Notes on determinants
A 2x2 matrix is an array of four numbers put in two rows and two columns, such as
| a c |
| b d |
The determinant of this matrix is ad - bc, the product of the main diagonal minus the product of the opposite diagonal. If you use Kramer's rule to solve a pair of simultaneous equations, you will need to know how to calculate determinants.
For example, let's consider the following set of equations.
3x - 2y = 7
2x + 4y = 12
As an augmented matrix , these equations become
| 3 -2 : 7 |
| 2 4 : 12|
Matrix_1 is
| 3 -2 |
| 2 4 |
The determinant is 3(4) - 2(-2) = 12 - -4 = 16
Matrix_x is
| 7 -2 |
| 12 4 |
The determinant is 7(4) - 12(-2) = 28 - -24 = 52
Matrix_y is
| 3 7 |
| 2 12 |
The determinant is 3(12) - 2(7) = 36 - 14 = 22
From here, Kramer's rule then has x = 52/16 = 13/4 or 3 1/4. The value for y = 22/16 = 11/8 = 1 3/8
Notes on solving simultaneous equations
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