Time Limit : sec, Memory Limit : KB
English

Problem C: Nagashi Soumen

Mr. Natsume, the captain of a baseball club, decided to hold a nagashi-soumen party. He first planned to put a flume at the arena, and let members stand by the side of the flume to eat soumen. But they are so weird that they adhere to each special position, and refused to move to the side of the flume. They requested Mr. Natsume to have the flumes go through their special positions. As they never changed their minds easily, Mr. Natsume tried to rearrange flumes in order to fulfill their requests.

As a caretaker of the baseball club, you are to help Mr. Natsume arrange the flumes. Here are the rules on the arrangement:

  • each flume can begin and end at arbitrary points. Also it can be curved at any point in any direction, but cannot have any branches nor merge with another flume;
  • each flume needs to be placed so that its height strictly decreases as it goes, otherwise soumen does not flow;
  • Mr. Natsume cannot make more than K flumes since he has only K machines for water-sliders; and
  • needless to say, flumes must go through all the special positions so that every member can eat soumen.

In addition, to save the cost, you want to arrange flumes so that the total length is as small as possible. What is the minimum total length of all flumes?

Input

Input consists of multiple data sets. Each data set follows the format below:

      N K
      x1 y1 z1
      ...
      xN yN zN

N (1 ≤ N ≤ 100) represents the number of attendants, K (1 ≤ K ≤ 4) represents the number of available flumes, and xi, yi, zi (-100 ≤ xi, yi, zi ≤ 100) represent the i-th attendant’s coordinates. All numbers are integers. The attendants’ coordinates are all different.

A line with two zeros represents the end of input.

Output

For each data set, output in one line the minimum total length of all flumes in Euclidean distance. No absolute error in your answer may exceed 10-9. Output -1 if it is impossible to arrange flumes.

Sample Input

1 1
0 0 0
4 4
0 0 0
1 1 1
2 2 2
3 3 3
3 4
0 0 0
1 1 1
2 2 2
4 1
1 0 1
0 0 0
1 1 0
0 1 -1
5 2
0 0 100
0 0 99
1 0 99
1 0 98
1 0 -100
7 4
71 55 -77
-43 -49 50
73 -22 -89
32 99 -33
64 -22 -25
-76 -1 6
39 4 23
0 0

Output for the Sample Input

0
0
0
-1
200
197.671366737338417