Let A =- 6 -2 -108 62 010 and w=21 Determine if w is in Col(A). Is w in Nul(A)?A. Yes, because Aw=B. No, because Aw=Determine if w is in Col(A). Choose the correct answer below.A. The vector w is not in Col(A) because w is a linear combination of the columns of A.B. The vector w is not in Col(A) because Ax = w is an inconsistent system.MC. The vector w is in Col(A) because Ax = w is a consistent system.D. The vector w is in Col(A) because the columns of A span R³Is w in Nul(A)? Select the correct choice below and fill in the answer box to complete your choice.OOD4

Answered: Image /qna-images/answer/0129a558-8e57-4673-8289-422897790747.jpg

Answered: Let A = - 6 -2 -10 8 6 10 2 0 4 and w=…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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2. a. In each part express the vector as a linear combination of 2+x+4x², p₂ = 1 − x + 3x², and p3 = 3 + 2x + 5x². pi i. -9-7x - 15x² ii. 6+11x + 6x² = iii. O iv. 7 + 8x + 9x² b. Suppose that vi = = (2, 1, 0, 3), v₂ = (3, −1, 5, 2), and №3 = (–1, 0, 2, 1). Which of the following vectors are in span {1, 2, 3}? i. (2, 3, -7,3) ii. (0,0,0,0) iii. (1,1,1,1) iv. (-4, 6, -13, 4)
Find a vector orthogonal to (0,2,2) and (-2,4,0). Choose the correct answer below. O A. (-8,-4,-4) B. (-8,-4,4) C. (8,-4,4) D. (-8,4,4)
Determine if v is in the set spanned by the columns of B. B= 8-3 2 -9 4-7 6-2 4 5 -1 10 V= 12 -11 10 11 GETOP Choose the correct answer below and, if necessary, fill in the answer box(es) to complete your choice. OA. Vector v is not in the set spanned by the columns of B because the columns of B, b,, b₂, and b, are linearly independent. B. Vector v is not in the set spanned by the columns of B because the reduced echelon form of the matrix formed by writing B with a fourth column equal to v is OC. Vector v is in the set spanned by the columns of B because the columns of B span R¹. OD. Vector v is in the set spanned by the columns of B because b₁ b₂+ b3 FV. +
Q3. Find the cross product of the vectors and .
Consider the vectors , v = , and w=. Simplify the expressions on the left column and match its value on the right column. u = zu + v 2v - w w + (u + v) W zu (v - w) - U :: :: :: :: :: :: :: ::
Two vectors, and w, are shown. Determine which of the following describes the unlabeled vector. i. ii. iii. iv. v - W W-V v + w -W-v 12 13
To be solved b and c not a
Which pairs of vectors are parallel? Select all that apply. OA. 10i – 15k, –4i + 6k В. 3і + 4j, —12i — 12j — 4k OC. 6і + 5k, 6і + 12) OD. -2i + 4j + 5k, 4i – 8j – 10k E. Зі — 2j + 5k, —6і + 6ј — 15k
Express the indicated vector w as a linear combination of the given vectors v₁ and v₂ if this is possible. If not, show that it is impossible. W = -7 - 9 - 2 3 5 8 -4 - 3 Select the correct answer below, and fill in the answer box(es) to complete your choice. ) v₁ + ( ) v₂. A. It is possible to express the vector w in terms of v₁ and v₂, as w= (Type integers or fractions.) B. It is impossible to express the vector w in terms of V₁ and V₂, because an echelon form of the augmented matrix [V₁ V₂ W], E= (Type an integer or simplified fraction for each matrix element.) shows that the system is inconsistent.
Let A = -6 -4 - 10 4 6 2 0 10 and w= 2 $ 1 Determine if w is in Col(A). Is w in Nul(A)? 1 Determine if w is in Col(A). Choose the correct answer below. O A. The vector w is not in Col(A) because w is a linear combination of the columns of A. OB. The vector w is in Col(A) because Ax = w is a consistent system. OC. The vector w is in Col(A) because the columns of A span R³. O D. The vector w is not in Col(A) because Ax=w is an inconsistent system.

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