Description: Consider a house plan. Let the house be represented by an infinite horizontal strip defined by the inequality - h ≤ y ≤ h. Strictly outside the house there are two light sources at the points (0, f) and (0, - f). Windows are located in the walls, the windows are represented by segments on the lines y = h and y = - h. Also, the windows are arranged symmetrically about the line y = 0. Your task is to find the area of the floor at the home, which will be lighted by the sources of light. Input Format: The first line of the input file contains three integers n, h and f (1 ≤ n ≤ 500, 1 ≤ h ≤ 10, h < f ≤ 1000). Next, n lines contain two integers each li, ri ( - 5000 ≤ li < ri ≤ 5000), each entry indicates two segments. Endpoints of the first segment are (li, h)-(ri, h), and endpoints of the second segment are (li, - h)-(ri, - h). These segments describe location of windows. Numbers in the lines are space-separated. It is guaranteed that no two distinct segments have common points. Output Format: Print the single real number — the area of the illuminated part of the floor with an absolute or relative error of no more than 10 - 4. Note: The second sample test is shown on the figure. Green area is the desired area of the illuminated part of the floor. Violet segments indicate windows.