5. Section 2.9 The vector x is in the subspace H with basis B {b1,b2}. Find...
x = [12,11,3] is a vector in subspace H with orthogonal basis B = {b1,b2} where b1 = [3,1,-3],b=[2,3,3] Find Coordinate vector [x]B
Find the coordinate vector [x]B of x relative to the given basis 8-{b1 ,b2} 2 2 2 -14 3 4 [xlB (Simplify your answers.)
2) The vector is in the subspace H with a basis B = {1,5}. Find the B-coordinate vector of 3 5x = [-2], 62 = (-). =) Answer:
1) for R2 Given the vectors b1,b2, C1, and cz. B = {b1,b2} is a basis for R2C = {C1,C2} is a basis b = [i.bz = [33],4 = (-2) c2 = [4] (a) Find the change of coordinates matrix to convert from B to C. (b) Find the coordinate vectors [x]B, [x]c, lyle and [ylc given x = [11] y = [12]
please help. system is sensitive to answers. Find the coordinate vector (x]a of the vector x relative to the given basis B. 16 and B = (b, b2} b = b2 -4 -2 -5 28 O A. -64 -196 ов. -32 -64 32 D. 41 5. Find the vector x determined by the given coordinate vector [x]g and the given basis B. -2 -3 -3 -3 -5 -3 - 11 ОВ. хв - 20 18 OA X= 33 - 15...
Find the coordinate vector [x]g of x relative to the given basis B = {51,b2,b3}: 1 2 2 by = -3 b3 = b -1 x= -5 4 5 4 [x] = (Simplify your answers.)
Let B = {b1,b2, b3} be a basis for a vector space V. Let T be a linear transformation from V to V whose matrix relative to B is [ 1 -1 0 1 [T]B = 2 -2 -1 . 10 -1 -3 1 Find T(-3b1 – b2 - b3) in terms of bı, b2, b3 .
Find the coordinate vector Find the coordinate vector [X]e of x relative to the given basis B = {b1,b2,63). [x]8 = (Simplify your answers.)
Question 12: B1 = (0.00 is a basis for a subspace S of R4. Use the Gram-Schmidt process on the basis B1 to produce an orthogonal basis B2 for S.
(Linear Algebra) Please explain how to get to the answers step by step. Answers Provided. The vector x is in a subspace H with a basis ß lb1, b2). Find the ß-coordinate vector of x. 10 -3 25 Objective: (2.9) Find Beta-Coordinate Vector of x Determine the rank of the matrix. 1-2 3 -5 16) 2 -4 8 -6 3 6-915 Objective: (2.9) Determine Rank of Matrix We were unable to transcribe this image