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Let A be a square matrix (not necessarily positive or even real).
Thus for example only a square matrix can be idempotent.
The determinant takes a square matrix and returns a number.
This definition can be applied in particular to square matrices.
The entries a form the main diagonal of a square matrix.
Any two square matrices of the same order can be added and multiplied.
This example shows that the Jacobian need not be a square matrix.
However, in the remainder of this article we will consider only square matrices.
A row or square matrix of panels share a control module.
Let be a square matrix whose columns are those eigenvectors, in any order.
When the blocks are square matrices of the same order further formulas hold.
Let A be a symmetric square matrix of order n with real entries.
It is required to solve The square matrix has been used in Example 2.3.2.1.
The square matrix A represents the effect of multiplication by x in the given basis.
In fact, let A be a square matrix.
This defines a partial ordering on the set of all square matrices.
In other words, any square matrix which takes the form is a hollow matrix.
Not every square matrix is similar to a companion matrix.
Similarity is an equivalence relation on the space of square matrices.
At one end, deep in the body, is the electronic "fingertip," actually a square matrix of 64 pressure sensors.
The following mathematical statements hold when is a full rank square matrix:
In linear algebra, the determinant is a value associated with a square matrix.
A dyadic tensor has order two, and may be represented as a square matrix.
This variance is also a positive semi-definite square matrix.
It is of particular importance in square matrices.