Conversion of a binary matrix(256*256) into another matrix which is decimal(85*85)?
Asked by Raj Gopal on 6 Dec 2012
Latest activity Commented on by Walter Roberson on 8 Dec 2012
We have a 256*256 binary matrix , from this we take 3*3 matrix which keeps on increasing firstly row wise upto the end point and then 3 units column wise and then upto the end point , this process continues upto the last pixel . now in the 3*3 matrix we start from (1,1) and move clockwise untill we reach (2,1) storing all the values in an array and converting this binary string into decimal value and storing it into a different matrix.
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1 Answer
Answer by Matt J on 6 Dec 2012
Edited by Matt J on 6 Dec 2012
Assuming the binary matrix is 255x255, you could do it the following way, where I use MAT2TILES from the File Exchange.
A=rand(255)>.5; %fake binary input image
C=mat2tiles(char(A+'0'),[3,3]);
idx=[1 4 7 8 9 6 3 2];
B=cellfun(@(c)c(idx),C,'uni',0);
B=bin2dec(vertcat(B{:}));
result=reshape(B,size(C));
2 Comments
Raj Gopal on 8 Dec 2012
first of all i am using 2 for loops to select the 3*3 matrix and then i'm not getting any idea how to save the converted decimal value into another matrix.
Matt J on 8 Dec 2012
I'm not sure how that's relevant to the solution I gave you, or why it's even an issue. The solution I gave you performs all steps, including saving the result to another matrix.
Also, since you know how to create matrices, (e.g. the 256x256 matrix you have now) and to pull data out of them (e.g. 3x3 blocks), it's not clear what difficulty you're having putting data back into one.
3 Comments
Direct link to this comment:
http://mathworks.com/matlabcentral/answers/55926#comment_115729
This can't end up being 85x85 unless the 3x3 blocks are supposed to be non-overlapping tiles, and in that case, a 256x256 matrix can't be split evenly into tiles of size 3x3. How do you want to resolve the fact that 256 is not an even multiple of 3?
Direct link to this comment:
http://mathworks.com/matlabcentral/answers/55926#comment_116043
they are non overlapping tiles,and index is from 1 to 256 so there are 255 blocks which is divisible by 3.
Direct link to this comment:
http://mathworks.com/matlabcentral/answers/55926#comment_116077
1-3, 4-6, 7-9, 10-12, 13-15, 16-18, 19-21, 22-24, 25-27, 28-30, 31-33, 34-36, 37-39, 40-42, 43-45, 46-48, 49-51, 52-54, 55-57, 58-60, 61-63, 64-66, 67-69, 70-72, 73-75, 76-78, 79-81, 82-84, 85-87, 88-90, 91-93, 94-96, 97-99, [....] 238-240, 241-243, 244-246, 247-249, 250-252, 253-255, 256 - ????