scalar matrix Sentence Examples
- A scalar matrix is a square matrix with all non-diagonal elements equal to zero.
- The trace of a scalar matrix is equal to the scalar value it represents.
- The eigenvalue of a scalar matrix is equal to the scalar value it represents.
- The eigenvectors of a scalar matrix are any nonzero vectors in the vector space.
- The determinant of a scalar matrix is equal to the scalar value it represents raised to the power of the matrix order.
- The inverse of a scalar matrix is equal to the scalar matrix with the inverse of the scalar value it represents.
- A scalar matrix commutes with any matrix.
- The product of two scalar matrices is a scalar matrix with the product of the scalar values it represents.
- The sum of two scalar matrices is a scalar matrix with the sum of the scalar values it represents.
- The adjoint of a scalar matrix is equal to the scalar matrix with the adjoint of the scalar value it represents.
scalar matrix Meaning
Wordnet
scalar matrix (n)
a diagonal matrix in which all of the diagonal elements are equal
Synonyms & Antonyms of scalar matrix
No Synonyms and anytonyms found
FAQs About the word scalar matrix
a diagonal matrix in which all of the diagonal elements are equal
No synonyms found.
No antonyms found.
A scalar matrix is a square matrix with all non-diagonal elements equal to zero.
The trace of a scalar matrix is equal to the scalar value it represents.
The eigenvalue of a scalar matrix is equal to the scalar value it represents.
The eigenvectors of a scalar matrix are any nonzero vectors in the vector space.