Final answer:
All stated properties are true for invertible nxn matrices: the product of two invertible matrices is invertible, the inverse of a product is the product of the inverses in reverse order, the transpose of an invertible matrix is also invertible, and the determinant of an invertible matrix is always non-zero.
Step-by-step explanation:
True Statements for Invertible Matrices
For all invertible nxn matrices a and b:
- The product of two invertible matrices is invertible.
- The inverse of a product of two matrices is the product of their inverses in reverse order.
- The transpose of an invertible matrix is invertible.
- The determinant of an invertible matrix is non-zero.
Each of these statements is true and reflects fundamental properties of matrix algebra in the context of invertible matrices.