# Discrete Acceleration SOLUTIONS GRAKN FORCES 2020

## Discrete Acceleration SOLUTION

There is a road with length l meters. The start of the road has coordinate 0, the end of the road has coordinate l.
There are two cars, the first standing at the start of the road and the second standing at the end of the road. They will start driving simultaneously. The first car will drive from the start to the end and the second car will drive from the end to the start.
Initially, they will drive with a speed of 1 meter per second. There are n flags at different coordinates a1,a2,…,an. Each time when any of two cars drives through a flag, the speed of that car increases by 1 meter per second.
Find how long will it take for cars to meet (to reach the same coordinate).
Input
The first line contains one integer t (1≤t≤104): the number of test cases.
The first line of each test case contains two integers n, l (1≤n≤105, 1≤l≤109): the number of flags and the length of the road.
The second line contains n integers a1,a2,…,an in the increasing order (1≤a1<a2<…<an<l).
It is guaranteed that the sum of n among all test cases does not exceed 105.
Output
For each test case print a single real number: the time required for cars to meet.
Example
input
5
2 10
1 9
1 10
1
5 7
1 2 3 4 6
2 1000000000
413470354 982876160
9 478
1 10 25 33 239 445 453 468 477
output
3.000000000000000
3.666666666666667
2.047619047619048
329737645.750000000000000
53.700000000000000
Note
• In the first test case cars will meet in the coordinate 5.
• The first car will be in the coordinate 1 in 1 second and after that its speed will increase by 1 and will be equal to 2 meters per second. After 2 more seconds it will be in the coordinate 5. So, it will be in the coordinate 5 in 3 seconds.
• The second car will be in the coordinate 9 in 1 second and after that its speed will increase by 1 and will be equal to 2 meters per second. After 2 more seconds it will be in the coordinate 5. So, it will be in the coordinate 5 in 3 seconds.
• In the second test case after 1 second the first car will be in the coordinate 1 and will have the speed equal to 2 meters per second, the second car will be in the coordinate 9 and will have the speed equal to 1 meter per second. So, they will meet after 9−12+1=83 seconds. So, the answer is equal to 1+83=113.