Given below is a words from the English dictionary arranged as a matrix


Tracing the matrix is starting from the top left position and at each step move either RIGHT or DOWN, to reach the bottom right of the matrix. It is assured that any such tracing generates the same word. How many such tracings can be possible for a given word of length m+n-1 written as a matrix of size m * n?

Input Format The first line of input contains an integer T. T test cases follow in each line. Each line contains 2 space separated integers m & n indicating that the matrix written has m rows and each row has n characters.


1 <= T <= 103
1 ≤ m,n ≤ 106

Output Format Print the number of ways (S) the word can be traced as explained in the problem statement. If the number is larger than 10 rest to power 9 +7, print S mod (10 rest to power 9 +7)

Sample Input

2 3

Sample Output


Explanation Let us consider a word AWAY written as the matrix


Here, the word AWAY in the matrix can be traced in 3 different ways, traversing either traversing either RIGHT or DOWN.




closed as unclear what you're asking by Eric Lippert, David Pope, Zach Johnson, Dukeling, Owen Hartnett Jan 18 '14 at 4:51

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  • I understand guys that this question might be a homework, and some people would like to close it for this, but why this question was closed because of being unclear? As the OP says, "Output Format: Print the number of ways (S) the word can be traced". – Jim Blum Jan 18 '14 at 5:07
  • This is from a live programming challenge (hackerrank codesprint 5)... – Ivan Jan 18 '14 at 13:16
  • @Ivan Thanks a lot :). I was just wondering why it was closed as "unclear", instead of something else.. – Jim Blum Jan 19 '14 at 15:45

This is a nice question, and that's the reason I will answer it. However it seems like a homework, or a problem which was taken from a programming olympiad, which is the reason why you got so many downvotes.The answer is that we have (N-1+M-1)!/((N-1)!(M-1)!) different paths for given M and N. For example for the sample input, we have (2-1+3-1)!/((2-1)!(3-1)!) = 3!/(1*2) which is 6/2= 3.

This is because there will be M-1 moves RIGHT and N-1 moves DOWN.

Therefore for your example we can have




So these are just the permutations of M-1 RIGHT and N-1 DOWN. As simple as that.

Thats the simplified (reading from file etc, were removed) algorithm

long getResult(int N, int M){
return Math.Factorial(N +M -2)/(Math.Factorial(N-1)*Math.Factorial(M-1));

Hope it helps

  • 1
    Really thanks a lot .. i figured it out :) – user3208840 Jan 18 '14 at 5:20
  • How would this ever work for extremely large input (where say m,n are even in the 100+ scale) – Matt Stokes Jan 18 '14 at 5:59
  • @user3208840 Glad it helped you :) – Jim Blum Jan 19 '14 at 1:12
  • Factorials can be estimated using Stirling's approximation which I guess would make things a bit more speedier. Dunno about accuracy though :) – c0dem4gnetic Jan 19 '14 at 7:53
  • 1
    Yes, I have seen that.But the above accepted solution is just a formula but I wrote algorithm. I will find the ways to optimize it. I think its a dynamic programming problem. – Master Jan 20 '14 at 5:49

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