In Exercises 37–38, find the products and to determine whether B is the multiplicative inverse of A.

Matrix multiplication involves combining two matrices to produce a third matrix. The number of columns in the first matrix must equal the number of rows in the second matrix. The resulting matrix's elements are calculated by taking the dot product of the rows of the first matrix with the columns of the second matrix. Understanding this operation is crucial for determining the product of matrices A and B.

The multiplicative inverse of a matrix A is another matrix, denoted as A⁻¹, such that when A is multiplied by A⁻¹, the result is the identity matrix I. The identity matrix acts like the number 1 in regular multiplication, meaning that A * A⁻¹ = I. To determine if B is the multiplicative inverse of A, one must verify if the product AB equals the identity matrix.

An identity matrix is a square matrix with ones on the diagonal and zeros elsewhere. It serves as the multiplicative identity in matrix algebra, meaning that any matrix multiplied by the identity matrix remains unchanged. For a matrix A of size n x n, the identity matrix I will also be of size n x n, and confirming that the product of A and its supposed inverse B yields I is essential for validating B as A's inverse.