JG89 said:In general, the relation det(a + b) = det(a) + det(b) doesn't hold.
yanjt said:Hi, I do not understand why it is not closed under matrix addition.It is still a Mn,n matrix isn't it?
A set of nxn matrices with a zero determinant is a collection of square matrices where the determinant, or the scalar value that represents the scale factor of the matrix, is equal to zero.
A subspace is a subset of a vector space that is closed under addition and scalar multiplication. A set of nxn matrices with a zero determinant does not satisfy this property as adding two matrices with zero determinants can result in a non-zero determinant. Therefore, it is not considered a subspace of Mn,n.
No, a set of nxn matrices with a zero determinant can only contain matrices with a determinant of zero. If a non-zero matrix is included in the set, it would not be considered a set of nxn matrices with a zero determinant.
A zero determinant in a matrix indicates that the matrix is not invertible, meaning it does not have an inverse matrix. This can have implications in solving systems of equations or finding the inverse of a matrix.
Yes, a set of nxn matrices with a zero determinant also has the property that any linear combination of matrices within the set will also have a determinant of zero. This follows from the fact that the determinant is a linear transformation.