Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

If a person can move only in east and south direction. What are the total number of paths from initial point (0,0) to final point (2,2) in a 3*3 grid

share|improve this question

4 Answers 4

up vote 6 down vote accepted

You take 4 steps total. Choose exactly 2 of those steps to be eastward.

enter image description here

share|improve this answer
This looks correct to me, so why the 2 (anonymous) down-votes I wonder ? –  Paul R Mar 7 '11 at 17:15
your answer is correct, but I was thinking, that in the beginning person was out of the grid and so answer is binomial(6,3) and I have downvoted you. Now I realize that I was wrong, but I can't undo my downvote unitll you don't edit your post. Please edit something and I will upvote your answer. And sorry :( –  UmmaGumma Mar 7 '11 at 17:30
@Ashot: No worries, thanks :) –  Tom Sirgedas Mar 7 '11 at 17:35

Explanation: We can encode the way by just storing the steps in the downwards-direction. That, is, we encode just the columns we choose to go one step down:

E.g. 0 1 1 3 means, we go as follows:

 0123      = columns 

 v         v = down
 >V        > = right

So, we have n lines (thus n-1 steps downwards) and in each step we can choose among m possibilities (as long as these possibilities are monotonly increasing).

Thus, we can "a priori" choose n-1 column-numbers from the m columns in total, sort them and take them as our way through the grid.

Thus, this experiment corresponds to drawing n-1 elements from a set with m distinct elements, and the order of the elements drawn does not matter (because we just consider them in increasing order). Thus, the total number of possibilities to do this is:

/ n-1+m-1 \
|         |
\   n-1   /

I realized that my first post contained the wrong details but the idea was the same. Have a look at stars and bars too see how the idea works.

share|improve this answer
@phimuemue -1 binomial(3+3-1,3-1)=binomial(5,2)=10, while you can see in my answer, that there is at least 20 different ways. –  UmmaGumma Mar 7 '11 at 17:10
@Ashot: it's a 3x3 grid, not 4x4 - there are only 2 moves east and 2 moves south, hence it's 4C2 = 6 possibilities. –  Paul R Mar 7 '11 at 17:16
@Paul you are right. I solve it for 4*4, but my formula is right, while according this solution for 4*4 we getting 10 different ways(binomial(3+3-1,3-1)=10), while there are 20 ways. –  UmmaGumma Mar 7 '11 at 17:25
@Ashot Martirosyan: Corrected the formula. –  phimuemue Mar 8 '11 at 6:32
@phimuemue Now your formula is right. But why different ways of picking n-1 elements without order from m distinct ones is equal to Binomial(n-1+m-1,n-1) ? IMHO it's not evidently. Please explain how you are getting that formula without using solution of our problem? –  UmmaGumma Mar 8 '11 at 7:26

Depends on how you define your problem. Here are 3 first ways, that pop into my head.

Vector space problem

1) From point A(0, 0) to point B(2, 2) create a vector AB(B_x-A_x, B_y-B_y). This vector exists in affine space and we will introduce custom coordinate axis of "south" and "east" to it. So we get the vector to be `AB = 2 "south" + 2 "east".

To find what are the possible paths: Permutations[{"south", "south", "east", "east"}]

{{"south", "south", "east", "east"}, {"south", "east", "south", "east"}, {"south", "east", "east", "south"}, {"east", "south", "south", "east"}, {"east", "south", "east", "south"}, {"east", "east", "south", "south"}}

To find the length of them: Length[Permutations[{"south", "south", "east", "east"}]]


Algebraic problem

2) Reduce the problem to algebraic form. That is a combinatorial problem, where binomial coefficient 4 choose 2 will give the answer, because you can do 2 different actions total of 4 times.

To calculate: Binomial[4, 2]


Graphing problem

3) make a graph:

enter image description here

Then conclude, there are only 6 ways to do it

share|improve this answer
The algebraic problem can also be visualized as moving in the Pascal's triangle. wolframalpha.com/input/?i=Pascal's+triangle –  Margus Mar 7 '11 at 18:29

We must go 2 times east and 2 times south. No meter in which order. Let's define east as 1 and south as 0. Then question is equal to how many ways we can write string with length 4, which has two 1-s and two 0-s (for example 1100 or 1001 etc...).

It is equal to Binomial(4,2)=6.

Proof: Assuming, that south=0 and east=1 here are all 6 ways:







share|improve this answer
@Paul right, corrected –  UmmaGumma Mar 7 '11 at 17:20

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.