Examples of 'symmetric matrix' in a sentence
Meaning of "symmetric matrix"
A symmetric matrix is a square matrix that is equal to its transpose. In other words, if you reflect the matrix along its main diagonal, the elements on either side will be the same
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- A square matrix that is its own transpose, and is thereby symmetric about the main diagonal
How to use "symmetric matrix" in a sentence
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symmetric matrix
A symmetric matrix is necessarily a normal matrix.
Any square diagonal matrix is also a symmetric matrix.
The real symmetric matrix.
Is the error propagation positive definite symmetric matrix.
Note that a real symmetric matrix is diagonalizable by an orthogonal matrix.
All positive integral powers of a symmetric matrix are symmetric.
The entries of a symmetric matrix are symmetric with respect to the main diagonal.
The spectral decomposition of a symmetric matrix.
A matrix is called symmetric matrix if it is square and is equal to its transpose.
Then the principal curvatures are the eigenvalues of the symmetric matrix.
A symmetric matrix of iterations of synthetic growth generating intensities with variable frequencies.
Any matrix is the sum of a symmetric matrix and a skew symmetric matrix.
The matrix A in the above decomposition is a symmetric matrix.
The result is that the originally symmetric matrix turned into an asymmetric one.
A symmetric matrix is a square matrix that verifies,.
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Any matrix may be written as the sum of an antisymmetric matrix and a symmetric matrix.
A real and symmetric matrix is simply a special case of a Hermitian matrix.
This means that all the diagonal elements of a skew symmetric matrix are zero.
Let us recall that any real symmetric matrix may be diagonalized by an orthogonal matrix.
Please note that Mmix is a symmetric matrix.
The matrix A is a symmetric matrix exactly due to symmetry of the bilinear form.
The Hankel matrix is a symmetric matrix.
Every symmetric matrix is thus, up to choice of an orthonormal basis, a diagonal matrix.
Any matrix can be decomposed into the sum of a symmetric matrix and an antisymmetric matrix.
A symmetric matrix is a matrix whose values are symmetric in the northwest-to-southeast diagonal.
This decomposition is possible because Bn is a symmetric matrix with positive eigenvalues.
A symmetric matrix is positive-definite if and only if all its eigenvalues are positive.
This amounts to diagonalising a symmetric matrix but de Witt never thought in these terms.
Non-uniform scaling is accomplished by multiplication with any symmetric matrix.
In linear algebra, a symmetric matrix is a square matrix that is equal to its transpose.
The direct solution approach utilizes the fact that G is a symmetric matrix with positive eigenvalues.
In linear algebra, a real symmetric matrix represents a self-adjoint operator over a real inner product space.
Since belongs to, it is a symmetric matrix.
Every real symmetric matrix is Hermitian, and therefore all its eigenvalues are real.
The adjacency matrix of a simple, undirected graph is a binary symmetric matrix with zero diagonal.
Otherwise, a skew-symmetric matrix is just the same thing as a symmetric matrix.
The Cuthill-McKee algorithm can be used to reduce the bandwidth of a sparse symmetric matrix.
Then convert the result into a symmetric matrix plus an anti-symmetric matrix.
If is a real matrix, this is equivalent to that is, is a symmetric matrix.
It is well-known that a generic real symmetric matrix of size n has exactly n real eigenvalues.
The sigma-matrix is a real, positive definite, and symmetric matrix.
EPMATHMARKEREP EPMATHMARKEREP A ( t ) is a skew symmetric matrix of specific forces in navigation axes.
Inverse of the Hilbert matrix of size n . c is a real, symmetric matrix.
He introduced a 3 × 3 symmetric matrix of numbers that is now known as the Cauchy stress tensor.
EPMATHMARKEREP where the matrix H is a positive definite symmetric matrix and equal in this example to,.
If a symmetric matrix is rotated by 90 °, it becomes a persymmetric matrix.
Similarly, the product AT A is a symmetric matrix.
Theorem 6.14 Every symmetric matrix is equivalent to a diagonal matrix.
The eigenvalues and eigenvector of a ( real ) symmetric matrix are all real.
A square matrix A that is equal to its transpose, that is, A AT, is a symmetric matrix.
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Typical examples are the symmetric stable distributions
Examples of using Matrix
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Proposed matrix of activities for cancer therapy
Mass of each version a matrix shall be provided
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