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6 \(s / 256\) \(MB / 130\) points
Little Alan was bored so he asked Goran to give him an interesting problem. Since he's busy with
preparing for exams, Goran could only recall one huge bipartite graph from his old days as a
programming competitor. He gave the graph to Alan and said: You have \(to\) colour the edges \(of\) this
bipartite graph using \(as\) few colours \(as\) possible \(in\) such \(a\) way that there are \(no\) two edges \(of\) the
same colour sharing a node.
Alan excitedly ran to his room, took out his movable re\(ad/wr\)ite device for its tape and start to work on
the problem. However, he soon realized that he's missing something so he got back to Goran and
said: Give \(me\) an infinite tape and I will solve your problem! Goran gave him a significant look: Infinite
tape? If you continue to theorize about everything, there won't be a single thing named after you.
After seeing Alan starting to tear up, Goran decided to show mercy: I will make it a bit easier for you.
Let \(C\) \(be\) the smallest number of colours needed to paint the graph in the described way. I will let you
use at most X colours, where X is the lowest power of 2 not less than C.
Help Alan solve the problem.
Note : A bipartite graph is a graph whose nodes can be divided in two sets (or sides) in such a way
that each edge of graph connects one node from the first set with one node from the second set.
In test cases worth 20% of total points, it will hold that L, R ≤ 100.
In test cases worth additional 20% of total points, it will hold that L, R ≤ 5 000.
6 \(s / 256\) \(MB / 130\) points
The first line contains three positive integers: \(L\) , \(R\) and \(M\) (1 ≤ L, \(R \le 100\,000\), \(1 \le M \le 500\,000\)),
representing the number of nodes in one side of the bipartite graph, number of nodes in the other
side of the bipartite graph and the number of edges, in that order.
\(M\) lines follow, each containing two positive integers \(a\) {i} (1 ≤ \(a\) ≤ \(L\) ) and \(b\) {i} (1 ≤ \(b\) ≤ \(R\) ) which represent
an edge between \(a\) {i}{ }-th node from the first side and \(b\) {i}{ }-th node from the second side of the bipartite
graph. All pairs ( \(a\) {i}{ }, \(b\) {i}{ }) will be unique.
In the first line output a single positive integer \(K\) , the number of colours used.
In the next \(M\) lines output a single positive integer \(c\) {i}{ } (1 ≤ \(c\) {i}{ } ≤ \(K\) ), label of the colour of the \(i-th\) edge.
3 3 5
1 1
1 2
2 2
2 3
3 3
2 4 4
1 1
1 2
1 3
2 4output
2
1
2
1
2
1
4
1
2
3
4Clarification of the second sample test:
Minimal number of colours is equal to 3. However, using 4 colours is also acceptable because that’s the lowest
power of 2 which is not less than 3.
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