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I. Intervals of Monotonicity

Time limit: 1.0 second
Memory limit: 64 MB
It’s well known that a domain of any continuous function may be divided into intervals where the function would increase monotonically or decrease monotonically. A number of intervals of such a partition we will call a complexity of the partition. A complexity of a continuous function is the minimal possible complexity of partition in the domain into the monotonicity intervals.
The notion of complexity may be defined not only for continuous functions. In particular, it is applicable to the functions specified on a grid.

Input

The input contains a description of a function F, specified on a grid. The first line contains two numbers A and B — the first and the last point of the integer grid with step 1 (0 ≤ A < B ≤ 100 000). The second line contains the values table of the function F. The table consists of the integers F(A), F(A+1), …, F(B) separated with a space and/or linefeeds. All the values of the function F are in diapason from –100 000 to 100 000.

Output

Output the only number — the complexity of the function F.

Sample

inputoutput
1 10
1 2 3 4 2 1 -1 3 6 7
3
Problem Author: Alexander Klepinin
Problem Source: USU Championship 2004
To submit the solution for this problem go to the Problem set: 1346. Intervals of Monotonicity