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MAT 202, Homework #7, Summer 2016 Name _______________________________________________ Instructions: Write your work up neatly and attach to this page. Use exact values unless specifically asked to round. Show all work. 2 1 3 1. Show that the vectors π’ β 1 = [β3] , π’ β 2 = [ 2 ],π’ β 3 = [1] form an orthogonal basis for β3 . Make this 0 β1 4 5 basis an orthonormal basis, and then use that basis to find the representation of π₯ = [β3] in that 1 βπ π₯ βπ’ basis using the formula π₯ = π1 π’ β 1 + π2 π’ β 2 + π3 π’ β 3 π€βπππ ππ = π’β βπ’β (π = 1,2,3). π π 2. Verify that the given set of vectors {u1,...,un} is orthogonal, and then write π₯ as a pair of vectors π₯β₯ πππ ββββ βββ π₯β₯ , with W defined as the span of the specified vectors and βββ π₯β₯ in W. What is the best approximation to π₯ in W? What is the distance from the subspace to the point π₯ . 4 1 β2 1 β1 a. π’ β 1 = [2] , π’ β 2 = [ 1 ],π’ β 3 = [ 1 ],π’ β 4 = [ 1 ] , π = ππππ{π’ β 1, π’ β 2, π’ β 3 }, π₯ = [ 5 ] β3 1 β1 β2 1 1 1 β1 β2 3 b. 1 β1 β1 π’ β 1 = [ 1] , π’ β 2 = [ 1 ] , π = ππππ{π’ β 1, π’ β 2 }, π₯ = [ 4 ] 0 3 0 1 3 1 0 1 0 β1 c. π’ β 1 = [ ],π’ β 2 = [ ],π’ β 3 = [ ] , π = ππππ{π’ β 1, π’ β 2, π’ β 3 }, π₯ = [4] 0 5 1 1 β1 1 β1 6 3. The given set is a basis for a subspace W. Use the Gram-Schmidt process to produce an orthogonal basis for W. 3 β5 2 4 a. [β5] , [β1] b. [β1] , [ 9 ] 2 β9 1 2 β1 3 5/6 β1/6 1/6 5/6 4. The columns of π = [ ] were obtained by applying the Gram-Schmidt process to the β3/6 1/6 1/6 3/6 5 9 1 7 ]. Find an upper triangular matrix R such that A=QR. Check your work. columns of π΄ = [ β3 β5 1 5 5. For each statement below determine if it is true or false. If the statement is false, briefly explain why it is false and give the true statement. a. If the columns of an nxp matrix U are orthonormal, then UUTπ¦ is the orthogonal projection of π¦ onto the column space of U. π β βπ’ βπ π¦ π’ βββ βπ π π’π βπ’ b. In the Orthogonal Decomposition Theorem, each term in the formula π¦β₯ = βπ=1 β is itself an orthogonal projection of π¦ onto a subspace of W. c. If π΄ = ππ where Q has orthonormal columns, then π = π π π΄. d. In a QR factorization, say A=QR (when A has linearly independent columns), the columns of Q form an orthonormal basis for the column space of A. e. The range of a linear transformation is a vector space. f. If A is a 3x5 matrix and T is a linear transformation defined by T ( x) ο½ Ax , then domain of T is π 3. g. Every linear transformation is a matrix transformation and every matrix transformation is a linear transformation. h. A linear transformation preserves the operations of vector addition and scalar multiplication. i. A linear transformation π: π π β π π is completely determined by its effects on the columns of the nxn identity matrix. j. When two linear transformations are performed one after another, the combined effect may not always be a linear transformation. k. If A is a 3x2 matrix, then the transformation x l. Ax cannot be one-to-one. The columns of the standard matrix for a linear transformation from π: π π β π π are the images of the columns of the nxn identity matrix under T. 6. Let T be defined by T ( x) ο½ Ax . Find a vector x whose image under T is b , and determine whether x is unique. a. b. ο©1 Aο½οͺ ο«2 ο©1 οͺ3 Aο½οͺ οͺ0 οͺ ο«1 ο2 ο5 ο3 ο8 1 0 3οΉ ο© ο6οΉ , b ο½ οͺ ο4οΊ 6οΊο» ο« ο» 2οΉ ο©1οΉ οͺ6οΊ 8 οΊοΊ ,b ο½ οͺ οΊ οͺ3οΊ 2οΊ οΊ οͺ οΊ 8ο» ο«10ο» 7. How many rows and columns must a matrix have in order to define a mapping from π 5 into π 7 by the rule T ( x) ο½ Ax . ο©1οΉ ο«3ο» ο© ο2οΉ οΊ and their images under the given ο«5ο» 8. Use a rectangular coordinate system to plot u ο½ οͺ οΊ , v ο½ οͺ transformation T. Describe geometrically what T does to each vector inπ 2. Plot each on a separate graph. Label each transformation as one-to-one, onto, both or neither. ο©2 T ( x) ο½ οͺ ο«0 ο©0 T ( x) ο½ οͺ b. ο«1 a. 0 οΉ ο© x1 οΉ 2οΊο» οͺο« x2 οΊο» 1οΉ ο© x1 οΉ 0οΊο» οͺο« x2 οΊο» ο©0 0οΉ ο© x1 οΉ T ( x) ο½ οͺ οΊοͺ οΊ ο«0 3ο» ο« x2 ο» ο© cos ο± sin ο± οΉ ο© x1 οΉ ο° ,ο± ο½ d. T ( x) ο½ οͺ οͺ οΊ οΊ 3 ο« ο sin ο± cos ο± ο» ο« x2 ο» c. ο© cos ο± ο« ο sin ο± e. T ( x) ο½ οͺ sin ο± οΉ ο© x1 οΉ 5ο° ,ο± ο½ οͺ οΊ οΊ cos ο± ο» ο« x2 ο» 4 9. An affine transformation π: π π β π π has the form T ( x) ο½ Ax ο« b with A an mxn matrix and b in π π . Show that T is not a linear transformation when b οΉ 0 .