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Given a grid find how many points a robot can navigate given if it can explore a point where sum of digits of both X,Y(co-ordinates) is smaller than K.

One obvious solution is O(n^2).(Looping through the 2D matrix and accepting/ignoring a point based on the condition) Other is take 0 to K-1 elements in an array , then find 2 elements such that there sum is less then K. involves O(k) space and O(k) time.

Can anyone suggest some better approach, improving upon anything in terms of space time . I am looking for a better answer.

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I don't understand what you want. You want to know which points in the grid have x+y < K? – alestanis Oct 28 '12 at 13:06
x,y are row,column in matrix yes i want to know how manu such points are there in the matrix whose sum of row+column is less then k – Peter Oct 28 '12 at 13:44
up vote 5 down vote accepted

The equation x+y = K defines a diagonal in your grid, from a point in the northwest to a point in the southeast.

x+y=K graph

If the points in your grid are all integral values of x and y, and K is an integer too, then the number of points south of the diagonal (x+y < K) will be K(K-1)/2.

The number of points in the grid including the diagonal (x+y <= K) will be K(K+1)/2.

Obviously, this is computed in constant time O(1).

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Suppose my matrix is of size 3 x 4 , K =6 , X and y basically represents the row,column , can you now throw a liitle light on your solution – Peter Oct 28 '12 at 13:42
The thing is you have to split your problem into square parts and triangle parts. You can sum the number of elements in a triangle part with the equations in my answer, and the number of elements in a m x n square (or rectangle) part is mn. – alestanis Oct 28 '12 at 14:04
In 3x4, the line x+y=6 touches your rectangle's bounds for x=3, y=6/3=2 and y=4 x=6/4=1.5. You have to exclude the points in the upper right triangle, which are 3. If you make drawings of the different possible cases, you will find all pertinent equations. – alestanis Oct 28 '12 at 14:08
The formula K(K+1)/2 is the sum of values 1+2+3+4+...+K. – alestanis Oct 28 '12 at 14:10
for a square with side length k area is kk. half the area (or half the grid points) is kk/2. but to exclude the diagonal elements of which there are k many we subtract k/2 since half the area of the square contains half the diagonal parts. k*k/2 - k/2 = K(K-1)/2 note u can change to plus to include the diagonal and similarly modify for a rectangle – robert king Oct 28 '12 at 19:23

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