![]() ![]() ![]() It can be calculated using the adjoint of the matrix. The adjoint of a matrix has several applications in mathematics and engineering. Step 2: Take the transpose of the cofactor matrix.Īdj(A) =, , ] Take the transpose of the cofactor matrix to get the adjoint matrix.įor example, let's find the adjoint of the matrix A =, , ]. To find the adjoint of a matrix, follow these steps:įind the cofactor matrix of the given matrix. The cofactor matrix is formed by taking the determinants of the submatrices of the original matrix. It is defined as the transposition of the cofactor matrix of a given square matrix. ![]() The adjoint of a matrix is also known as the adjugate or classical adjoint. The adjoint of a matrix is denoted by adj(A). Going further, we will discuss the adjoint of a matrix, how to find it, and its applications. One important concept related to matrices is the adjoint of a matrix. They are used to represent and manipulate data, and matrix operations such as addition, subtraction, multiplication, and inversion are crucial in solving many mathematical problems. Matrices are fundamental mathematical tools in various fields, such as physics, engineering, economics, and computer science. Wish to understand the Adjoint of the Matrix in a much simpler way? Well, you are at the right website! Gain knowledge in the easiest way possible with Cuemath. ![]()
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