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(1) Let u = (-1,2) and v = (3, 1). (a) (5] Find graphically the vector w = (2u - v). (b) (5] Find algebraically the vector z=3u - 2 (2) (a) [5] Write u ='(1, -5, -1) as a linear combination of v1 = (1,2,0), v2 = (0,1,-1), V3 = (2,1,1). (b) (5] Are the 4 vectors u, V1, V2, V3 linearly independent? Explain your answer. (C) (5) Are the 2 vectors V, V3 linearly independent? Explain your answer....
3 - 2 Let u= Note that {u, v, w} is an orthogonal set of vectors and w - -3 4 9 be a vector in subspace W, where W = Span{u, v, w}. Let y= 11 -27 Write y as a linear combination of u, v, and uw, i.e. y = ciu + cqũ + c3W. Answer: y=
4 4. Here are two vectors in R". Let V - the span of fv,v,). a. Find an orthogonal basis for V (the orthogonal complement of V). You get an extra point for expressing your basis as vectors with integer components. b. Find a vector that is neither completely in V, nor completely in c. Find a vector in V which is a unit vector.
Using Wolfram Mathematica to solve the problem (1) Given the two vectors u = <6, -2, 1> and v = <1, 8, -4> Find u x v, and find u V a) b) Find angle between vectors u and v. c) Graph both u and V on the same system. d) Now, graph vectors u, V and on the same set of axes and give u x V a different color than vectors u and V. Rotate graph from part...
2. Let v= [6, 1, 2], w = [5,0, 3), and P= (9, -7,31). (i) Find a vector u orthogonal to both v and w. (ii) Let L be the line in R3 that passes through the point P and is perpendicular to both of the vectors v and w. Find an equation for the line L in vector form. (iii) Find parametric equations for the line L.
Outside help permitted. v-w-Find a vector in R' which is not in span(u.v, w) 4 4. Show that if u, v, and w are linearly independent vectors then so are u+v, v+w, and u+w.
Please show the detail, thank you! (1 point) (a) Let -4 -7 -2 -4 V1 = and V2 = 1 6 0 2 and let W = span{V1, V2}. Apply the Gram-Schmidt procedure to vi and V2 to find an orthogonal basis {uj, u2 } for W. uj = U2 = -13 2 (b) Consider the vector v = - Find V' E W such that || V – v' || is as small as possible. 15 8 V =...
please help me with part a) (1 point) Let V be the vector space P3 [x] of polynomials in x with degree less than 3 and W be the subspace W - span((-4)+ 5x2,4 +5x 7x2 a. Find a nonzero polynomial pr) in W b. Find a polynomial q(x) in V\ W. qx)1-2xA2+5
Question 1 Question 2 Let u, v, w be three vectors in R4 with the property that 4u - 30+2w = 0. Let A be the 4 x 2 matrix whose columns are u and u (in that order). Find a solution to the equation Ac =W. Let 1 -2 0 3 A=1 -2 2-1 2 -4 1 4 Find a list of vectors whose span is the set of solutions to Ax = 0. 1 1 Enter the list...
Let A be an m × n matrix, let x Rn and let 0 be the zero vector in Rm. (a) Let u, v є Rn be any two solutions of Ax 0, and let c E R. Use the properties of matrix-vector multiplication to show that u+v and cu are also solutions of Ax O. (b) Extend the result of (a) to show that the linear combination cu + dv is a solution of Ax 0 for any c,d...