#P48H. Black and White

    ID: 2010 Type: RemoteJudge 2000ms 256MiB Tried: 0 Accepted: 0 Difficulty: (None) Uploaded By: Tags>constructive algorithms*2800

Black and White

No submission language available for this problem.

Description

According to the legends the king of Berland Berl I was noted for his love of beauty and order. One day he ordered to tile the palace hall's floor where balls and receptions used to take place with black and white tiles according to a regular geometrical pattern invented by him. However, as is after the case, due to low financing there were only a black and b white tiles delivered to the palace. The other c tiles were black and white (see the picture).

The initial plan failed! Having learned of that, the king gave a new command: tile the floor with the available tiles so that no black side of a tile touched a white one. The tiles are squares of one size 1 × 1, every black and white tile can be rotated in one of the four ways.

The court programmer was given the task to work out the plan of tiling and he coped with the task and didn't suffer the consequences of disobedience. And can you cope with it?

The first line contains given integers n and m (1 ≤ n, m ≤ 100) which represent the sizes of the rectangle that needs to be tiled. The next line contains non-negative numbers a, b and c, a + b + c = nm, c ≥ m.

Print 2n lines containing 2m characters each — the tiling scheme. Every tile is represented by a square 2 × 2 in the following manner (the order corresponds to the order of the picture above):

If multiple solutions exist, output any.

Input

The first line contains given integers n and m (1 ≤ n, m ≤ 100) which represent the sizes of the rectangle that needs to be tiled. The next line contains non-negative numbers a, b and c, a + b + c = nm, c ≥ m.

Output

Print 2n lines containing 2m characters each — the tiling scheme. Every tile is represented by a square 2 × 2 in the following manner (the order corresponds to the order of the picture above):

If multiple solutions exist, output any.

Samples

2 2
0 0 4

<span class="tex-span">\</span>../
#<span class="tex-span">\</span>/#
<span class="tex-span">\</span>##/
.<span class="tex-span">\</span>/.

2 3
1 2 3

###/<span class="tex-span">\</span>#
##/..<span class="tex-span">\</span>
#/....
/.....