in = magic(5)
17 24 1 8 15
23 5 7 14 16
4 6 13 20 22
10 12 19 21 3
11 18 25 2 9
23 5 7 14 16
In the example the output is a vector, not a matrix as during the test run.
The example output is missing row 3.
In row 3, the element 4 is not less than 4 but less than or equal to 4 or greater than or equal to 4. This is the reason for removing this row.
I'm still puzzled by your example. Row 3 has no elements less than 4, therefore it should NOT be removed, right? But it was removed. That seems wrong. For this example to be correct, the problem should be called "Remove from a 2-D matrix all the rows that contain at least one element less than or equal to 4".
Thanks for making the change! It's a good problem.
The title and example are consistent. However the test case only removes rows with at least 1 element less than 4, which disagrees with title and example.
Need to modify the test case.
Please modify either the test suite or the title to be consistent.
I agree you should change the test to match the question. Also, perhaps add more than one test.
Your test suite is has an incorrect answer, the last row contains a 4.
Your test suite contains an error. The desired output contains a 4 in the third row, even though the task is to remove every row with an element less than or EQUAL TO a 4.
In Your solution the last row contains 4. So probably You'd like to delete rows with at least one element smaller than 4.
Find the two-word state names
Find common elements in matrix rows
Project Euler: Problem 5, Smallest multiple
Permute diagonal and antidiagonal
vectorization in N
Remove NaN ?
Matrix which contains the values of an other matrix A at the given locations.
Create a matrix X, where each column is a shifted copy of the vector v
A quadrant matrix
Choose a web site to get translated content where available and see local events and offers. Based on your location, we recommend that you select: .
You can also select a web site from the following list:
Select the China site (in Chinese or English) for best site performance. Other MathWorks country sites are not optimized for visits from your location.
Contact your local office