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Properties of Determinants And Some Important Determinants to Remember
Properties of Determinants:-
- Determinant of a matrix is same as the determinant of its transpose.
- If two rows or columns of a determinant are interchanged the determinant changes its sign.
- If the elements of a row (column) of a determinant are multiplied by a constant K, then the determinant will be multiplied by the same constant. For example,
If A is a square matrix of order n, then 
4.If all the elements of a row (column) of a determinant are zeros, then the value of that determinant is also zero.
5.If two rows (columns) of a determinant are equal then value of that determinant is zero.
Note:- If two rows (2 columns) of a determinant are proportionate then its value is zero.
6.If the elements of a row (column) of a determinant are sums of two elements then the determinant can be expressed as the sum of two determinants. That is for example,
7. If the elements of a row (column) of a determinant are added to or subtracted from the corresponding elements of some other row (column) then the determinant remains unchanged.
8. If the products of the elements of a row (or column) of a determinant with a constant K are added to the corresponding elements of some other row (or column), then the determinant remains unchanged.
9. Sum of the products of the elements of a row in a square matrix and the co-factors of the corresponding elements of some other row (column) is zero.
10. If the rows or columns of a determinant are changed without disturbing a cyclic order, then the determinant remains unchanged. That is,
11. Determinant of a null matrix is 1.
12. Determinant of a null matrix of the order 3X3 is zero.
Some Important Matrices Determinants to be Remembered for competitive exams:-
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FAQs on Properties of Determinants - Matrices and Determinants, Business Mathematics & Statistics - Business Mathematics and Statistics - B Com
| 1. What are the properties of determinants in matrices? |  |
Ans. The properties of determinants in matrices are as follows:
- Multiplying a row (or column) of a matrix by a constant multiplies the determinant by the same constant.
- Interchanging any two rows (or columns) of a matrix changes the sign of the determinant.
- If two rows (or columns) of a matrix are identical, then the determinant is zero.
- Adding a multiple of one row (or column) to another row (or column) does not change the value of the determinant.
- If a matrix has a row (or column) of zeros, then the determinant is zero.
| 2. How can determinants be used in solving systems of linear equations? | |
Ans. Determinants can be used to solve systems of linear equations by the Cramer's rule. Cramer's rule states that if a system of linear equations is given by AX = B, where A is the coefficient matrix, X is the variable matrix, and B is the constant matrix, then the solution for X can be found by dividing the determinant of the coefficient matrix by the determinant of A, where each column of A is replaced by the constant matrix B successively.
| 3. Can determinants be used to determine if a matrix is invertible? | |
Ans. Yes, determinants can be used to determine if a matrix is invertible. If the determinant of a matrix is non-zero, then the matrix is invertible. If the determinant is zero, then the matrix is not invertible. In other words, a matrix is invertible if and only if its determinant is non-zero.
| 4. What is the significance of the determinant in linear algebra? | |
Ans. The determinant has several significant roles in linear algebra. It can determine whether a matrix is invertible or not, which is crucial in solving systems of linear equations. The determinant also provides information about the scaling factor of a linear transformation represented by the matrix. It is used to calculate the eigenvalues of a matrix, which is important in many applications such as data analysis, image processing, and physics.
| 5. Can determinants be used to find the area of a triangle in a coordinate plane? | |
Ans. Yes, determinants can be used to find the area of a triangle in a coordinate plane. If the vertices of a triangle are given by (x1, y1), (x2, y2), and (x3, y3), then the area of the triangle can be calculated using the formula:
Area = 1/2 * |x1(y2 - y3) + x2(y3 - y1) + x3(y1 - y2)|
Here, | | denotes the absolute value and the determinant inside represents the signed area of the triangle. By taking the absolute value, we get the actual area regardless of the orientation of the triangle.
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