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1. Consider the following two ordered bases: Bu = {(5), (3) B2 = { 1-2) /1...
(1 point) Consider the ordered bases B-(_ (5 + 9z) ,-(1 + 2) and C-(1-42, 3}...
(1 point) Consider the ordered bases B-(_ (5 + 9z) ,-(1 + 2) and C-(1-42, 3} for the vector space P2 c. Find the transition matrix from & to B -2 2 -10 f. Find the coordinates of q(z) in the ordered basis B if the coordinate vector of q(z) in C is [q(z)]c g(z)] B
2 question ---------------------------------------------------------- (1 point) Consider the ordered bases B =( (8-4] [: • and c-...
2 question
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(1 point) Consider the ordered bases B =( (8-4] [: • and c- (- -)( :} ) for the vector space V of lower triangular 2 x 2 matrices with zero trace. a. Find the transition matrix from C to B. TB = b. Find the coordinates of Min the ordered basis B if the coordinate vector of Min C is [Mc= [MB = C. Find M. M= (1 point) Consider the ordered bases B [ 1...
(1 point) Consider the ordered bases B = (1 – X,4 – 3x) and C =...
(1 point) Consider the ordered bases B = (1 – X,4 – 3x) and C = (-(3 + 2x), 4x – 2) for the vector space P2[x]. a. Find the transition matrix from C to the standard ordered basis E = (1, x). -3 2 TE = -2 b. Find the transition matrix from B to E. 1 -1 T = 4 -3 c. Find the transition matrix from E to B. -3 1 T = 4/7 -1/7 d. Find...
(1 point) Consider the ordered bases B = {-(7 + 3x), –(2+ x)} and C =...
(1 point) Consider the ordered bases B = {-(7 + 3x), –(2+ x)} and C = {2,3 + x} for the vector space P2. a. Find the transition matrix from C to the standard ordered basis E = {1,x}. TE = b. Find the transition matrix from B to E. Te = c. Find the transition matrix from E to B. 100 TB = d. Find the transition matrix from C to B. TB = 11. !!! e. Find the...
(1 point) Consider the ordered bases B = a. Find the transition matrix from C to...
(1 point) Consider the ordered bases B = a. Find the transition matrix from C to B. 3 01 To Olmedi 011-3 0. *1 for the vector space V of lower triangular 2 x 2 matrices with zero trace. 3 4 01) and C=-5 -1/'1-23] b. Find the coordinates of M in the ordered basis B if the coordinate vector of M in C is M c [ MB = C. Find M. M =
only for c,d and e Question 6 (12 marks) Consider the ordered bases - { and...
only
for c,d and e
Question 6 (12 marks) Consider the ordered bases - { and -3 0 of M22 (you do not need to prove that they M2,2 defined by bases) and the linear transformation T: M22 - are T(Q) 2Q (a) Verify that T is a linear transformation (b) Find the kernel of T (c) Find the transition matrix Psg from B to S (d) Use your answer in part (c) to calculate the transition matrix PBs from...
(a) Consider the system i = Ax + bu where 1-1::) and b = (b1 b2)....
(a) Consider the system i = Ax + bu where 1-1::) and b = (b1 b2). Derive a necessary and sufficient condition on the matrix b (i.e., bi and b2) for complete controllability of the system. (b) Same as part (a), except that 0 -1 A= 1 0
solution of question d (4 points) Consider the basis of R5 given by with b2 (2,-1,-5,-4,7), b3-(3, 2,-7,-5,9) b4 2,1,4,...
solution of question d
(4 points) Consider the basis of R5 given by with b2 (2,-1,-5,-4,7), b3-(3, 2,-7,-5,9) b4 2,1,4,4,-5) bs (-1,0,1,2,0) The MATLAB code to produce the basis vectors is given by b1 11,0-2-2.3], b2 -12-1.-5-4,7T, b3 13-2-7-5,91, b4 [-2,14.4-5T, b5 1-1,0,1,20 Let S denote the standard basis for R a Find the transition matrix P P,s PB,s b. Use the previous answer to calculate the coordinate matrix of the vector z ( 1,5, 4, 3, 3) with respect...
linear algebra do all parts A,B,C and D please 1. Let B = {bi, b2)- and...
linear algebra
do all parts A,B,C and D please
1. Let B = {bi, b2)- and C-(C1 , С2)- 111,12 be two ordered bases for R2 and VE then perform each of the following tasks. (a) Write v as then set up the augmented matrix for this linear combination and put your matrix in reduced row echelon form (not row echelon form) using pencil and paper calculations. Use your answer to state the coordinate vector VB (b) Write v as...
