2 -[-3] Span (u, v) for all h and k. 21. Let u = and v= [2]. Show that is in

21

Transcribed Image Text:

9911 ---- 2121₁22= [ -2 value) of h is b in the plane spanned by a, and a₂? 17. Let a = 18. Let y = 0 V₂ - [9] = [] -2 8 alue(s) of h is y in the plane generated by v₁ and v₂? 8 2 and v₂ = -6 -[-2] 21. Let u = 7 Span (u, v) for all h and k. , and b = 19. Give a geometric description of Span {V₁, V₂} for the vectors 12 - [3] -9 and v= -[:] h , and y 20. Give a geometric description of Span {V₁, V₂} for the vectors in Exercise 16. [²] 2 = 23. a. Another notation for the vector h -5 [3] -3 Show that - [3]. [*] k For what 22. Construct a 3 x 3 matrix A, with nonzero entries, and a vector b in R³ such that b is not in the set spanned by the columns of A. 25. Let A = In Exercises 23 and 24, mark each statement True or False. Justify each answer. For what [3] b. The points in the plane corresponding to lie on a line through the origin. is in is [-4 3]. [3] c. An example of a linear combination of vectors v₁ and v₂ is the vector v₁. and b = and d. The solution set of the linear system whose augmented matrix is [a₁ a2 a3 b] is the same as the solution set of the equation xa1 + x₂a2 + x3a3 = b. e. The set Span (u, v) is always visualized as a plane through the origin. 24 a. Any list of five real numbers is a vector in RS. b. The vector u results when a vector u - v is added to the vector V. c. The weights C₁,.... Cp in a linear combination CIVI + + Cpvp cannot all be zero. d. When u and v are nonzero vectors, Span {(u, v) contains the line through u and the origin. 1 vibn bi e. Asking whether the linear system corresponding to an augmented matrix [a₁ a2 a3 b] has a solution amounts to asking whether b is in Span {a₁, a2, a3). 1 0-4 3 -2 0 -2 6 3 1 -[4 columns of A by a₁, a2, a3, and let W = Span {a₁, a2, a3). Denote the a. Is b in (a,, a2. a3)? How many vectors are in {a,. a2. a3}? b. Is b in W? How many vectors are in W? c. Show that a, is in W. [Hint: Row operations are unnec- essary.] 206 85 1 the set of all linear combinations of the columns of A. 26. Let A = 1.3 Vector Equations 33 -1 1 -2 V₂ = let b = ---- 10 3 3 a. Is b in W? b. Show that the third column of A is in W. and let W be 27. A mining company has two mines. One day's operation at mine #1 produces ore that contains 20 metric tons of cop- per and 550 kilograms of silver, while one day's operation at mine #2 produces ore that contains 30 metric tons of 20 and copper and 500 kilograms of silver. Let v₁ = 550 Then v₁ and v₂ represent the "output per day" 30 500 of mine #1 and mine #2, respectively. a. What physical interpretation can be given to the vector 5v₁ ? b. Suppose the company operates mine #1 for x₁ days and mine #2 for x₂ days. Write a vector equation whose solu- tion gives the number of days each mine should operate in order to produce 150 tons of copper and 2825 kilograms of silver. Do not solve the equation. c. [M] Solve the equation in (b). 28. A steam plant burns two types of coal: anthracite (A) and bituminous (B). For each ton of A burned, the plant produces 27.6 million Btu of heat, 3100 grams (g) of sulfur dioxide, and 250 g of particulate matter (solid-particle pollutants). For each ton of B burned, the plant produces 30.2 million Btu, 6400 g of sulfur dioxide, and 360 g of particulate matter. a. How much heat does the steam plant produce when it burns x₁ tons of A and x₂ tons of B? b. Suppose the output of the steam plant is described by a vector that lists the amounts of heat, sulfur dioxide, and particulate matter. Express this output as a linear combination of two vectors, assuming that the plant burns x₁ tons of A and x₂ tons of B. c. [M] Over a certain time period, the steam plant produced 162 million Btu of heat, 23,610 g of sulfur dioxide, and 1623 g of particulate matter. Determine how many tons of each type of coal the steam plant must have burned. Include a vector equation as part of your solution. V 29. Let V₁...., Vk be points in R3 and suppose that for j = 1,..., k an object with mass m, is located at point v, . Physicists call such objects point masses. The total mass of the system of point masses is m = m₁ + ... + mk