maraca

almost, i will update the answer

only thing missing is the variable for the timestamp, which needs to be updated after before adding it to the next file.

Yes you're right, I thought you add the timestamp on file creation.

@user1950349 edited answer to work with header (timestamp + newline)

You need to add the size for the timestamp and newline to the check, otherwise no changes. If the format is always the same (e.g. yyyy.mm.dd hh:mm:ss), then it is just a constant. If not (e.g. because leading 0s are ommitted) then it can become a little tricky unless you just take the longest possible timestamp string as constant. (size + ts + nl + timestampsize + nl > 60000) or maybe more readable (size + ts + nl > 60000 - timestampsize - nl)

Yes it isn't needed any more. We add the task and newline to size each time. The stringbuilder size should be the same as the cumulated size for the tasks (because we use int and no compression is happening).

@Koray edit 7 is quite impressive, I did some tests and incorporated your ideas into my algorithm to get the ultimate hybrid between the two! (Edited my answer).

@PravinDeshmukh I cannot imagine imagine that your recursive function (backtracking?) is performing very good, just because the problem of finding out if that number can be built has at least the complexity of all the dp solutions O(a*d). So if you are checking that you do the same work at least twice. Also for gcd > 1 you go way further than you have to. I highly recommend to call the rounding function directly without any checks before.

*top of stack, not end. I think it should only make a (potentially big) difference if the amount can be built, otherwise it should be the same.

@Koray changing queue to stack improves the times because of the order in which the numbers are tested (you will first generate all multiples of dMax + all the other denominators, so you will advance in steps of dMax until the number becomes bigger than amount, then you will take dMax one less time + the 2nd highest denominations (now on top of stack) and add all denominations to it... because you add to end of stack if you find something new it gets really complicated to follow, but you are going back and forth again (in terms of amount of current valid number) until the stack is empty.

@Koray I added the code, you can copy the main method and call your rounding function and see what time you get. Of course it's on different machine and different language, but as a rough estimation. I would try with REPEAT = 1, 5, 10, 20, 50 first, before going up to 100, you might be waiting too long although I kept a below one million to prevent that.

@Koray ok I will try, I forgot rounding direction {up, down} so double the test cases.

@Koray we are looking for the smallest number >= amount which we know can be achieved, everything above that can be discarded. So if we round the amont by the smallest denomination upwards we get an achievable number, which is <= amount + dMin - 1, so a much smaller array has to be constructed than when using amount + dMax * 2 + 1. Of course my algorithm will not always be faster, but in general... (still +1).

I am slightly disappointed. You didn't even incorporate the improvements mentioned in the comments. amount + denomsMax * 2 + 1 is a really really bad upper bound. (amount + dLow - 1) / dLow * dLow + 1 is so much better. Also no early exit possible, like my algo does with the modulo. My algorithm would outperform this one easily. @PravinDeshmukh

@JuniverHazoic The size needed when rounding down is amount + 1 and when rounding up it is more difficult. If you have a denominator d > amount then d + 1 is enough (but following bound is maybe better), otherwise you can estimate it by the lowest denomination (amount + dLow - 1) / dLow * dLow + 1) (rounding amount up by lowest denomination).

@JuniverHazoic Yes you are right, the algorithm never returns 0, it fails when the amount is smaller than the smallest denomination and you are rounding down. The simplest fix for that is to initialize retval with 0 (always).

I am thinking that forward is better when there are a lot of gaps or even for rounding down in general. While the backwards standard approach is probably better for rounding up because we know the first number found >= amount is the best, not with the forward approach.

Edit3 is more or less the same as the other dp approaches but in a forward style. Instead of looking if a number can be built by using any number in the set and a valid denomination, you look for the numbers that can be built and add all denominations to mark the next buildable numbers. Complexity doesn't change, but I'm still unsure about the general impact (backwards can skip potentially a lot of denoms when there are a lot of hits, forward can skip numbers that cannot be built entirely but builds the same number several times potentially even though only added once it has to be checked).

Can't you use a HashSet where you put the values in, reject duplicates and finish when the size is 5000? In other words: do you really need to know the number?

@Nick going from door to door: "may I tell you something about javascript?"

@Undo josilber, Undo, Vinod

start the countdown

Hi

Yes true, I just think it's not 100% fair, because voters doing it like that have a bigger impact on the outcome (yes it is still small, no real problem).

Don't you think the primary system is kind of flawed? If I only use upvotes I can just vote the people I like, but if I know then downvote everyone else I basically gave them 2 votes.

hi

good luck, it would be nice to have a link to the meta post explaining how many votes you have in this phase, never mind, found it ;-)

!!/weather ouagadougou

> comment

@test hello

a*bc

a*bc

it is a remove and an insert if you will

wait a minute, just looking at it the wrong way...

then you assign y = x.next

(need to handle special case if oldX == null)

reduced the problem to swap x=>x.next=>Z

update oldX, so we don't have to care about it any more: oldX.next = x.next

start: oldX => x => x.next => Z (whatever)

it is so damn complicated, would draw it on paper

are you there?

update pointers of x and y: x.next = y; ... I think I still made a mistake, you have to update the pointers in the right order...

update oldX: oldX.next = x;

swap nodes: t = x; x = y; y = t;

then we could assign x.next = x and x = oldX to swap nodes

@csh1579 it is true that x.next.next can be null, but that doesn't concern you when swapping x with x.next, because the last node's next points to null right?

@csh1579 exactly what I thought too first, but usually the check would be x != null, because it will be checked after x = x.next and therefore it is correct like that for bubble sort. oldX == null is the only special case.

@csh1579 yes you are right. I edited my code now, first had a mistake in the for.