100 stations are given . Distance between the adjacent stations are not equal. You are given 10 flags which you have to place amongst these stations. 1st flag is on the 1st station and the last flag is on the last station. Now put the remaining flags such that the total adjacent distance between the the two flags is minimum.

My approach is this:

Consider this question for 10 stations and 4 flags
Let the distance between them be as
**1-----2--3---4----5-----6------7-------8-9---10**

Where – represents the distance in units It means distance between 1st and 2nd station is 5, And hence the distance between the first and tenth station will be (5+2+3+4+5+6+7+1+3) = 36

We apply binary search between 1st and 10th station hence we get 36/2 = 18

Hence we will choose the pivot as 18 unit of distance and apply binary search from

(i) 1st and 18th unit of distance for 1st flag

(ii) 19th and 36th unit of distance for 2nd flag

Average of distance is 9 for 1st flag which is more closer to 4th station we place flag on station 4.

Average of distance is 9 and hence distance from starting is 27 which is more closer to 7th station Hence we place 2nd flag on station 7.

Hence answer will be
**1**-----2--3---**4**----5-----6------**7**-------8-9---**10**
Hence maximum distance is optimized as b/w any two stations is 15 in this case
Similarly we can solve for 100 stations

Please check whether this approach is correct or there can be any more efficient. Correct me if i am wrong Thanks in advance