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Transcript
Section 7-3 Solving 3 x 3 systems of equations Solving 3 x 3 Systems substitution (triangular form) Gaussian elimination using an augmented matrix (algebraic) using an inverse matrix (calc.) Substitution – Triangular Form if you can simplify a system of equations into the triangular form seen below, you can solve the system by substitution x – 2y + z = 7 y – 2z = -7 z=3 Gaussian Elimination this method is used to change a 3 equation-3 unknown system of equations into triangular form x – 2y + z = 7 3x – 5y + z = 14 2x – 2y – z = 3 x – 2y + z = 7 y – 2z = -7 z=3 Gaussian Elimination The following operations can be used: 1. interchange any two equations 2. multiply (or divide) one of the equations by a real number 3. add a multiple of one equation to any other equation Augmented Matrix using an augmented matrix does the same work as elimination without having to re-write the equations and variables over and over again the following is the augmented matrix for the same system used earlier 1 2 1 7 3 5 1 14 2 2 1 3 Augmented Matrix the goal is to use the same techniques as for elimination to change the matrix into “triangular form” so it can be finished off with substitution “triangular form” for an augmented matrix is called row echelon form 1 # # # 0 1 # # 0 0 1 # Row Echelon Form rows consisting of all 0’s are on the bottom the first non-zero entry of a row is 1 1’s are along the diagonal the row echelon form of a system is not unique 1 # # # 0 1 # # 0 0 1 # Row Operations The row operations for a matrix are the same as for Gaussian elimination 1. Interchange any two rows 2. Multiply all elements of a row by a number 3. Add a multiple of one row to any other row Reduced Row Echelon Form instead of stopping to use substitution after you get to row echelon form, you can keep going using the augmented matrix to get the solution this new form is called reduced row echelon form 1 0 0 a 0 1 0 b 0 0 1 c The solution of the system is (a , b, c) Order of Attack 17 06 04 a# 10 15 04 b# 10 02 13 c# Special Cases when using either technique and the variables disappear from a row, it leads to a special case: if you are left with . . . false statement = no solution true statement = infinitely many solutions
