Transpose and Adjoint of Matrices

Transpose of a Matrix

The matrix obtained from a given matrix A by interchanging its rows and columns is called Transpose of matrix A. Transpose of A is denoted by A’ or $A^{T}$ . If A is of order m*n, then A’ is of the order n*m. Clearly, the transpose of the transpose of A is the matrix A itself i.e. (A’)’= A.

Consider the matrix $A=\begin {bmatrix} a_{11} & a_{12} &a_{13} \\ a_{21} &a_{22} &a_{23} \\ a_{31} &a_{32} &a_{33} \end {bmatrix}$ If A = | $a_{ij}$ | of order m*n then $A^{T}$ = | $a_{ij}$ | of order n*m. So, $A^{T}=\begin {bmatrix} a_{11} & a_{21} &a_{31} \\ a_{12} &a_{22} &a_{32} \\ a_{13} &a_{23} &a_{33} \end {bmatrix}$ .

Example 1: Consider the matrix $A= \begin {bmatrix}2 & 3 &4 \\ 1 & -1 & 3 \end{bmatrix}$ . Do the transpose of matrix.

Solution: It is an order of 2*3. By, writing another matrix B from A by writing rows of A as columns of B. We have: $B=\begin {bmatrix} 2 & 1\\ 3 &-1 \\ 4 &3 \end {bmatrix}$ . The matrix B is called the transpose of A.

Example 2: Consider the matrix $A=\begin {bmatrix} 0 &7 &5 \\ 3 &8 &4 \\ 9 &6 &1 \end {bmatrix}$ . Do the transpose of matrix.

Solution: The transpose of matrix A by interchanging rows and columns is $A^{T}=\begin {bmatrix} 0 &3 &9 \\ 7 &8 &6 \\ 5 &4 &1 \end {bmatrix}$ .

Properties of Transpose

The transpose of the transpose of a matrix is that the matrix itself = $(A^{T})^{T}$ = A
The transpose of the addition of 2 matrices is similar to the sum of their transposes = $(A+B)^{T} = A^{T} + B^{T}$
When a scalar matrix is being multiplied by the matrix, the order of transpose is irrelevant = $(sA)^{T} = sA^{T}$
The transpose of the product of 2 matrices is similar to the product of their transposes in reversed order = $(AB)^{T} = B^{T}A^{T}$

Adjoint of a Matrix

Given a square matrix A, the transpose of the matrix of the cofactor of A is called adjoint of A and is denoted by adj A. An adjoint matrix is also called an adjugate matrix. In other words, we can say that matrix A is another matrix formed by replacing each element of the current matrix by its corresponding cofactor and then taking the transpose of the new matrix formed.

Suppose, $A=\begin {bmatrix} A_{11} &A_{12} \\ A_{21}& A_{22} \end {bmatrix}$ then Adj A = $\begin {bmatrix} A_{11} &A_{21} \\ A_{12}& A_{22} \end {bmatrix}$

Example 1: Consider the matrix $A=\begin {bmatrix} 5 &-1 \\ 2&2 \end {bmatrix}$ Find the Adj of A.

Solution: First to find out the minor and cofactor of the matrix : $M_{11}$ = 2 $C_{11}$ = 2, $M_{12}$ = 2 $C_{12}$ = -2, $M_{21}$ = -1 $C_{21}$ = +1, $M_{22}$ = 5 $C_{22}$ = 5.

Cofactor matrix = $\begin {bmatrix} 2 &-2 \\ 1&5 \end {bmatrix}$ and Adj A = $\begin {bmatrix} 2 &1 \\ -2&5 \end {bmatrix}$

Example 2: Consider the matrix $C=\begin {bmatrix} 2 &-3 &-1 \\ 6&4&1 \\ 0&5&3 \end {bmatrix}$ Find the Adj of A.

Solution: $M_{11}$ = 7 $C_{11}$ = 7, $M_{12}$ = 18 $C_{12}$ = -18, $M_{13}$ = 30 $C_{13}$ = 30, $M_{21}$ = 1 $C_{21}$ = -1, $M_{22}$ = 6 $C_{22}$ = 6, $M_{23}$ = 10 $C_{23}$ = -10, $M_{31}$ = 1 $C_{31}$ = 1, $M_{32}$ = 8 $C_{32}$ = -8, $M_{33}$ = 26 $C_{33}$ = 26.

Cofactor matrix = $\begin {bmatrix} 7 & -18 &30 \\ -1& 6 & -10\\ 1& -8 &26 \end{bmatrix}$ and Adj A = $\begin {bmatrix} 7 & -1 &1 \\ -18& 6 & -8\\ 30& -10 &26 \end{bmatrix}$ .

Exercise

Find the adjoint of the matrix $A=\begin {bmatrix} -1 &-2 &-2 \\ 2&1&-2 \\ 2&-2&1 \end {bmatrix}$ .
Find the adjoint of matrix $F=\begin {bmatrix} 4 &2 &3 \\ 4&0&1 \\ 1&1&0 \end {bmatrix}$ .
Find the adjoint of matrix $A=\begin {bmatrix} 8 &-9 \\ -5&6 \end {bmatrix}$ .
Find the adjoint of matrix $D=\begin {bmatrix} 4 &-5 \\ 2&1 \end {bmatrix}$ .
Find the adjoint of the matrix $G=\begin {bmatrix} 3 &-4 &1 \\ -3&6&-1 \\ 4&-6&2 \end {bmatrix}$ .

Transpose of a Matrix

Adjoint of a Matrix

Exercise

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