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
You take 4 steps total. Choose exactly 2 of those steps to be eastward.
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:
So, we have
Thus, we can "a priori" choose
Thus, this experiment corresponds to drawing
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.
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:
To find the length of them:
2) Reduce the problem to algebraic form. That is a combinatorial problem, where binomial coefficient
To calculate: Binomial[4, 2]
3) make a graph:
Then conclude, there are only 6 ways to do it
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: