complex conjugate transpose (of a matrix) in Vietnamese

1. The Adjoint is the conjugate transpose of a matrix while the classical Adjoint is another name for the adjugate matrix or cofactor transpose of a matrix.

2. The Adjoint is the conjugate transpose of a matrix while the classical Adjoint is another name for the adjugate matrix or cofactor transpose of a matrix.

3. 'Adjoint' of a matrix refers to the corresponding Adjoint operator, which is its conjugate transpose

4. The adjoint M* of a complex matrix M is the transpose of the conjugate of M: M * = M T. A square matrix A is called normal if it commutes with its adjoint: A*A = AA*.

5. The Hermitian Adjoint of a matrix is the same as its transpose except that along with switching row and column elements you also complex conjugate all the elements

6. Conjugation is the process of taking a complex conjugate of a complex number, complex matrix, etc., or of performing a Conjugation move on a knot

7. The Adjoint of a matrix A is the transpose of the cofactor matrix of A

8. An Antisymmetric matrix is a Matrix which satisfies the identity (1) where is the Matrix Transpose

9. The adjugate, classical Adjoint, or adjunct of a square matrix is the transpose of its cofactor matrix

10. If A is the mxn matrix, then the nxm matrix is called the transpose of A.

11. The Adjoint of a matrix (also called the adjugate of a matrix) is defined as the transpose of the cofactor matrix of that particular matrix

12. The Adjoint is the transpose of the cofactor matrix.

13. The establishment of a matrix calculation of template classes, can be combined matrix, subtract, multiply, transpose, inverse, such as computing.

14. The Hermitian Adjoint of a complex number is the complex conjugate of […]

15. If all the elements of a matrix are real, its Hermitian Adjoint and transpose are the same

16. An Antisymmetric matrix, also known as a skew-symmetric or antimetric matrix, is a square matrix that satisfies the identity A=-A^(T) (1) where A^(T) is the matrix transpose

17. Adjoint definition is - the transpose of a matrix in which each element is replaced by its cofactor.

18. The IMCONJUGATE(complex number) returns the conjugate of a complex number of form x+yi

19. The Adjoint of a square matrix A = [a ij] n x n is defined as the transpose of the matrix [A ij] n x n, where Aij is the cofactor of the element a ij.Adjoing of the matrix A is denoted by adj A

20. Matrix serves as a key tool in the study of higher algebra. The definition and properties of symmetric and anti-symmetric matrices are given in discussing the computation of matrix transpose.

21. - definition Definition: The Adjoint of a matrix is the transpose of the cofactor matrix C of A, a d j (A) = C T Example: The Adjoint of a 2X2 matrix A = ∣ ∣ ∣ ∣ ∣ ∣ 5 8 4 1 0 ∣ ∣ ∣ ∣ ∣ ∣ is a d j (A) = ∣ ∣ ∣ ∣ ∣ ∣ 1 0 − 8 − 4 5 ∣ ∣ ∣ ∣ ∣ ∣

22. Antisymmetry can only be found on square matrices, because otherwise the matrix and its transpose would be of different dimensions

23. Matrix algebra is used for the study of complex multiconnected nonlinear circuits.

24. Complex Conjugation, the change of sign of the imaginary part of a complex number Conjugate (square roots), the change of sign of a square root in an expression Conjugate element (field theory), a generalization of the preceding Conjugations to roots of a polynomial of any degree

25. In linear algebra, the singular-value decomposition (SVD) is a factorization of a real or complex matrix.