Problem Description

We are going to cover a wall (whose area is r*c) with m different kinds of oil paint ( that is also m kinds of colors ). In order to simplify the problem, we will regard the wall as a set of r*c small squares. The area of one small square is 1 and a small square could be expressed as (x , y) (1<=x<=r, 1<=y<=c).
So every time when we are painting some selected area, we are covering the small squares in that area with a particular color.
Your task is to calculate the number of colors which are completely covered after m times of painting.
For example, given a rectangular area of a upper left corner (x1, y1) and a lower right corner (x2, y2)

Input

Multiple test cases, end with EOF.
In every test case:
In the first line, there will be 3 integers: r c m. r and c are the length and width of the wall , and m is the number of colors of the oil paint. Each type of the oil paints has its own different color.
Then there will be m lines followed, and the ith line has 4 integers: x1 y1 x2 y2, which means that we will cover the rectangular area of a upper left corner (x1, y1) and a lower right corner (x2, y2) with the ith color.

Output

One number, how many colors are completely covered after all the m rectangular areas are painted .

3 3 3
1 1 2 2
1 3 3 3
1 1 3 3

2