24. S In Exercises 17 and 18, determine the value(s) of h such that the matrix is the augmented matrix of a consistent lincar system. 25. S 17. 18. In Exercises 19 and 20, choose h and k such that the system has (a) nO olution thi a unique 26. S and fe) many tions Give

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Ding Talk Edit Window Conversation Help 1 民乐我可以比喜剧明星还幽默 K > A Thu Apr 1 8:17 PM Chapter1-LinearSystem.pdf 原俊青.2021/03/09 09:17.4 MB 26 CHAPTER 1 Linear Equations in Linear Algebra n Shot .17.41 PM d. Whenever a system has free variables, the solution set con- tains many solutions. e. Ageneral solution of a system is an explicit description of all solutions of the system. 16. a. b. 23. Suppose a 3x 5 coefficient matrix for a system has three pivot columns. Is the system consistent? Why or why not? In Exercises 17 and 18, determine the value(s) of h such that the matrix is the augmented matrix of a consistent linear system. 24. Suppose a system of linear equations has a 3 x5 augmented matrix whose fifth column is a pivot column. Is the system consistent? Why (or why not)? [2 3 h] 25. Suppose the coefficient matrix of a system of linear equations has a pivot position in every row. Explain why the system is 1 -3 17. 18. consistent. In Exercises 19 and 20, choose h and k such that the system has (a) no solution, (b) a unique solution, and (c) many solutions. Give separate answers for each part. 26. Suppose the coefficient matrix of a linear system of three equa- tions in three variables has a pivot in each column. Explain why the system has a unique solution. 27. Restate the last sentence in Theorem 2 using the concept of pivot columns: "If a linear system is consistent, then the so- lution is unique if and only if. 19. x + hx2 = 2 20. xi + 3x2 2 4x1 + 8x2 = k 3x1 + hx2 = k In Exercises 21 and 22, mark each statement True or False. Justify each answer. 28. What would you have to know about the pivot columns in an augmented matrix in order to know that the linear system is consistent and has a unique solution? 29. A system of linear equations with fewer equations than un- knowns is sometimes called an underdetermined system. Sup- pose that such a system happens to be consistent. Explain why there must be an infinite number of solutions. 21. a. In some cases, a matrix may be row reduced to more than one matrix in reduced echelon form, using different se- quences of row operations. b. The row reduction algorithm applies only to augmented matrices for a linear system. c. A basic variable in a linear system is a variable that corre- sponds to a pivot column in the coefficient matrix. 30. Give an example of an inconsistent underdetermined system of two equations in three unknowns. 31. A system of linear equations with more equations than un- knowns is sometimes called an overdetermined system. Can such a system be consistent? Illustrate your answer with a specific system of three equations in two unknowns. d. Finding a parametric description of the solution set of a linear system is the same as solving the system. e. If one row in an echelon form of an augmented matrix is [0 0 0 5 0], then the associated linear system is inconsistent. 32. Suppose an n x(n + 1) matrix is row reduced to reduced ech- elon form. Approximately what fraction of the total number of operations (flops) is involved in the backward phase of the reduction when n = 30? when n = 300? 22. a. The echelon form of a matrix is unique. b. The pivot positions in a matrix depend on whether row interchanges are used in the row reduction process. Suppose experimental data are represented by a set of points in c. Reducing a matrix to echelon form is called the forward the plane. An interpolating polynomial for the data is a polyno- mial whose graph passes through every point. In scientific work, such a polynomial can be used, for example, to estimate values between the known data points. Another use is to create curves for graphical images on a computer screen. One method for finding an interpolating polynomial is to solve a system of linear equations. phase of the row reduction process. 100% + *True/false questions of this type will appear in many sections. Methods for justifying your answers were described before Exercises 23 and 24 in Section 1.1. WEB APR 1 1 étv 280