Graph System Exercises Solve and graph the following. 1. Exercise Set 8.4, Practice Exercises, problem 14 Exercise Set 8.4, Practice Exercises, problem 36 2. Exercise Set 8.5, Practice Exercises, problem 60 Use Gaussian Elimination to solve the following Exercises Chapter 8. Problem #8 { x y +3 z=8 3 x + y2 z=2 2 x + 4 y + z=0 } Problem # 16 { } x + y =4 x+ z=4 y + z=4 Chapter 8, Section 8.2 Practice Exercise Problems, #8 and #16: On these two problems, first, perform the row operations following the Gaussian Elimination Procedure in the Linear Algebra Toolkit. Copy all your work and paste it into your submission document (MS Word or equivalent). Then, using the ad hoc method, take the same system and solve it by hand using the procedures of Example 2 on p. 809. Of course, you are expected to use one of your math editors in your submission document. The bracket symbol { is available to you using the MS Equation Editor for a system of three equations, and you can build this a number of ways in MathType. A similar bracket is available for the smaller system you create. Be sure you convert the reduced matrices back to a system of equations to identify your solution(s). Your LAT solution and ad hoc solution will agree if you did both methods correctly Chapter 9. Check Point #1 { x 2 y z=5 2 x3 yz=0 3 x4 yz=1 Check Point #2 x 2 y z=5 2 x5 y +3 z=6 x3 y + 4 z=1 } Chapter 9, Section 9.2 Practice Exercise Problems: Check Point #1, (p. 879), and Checkpoint #2 (p. 882) On these two problems, it will be important to convert the reduced matrices back to a system of equations, so that if solutions exist, you can identify the set of solutions (infinite in number) defined by ordered triples with variables as needed. Follow Examples 1 and 2 carefully. You can use the Reduced Rwo Echelon button to get right to the simplified form of the matrix on these two. Copy and paste your work to your submission document. Use Gaussian Elimination to solve the following Exercises Chapter 8. Problem #8 { x y +3 z=8 3 x + y2 z=2 2 x + 4 y + z=0 } Problem # 16 { } x + y =4 x+ z=4 y + z=4 Chapter 8, Section 8.2 Practice Exercise Problems, #8 and #16: On these two problems, first, perform the row operations following the Gaussian Elimination Procedure in the Linear Algebra Toolkit. Copy all your work and paste it into your submission document (MS Word or equivalent). Then, using the ad hoc method, take the same system and solve it by hand using the procedures of Example 2 on p. 809. Of course, you are expected to use one of your math editors in your submission document. The bracket symbol { is available to you using the MS Equation Editor for a system of three equations, and you can build this a number of ways in MathType. A similar bracket is available for the smaller system you create. Be sure you convert the reduced matrices back to a system of equations to identify your solution(s). Your LAT solution and ad hoc solution will agree if you did both methods correctly Chapter 9. Check Point #1 { x 2 y z=5 2 x3 yz=0 3 x4 yz=1 Check Point #2 x 2 y z=5 2 x5 y +3 z=6 x3 y + 4 z=1 } Chapter 9, Section 9.2 Practice Exercise Problems: Check Point #1, (p. 879), and Checkpoint #2 (p. 882) On these two problems, it will be important to convert the reduced matrices back to a system of equations, so that if solutions exist, you can identify the set of solutions (infinite in number) defined by ordered triples with variables as needed. Follow Examples 1 and 2 carefully. You can use the Reduced Rwo Echelon button to get right to the simplified form of the matrix on these two. Copy and paste your work to your submission document