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What does exactly mean that a matrix A(m,n) has a full rank?

Let A be a matrix where some columns are zero (some columns are linear dependent). This matrix does not have a full column rank, h < n.

Does it mean that matrix matrix A(m,n) has a full rank, when m > n and has a full column rank h = n?

A = [ 1 0 0; 0 1 0; 5 7 0; -1 4 0]   //Not full rank
A = [ 1 0; 0 1; 5 7; -1 4]   //Full rank
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The rank of an m×n matrix cannot be greater than m or n. A matrix that has a rank as large as possible is said to have full rank; otherwise, the matrix is rank deficient. –  Danil Asotsky Jan 20 '13 at 18:22
    
This definitely belongs on math.stackexchange.com –  Tomas Lycken Jan 20 '13 at 18:27

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