if a given matrix a = [1 2 3;4 5 6]; so answer is going to be [1 3;4 6]
Sans test cases with rank 11 (or even 3), it's too easy to provide a solution which passes the test but fails for, say, dyadics. Or did the originator really mean to stick with tensors (rank 2) of arbitrary x and y dimension?
So many choices
Project Euler: Problem 7, Nth prime
Find the logic
Returning a "greater than" vector
For a given linear index as input for n sized square matrix, find corresponding row and column.
Can you reshape the matrix?
Print the date for a given number using Indian calendar reference
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