# Find minimum possible height of the highest tower

I have towers with height H = h1,h2,h3... and i have a cutting machine that only cuts each tower with a specific length A = a1,a2,a3.. and i have m cuts find the minimum possible height of the highest tower.

for ex- H = 1, 4, 9, 16, 25 and A = 1,2,3,4,5

m = 3 ( only 3 cuts )

the minimum possible height is 15 as after cuts the array looks like H = 1,4,9,12,15 ( after applying 0, 0 , 0, 1, 2 cuts respectively on towers)

What I tried : I recognised it as greedy problem (correct me if i am wrong) and i tried to sort the H array and with a simple approach tried to cut down first the maximum height till it no longer remains maximum and then found the new maximum and again applied the same steps, it's correct but it's too naive and taking huge amount of time for large values?

Time taking steps : finding maximum element each time O(N) and sorting is also not an option (every time).

Constraints for `n` are upto 10^5 and `m` are around 10^18.

Is there any better approach? Guide me!!

• Why couldn't we have applied a cut of 5 on 16 as well to get the resulting array as 1, 4, 9, 11, 15? I know the answer would still remain the same but just clarifying my understanding of the question. Also, can you include all the constraints on H, A and M in terms of their length and their maximum value? – Nilesh Oct 6 '18 at 10:45
• bcs we can only cut according to array A – dude Oct 6 '18 at 11:38

## 1 Answer

Questions of the form `minimum .. of the maximum ..` are generally approachable by the idea of a binary search. We can formulate an O(N*log(M)) solution for the given question by applying a binary search over the metric to optimize that is, `minimum possible height of the highest tower`. Sharing a pseudocode for the same:

``````start = 0, end = 10^18
while start < end:
cuts_used = 0 // Number of cuts used till now
mid = (start + end) / 2
// Let's see if its possible to trim down all the towers such
// that height of each tower <= mid
for i in range(0,N):
if H[i] > mid:
// Calculate the number of cuts required to bring H[i]<= mid
cuts_required = ceil(1.0 * (H[i] - mid) / A[i])
cuts_used += cuts_required
// After iterating over the towers
if cuts_used > M:
// We're exceeding the number of cuts, hence increase the tower height
start = mid + 1
else:
// We still have some more cuts left, so let's cut more
end = mid - 1

return start
``````

`start` should be our optimal answer, since our condition is defined as `while start < end`. Consider the case wherein our range is, start = 1 and end = 2. The mid for the given case is [(1 + 2)/2] = 1.

• Now If `1` is indeed our optimal answer, then cuts_used when mid = 1 will be <= M and hence our alogirthm will move end to mid - 1 that is, 0. Hence the range will be start = 1, end = 0 and we'll stop looping. Clearly `start` will be our solution.

• Now for the other case when `2` is the solution, cuts_used for mid = 1 will be > M and hence our algorithm will move start to mid + 1 and the range will become start = 2 and end = 2 - causing us to stop looping.

In either of the cases, it's visible that `start` should be our optimal solution.

Also, please note for computing `ceil((H[i] - mid) / A[i])`, we must not carry out an integer division since we'll lose the floating point and hence ceil will not work as intended. Therefore, `ceil(1.0 * (H[i] - mid) / A[i])` should be considered to typecast the result to float for the input for ceil.

• I like this approach, very nice. You can make this faster for small problems by initializing `end` with the maximum tower height. – Nico Schertler Oct 6 '18 at 14:04
• @NicoSchertler Thanks! Feel really honored to be appreciated by someone as elite as you, and yep you're right, `end` should ideally be initialized with the maximum tower height. – Nilesh Oct 6 '18 at 17:24
• @nellex what is start giving me here and one more thing if (H[i]>mid) in loop it should be either ceil(abs(mid-H[i])/A[i]) otherwise cuts_used will always be negative and only else condition will work? and please explain what will be the answer as start won't be the answer i suppose?( bcs for the above example it showing the min possible maximum height as 11) and thanks I understand a lot more – dude Oct 6 '18 at 21:07
• @dude My bad, I wrote it incorrectly in a hurry. It ideally should be `(H[i] - mid)`. I've updated my answer to reflect upon the same and your query about `start`. Please ensure that you are providing float as an input to the ceil function and not simply carrying out integer division. – Nilesh Oct 6 '18 at 22:00
• @nellex just one last correction either it should be end=mid or start<=end and your algo is superb thanks for your help! – dude Oct 7 '18 at 5:45