Now, we will compute the determinant of each smaller square matrix. The below matrix is obtained by eliminating the corresponding row and column of each element. Now, we will solve the following examples to calculate the minor of the matrices.Ĭalculate the minor of the following matrix: To find the minor of each element, we will delete the corresponding row and column of each element and write the minors in the matrix notation.Īfter writing the matrix in the above form, we will find the determinant of each matrix to compute the minor of the matrix. ![]() Each element in the square matrix has its minor.įor example, consider the following simple square matrix: ![]() We know that the square matrix has an equal number of rows and columns in it. We label these minors according to the row and column they belong to. Since in the large matrices, there are many rows and columns with multiple elements, therefore we can make many minors of those matrices. To find the minor of a matrix, we take the determinant of each smaller matrix, obtained by deleting the corresponding rows and columns of each element in the matrix.
0 Comments
Leave a Reply. |
AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |