited in the Monte dei Paschi di Siena). c)Between collecting the prize and seeing the bank confirm the deposit, depending on what other additional information I've seen (skeeviness of the lottery operators, state of the office where I collected the prize, and so on).