Crammer's rule for indeterminate compatible systems
In this video I will explain Crammer's rule for indeterminate compatible systems.
The crammer's rule is a method of solving systems of equations and it is characterized to solve them from determinants.
The indeterminate compatible system, is a system of equations with infinite solutions.
The conditions for the system to be compatible indeterminate:
- The number of linearly independent equations will not be the same as the number of unknowns
- That the determinant of the coefficients is equal to 0.
In the video you will see the practical verification of the use of Crammer's rule for indeterminate compatible systems. In addition, if you are not sure you can continue practicing with problems of this type you can do the printable exercises with their solutions that I have left you on the web. Good luck in your studies!
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