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 downwardsdirection. That, is, we encode just the columns we choose to go one step down: E.g.
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 problem1) From point A(0, 0) to point B(2, 2) create a vector AB(B_xA_x, B_yB_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:
Algebraic problem2) Reduce the problem to algebraic form. That is a combinatorial problem, where binomial coefficient To calculate: Binomial[4, 2]
Graphing problem3) 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 1s and two 0s (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:


