We can find the solutions of matrices by getting them into row-echelon form using the elementary row operations and/or back substitution.
Elementary row options
1. Interchange two equations
2 Multiply an equation by a nonzero equation
3. Add a multiple of an equation to another equation.
Row-echelon form: the necessary form we need for augmented matrices and system of equations.
1. Rows consisting of zeroes belong at the bottom
2. First nonzero has a 1
3. For each row the leading 1 in the higher row is to the left of the lower one.
Here are some examples of matrices in row-echelon form:
How to solve system of equations through Gaussian elimination with back substitution.
1. Get the matrix in row-echelon form using elementary row operations
2. Use back substitution to solve for each variable.
Gauss-Jordan elimination
1. Obtain the reduced row-echelon form using elementary row operations.
2. Variables are equal to the coefficients on the right.
Math joke of the day:
Good post! Keep the math jokes! Way to take the time to type all that out.
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