Determine whether the following set of vectors is a basis for M2(R): (−2 0 1 2)...

Use MATLAB to determine whether the given set of vectors spans R4. (a) {(1, -2, 3,...

Use MATLAB to determine whether the given set of vectors spans R4. (a) {(1, -2, 3, 4), ( 2, 4, 5, 0), ( -2, 0, 0, 4 ), (3, 2, 1, -4)}

Determine if the vectors v1= (3, 0, -3, 6), v2 = ( 0, 2, 3, 1),...

Determine if the vectors v1= (3, 0, -3, 6), v2 = ( 0, 2, 3, 1), and v3 = (0, -2, 2, 0 ) form a linearly dependent set in R 4. Is it a basis of R4 ?

2. Find a basis for R 4 that contains the vectors X = (1, 0, 0,...

2. Find a basis for R 4 that contains the vectors X = (1, 0, 0, 1) and Y = (1, 1, 0, 1). Note: I'm not looking for the orthogonal basis, im looking for a basis that contains those 2 vectors.

Determine whether the given set of vectors is linearly dependent or independent. ?? = [5 1...

Determine whether the given set of vectors is linearly dependent or independent. ?? = [5 1 2 1], ?? = [−1 1 2 − 1], ?? = [7 2 4 1]

Do the vectors v1 =   1 2 3   , v2 = ...

Do the vectors v1 =   1 2 3   , v2 =   √ 3 √ 3 √ 3   , v3   √ 3 √ 5 √ 7   , v4 =   1 0 0   form a basis for R 3 ? Why or why not? (b) Let V ⊂ R 4 be the subspace spanned by the vectors a1 and a2, where a1 =   ...

Decide whether the following set of vectors are linearly independent or dependent. Justify the answer! a)...

Decide whether the following set of vectors are linearly independent or dependent. Justify the answer! a) In R^3: v1=(0,2,3), v2=(3,-1,4), v3=(3,2,2) b) In R^3: u1=(1,2,0), u2=(2,1,3), u3=(4,2,-1), u4=( 2,1,4) c) In Matriz 2x2: A= | 1 6 | B= | 1 4 |    C= | 1 4 | |-1 4 |,    | 3 2 |,    | 2 -4 |   

(a) Do the vectors v1 = 1 2 3 , v2 = √ 3 √ 3...

(a) Do the vectors v1 = 1 2 3 , v2 = √ 3 √ 3 √ 3 , v3=√ 3 √ 5 √ 7, v4 = 1 0 0 form a basis for R 3 ? Why or why not? (b) Let V ⊂ R 4 be the subspace spanned by the vectors a1 and a2, where a1 = (1 0 −1 0) , a2 = 0 1 0 −1. Find a basis for the orthogonal complement V ⊥...

3. (a) (2 marks) Consider R 3 over R. Show that the vectors (1, 2, 3)...

3. (a) Consider R 3 over R. Show that the vectors (1, 2, 3) and (3, 2, 1) are linearly independent. Explain why they do not form a basis for R 3 . (b) Consider R 2 over R. Show that the vectors (1, 2), (1, 3) and (1, 4) span R 2 . Explain why they do not form a basis for R 2 .

Define T : M2×2(R) → M2×2(R) by T(A) = A − A^t . a) Determine the...

Define T : M2×2(R) → M2×2(R) by T(A) = A − A^t . a) Determine the rank and nullity of T. b) Find bases for the nullspace N(T) and the range R(T) of T c) Show that the only nonzero eigenvalue for T is λ = 2. d) Find a basis for the eigenspace belonging to λ = 2.

two vectors equal⟨1,−3,−2⟩andv=⟨−2,−1,−1⟩determineaplanein space. Without using linear algebra and or row reduction, determine whether the following...

two vectors equal⟨1,−3,−2⟩andv=⟨−2,−1,−1⟩determineaplanein space. Without using linear algebra and or row reduction, determine whether the following vectors lie in the plane formed by u and v. A. ⟨8, 4, 4⟩ B. ⟨1, 3, −1⟩ C. ⟨6, −4, −2⟩