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Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com PDF Download

INVERSE OF A MATRIX
Minors and Cofactors of the elements of a determinant.
The minor of an element aij of a determinant A is denoted by Mij and is the determinant obtained from A by deleting the row and the column where aij occurs.
The cofactor of an element aij with minor Mij is denoted by Cij and is defined as

Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Thus, cofactors are signed minors.

In the case of  Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com , we have

M11 = a 22 , M12 = a 21, M21 = a , , M22 = a11
Also C11 = a22 , C12 = -a21, C21 = -a12 , C22 = a11

In the case of Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com we have

   Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com
   Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com
Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com
 Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Adjoint of a square matrix.
The transpose of the matrix got by replacing all the elements of a square matrix A by their corresponding cofactors in | A | is called the Adjoint of A or Adjugate of A and is denoted by Adj A.

Thus, AdjA =  Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

 

Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com
 

(ii) Adj I = I, where I is the unit matrix.
(iii) A(AdjA) = (Adj A) A = | A | I
(iv) Adj (AB) = (Adj B) (Adj A)
(v) If A is a square matrix of order 2, then |AdjA| = |A|
     If A is a square matrix of order 3, then |Adj A| = |A|2

Example 1 Write the Adjoint of the matrix A =  Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Solution : 
Adj A = Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

 

Example 2 
 Find the Adjoint of the matrix A =  
Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Solution :
Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Now,

Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Hence
Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Inverse of a non singular matrix.
The inverse of a non singular matrix A is the matrix B such that AB = BA = I. B is then called the inverse of A and denoted by A-1 .
Note
(i) A non square matrix has no inverse.
(ii) The inverse of a square matrix A exists only when |A| ≠ 0 that is, if A is a singular matrix then A-1 does not exist.
(iii) If B is the inverse of A then A is the inverse of B. That is B = A-1 ⇒ A = B-1.
(iv) A A-1 = I = A-1 A
(v) The inverse of a matrix, if it exists, is unique. That is, no matrix can have more than one inverse.
(vi) The order of the matrix A-1 will be the same as that of A.
(vii) I-1 = I
(viii) (AB)-1 = B-1 A-1 , provided the inverses exist.
(ix) A2 = I implies A-1 = A
(x) If AB = C then (a) A = CB-1 (b) B = A-1C, provided the inverses exist.
(xi) We have seen that

Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

This suggests that

Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

(xii) (A-1 ) -1 = A, provided the inverse exists.

Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com
Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Example 3​
Find the inverse of Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com if it exists


Solution :​  

  Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Example 4
Show that the inverses of the following do not exist :​


Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Solution :

Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com
 Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com


Example 5
Find the inverse of Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com if it exists.

Solution :​

Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

We have, Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Now, the cofactors are
Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Hence
Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Example 6

Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com

Since A and B are square matrices and AB = I, A and B are inverse of each other

The document Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics | Business Mathematics and Statistics - B Com is a part of the B Com Course Business Mathematics and Statistics.
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FAQs on Inverse of a Matrix - Matrices and Determinants, Business Mathematics & Statistics - Business Mathematics and Statistics - B Com

1. What is the inverse of a matrix?
Ans. The inverse of a matrix is a matrix that, when multiplied with the original matrix, yields the identity matrix. In other words, if A is a matrix and A^-1 is its inverse, then A * A^-1 = A^-1 * A = I, where I is the identity matrix.
2. How can I find the inverse of a matrix?
Ans. To find the inverse of a matrix, you can use the formula A^-1 = (1/det(A)) * adj(A), where det(A) is the determinant of matrix A and adj(A) is the adjugate of matrix A. First, calculate the determinant of A, then find the adjugate by taking the transpose of the matrix of cofactors. Finally, divide the adjugate by the determinant to obtain the inverse matrix.
3. Is every matrix invertible?
Ans. No, not every matrix is invertible. For a matrix to have an inverse, it must be a square matrix (i.e., have the same number of rows and columns) and its determinant must be non-zero. If the determinant is zero, the matrix is said to be singular or non-invertible.
4. Can a matrix have multiple inverses?
Ans. No, a matrix cannot have multiple inverses. If a matrix has an inverse, it is unique. This means that there is only one matrix that, when multiplied with the original matrix, yields the identity matrix. If a matrix has multiple inverses, it is not a valid inverse.
5. What is the significance of finding the inverse of a matrix?
Ans. Finding the inverse of a matrix is significant in various applications. It allows us to solve systems of linear equations, as multiplying the system by the inverse matrix on both sides gives a solution for the unknown variables. Additionally, the inverse of a matrix is used in solving problems involving transformations, such as finding the inverse of a transformation matrix to reverse the transformation.
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