3. (6 marks) For b1,b2, 63, 64 € R, consider the linear system of equations +...
3. (6 marks) For b1,b2, 63, 64 € R, consider the linear system of equations + 21 + 22 -11 + 22 23 624 = bi 3.13 + 2014 b2 23 + 2:04 b3 603 + 20:24 = 54 *) 21 + 2:01 + 4.22 where 11, 12, 13, 14 ER. (a) Find a system of equations that bı, b2, 63, 64 must satisfy in order for (+) to be consistent. bi [ must satisfy so (+) is (b) Using...
(1 point) Consider the ordered bases B-(_ (5 + 9z) ,-(1 + 2) and C-(1-42, 3} for the vector space P2 c. Find the transition matrix from & to B -2 2 -10 f. Find the coordinates of q(z) in the ordered basis B if the coordinate vector of q(z) in C is [q(z)]c g(z)] B
2 question
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(1 point) Consider the ordered bases B =( (8-4] [: • and c- (- -)( :} ) for the vector space V of lower triangular 2 x 2 matrices with zero trace. a. Find the transition matrix from C to B. TB = b. Find the coordinates of Min the ordered basis B if the coordinate vector of Min C is [Mc= [MB = C. Find M. M= (1 point) Consider the ordered bases B [ 1...
(1 point) Consider the ordered bases B = (1 – X,4 – 3x) and C = (-(3 + 2x), 4x – 2) for the vector space P2[x]. a. Find the transition matrix from C to the standard ordered basis E = (1, x). -3 2 TE = -2 b. Find the transition matrix from B to E. 1 -1 T = 4 -3 c. Find the transition matrix from E to B. -3 1 T = 4/7 -1/7 d. Find...
(1 point) Consider the ordered bases B = {-(7 + 3x), –(2+ x)} and C = {2,3 + x} for the vector space P2. a. Find the transition matrix from C to the standard ordered basis E = {1,x}. TE = b. Find the transition matrix from B to E. Te = c. Find the transition matrix from E to B. 100 TB = d. Find the transition matrix from C to B. TB = 11. !!! e. Find the...
(1 point) Consider the ordered bases B = a. Find the transition matrix from C to B. 3 01 To Olmedi 011-3 0. *1 for the vector space V of lower triangular 2 x 2 matrices with zero trace. 3 4 01) and C=-5 -1/'1-23] b. Find the coordinates of M in the ordered basis B if the coordinate vector of M in C is M c [ MB = C. Find M. M =
only
for c,d and e
Question 6 (12 marks) Consider the ordered bases - { and -3 0 of M22 (you do not need to prove that they M2,2 defined by bases) and the linear transformation T: M22 - are T(Q) 2Q (a) Verify that T is a linear transformation (b) Find the kernel of T (c) Find the transition matrix Psg from B to S (d) Use your answer in part (c) to calculate the transition matrix PBs from...
(a) Consider the system i = Ax + bu where 1-1::) and b = (b1 b2). Derive a necessary and sufficient condition on the matrix b (i.e., bi and b2) for complete controllability of the system. (b) Same as part (a), except that 0 -1 A= 1 0
solution of question d
(4 points) Consider the basis of R5 given by with b2 (2,-1,-5,-4,7), b3-(3, 2,-7,-5,9) b4 2,1,4,4,-5) bs (-1,0,1,2,0) The MATLAB code to produce the basis vectors is given by b1 11,0-2-2.3], b2 -12-1.-5-4,7T, b3 13-2-7-5,91, b4 [-2,14.4-5T, b5 1-1,0,1,20 Let S denote the standard basis for R a Find the transition matrix P P,s PB,s b. Use the previous answer to calculate the coordinate matrix of the vector z ( 1,5, 4, 3, 3) with respect...
linear algebra
do all parts A,B,C and D please
1. Let B = {bi, b2)- and C-(C1 , С2)- 111,12 be two ordered bases for R2 and VE then perform each of the following tasks. (a) Write v as then set up the augmented matrix for this linear combination and put your matrix in reduced row echelon form (not row echelon form) using pencil and paper calculations. Use your answer to state the coordinate vector VB (b) Write v as...
3. (6 marks) For b1,b2, 63, 64 € R, consider the linear system of equations + 21 + 22 -11 + 22 23 624 = bi 3.13 + 2014 b2 23 + 2:04 b3 603 + 20:24 = 54 *) 21 + 2:01 + 4.22 where 11, 12, 13, 14 ER. (a) Find a system of equations that bı, b2, 63, 64 must satisfy in order for (+) to be consistent. bi [ must satisfy so (+) is (b) Using...
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