Are vectors [1,0,0,2,1], [0,1,0,1,−4], and [0,0,1,−1,−1], and [3,1,5,2,−6] linearly independent? Are vectors v1=[−16,1,−39], v2=[2,6,3] and v3=[3,1,7]...

A. Suppose that v1, v2, v3 are linearly independant and w1=v1+v2, w2=v2-v3, w3= v2+v3. Determine whether...

A. Suppose that v1, v2, v3 are linearly independant and w1=v1+v2, w2=v2-v3, w3= v2+v3. Determine whether w1, w2, w3 are linear independent or linear deppendent. B. Find the largest possible number of independent vectors among: v1=(1,-1,0,0), v2=(1,0,-1,0), v3=(1,0,0,-1), v4=(0,1,-1,0), v5=(0,1,0,-1), v6=(0,0,1,-1)

If S=(v1,v2,v3,v4) is a linearly independent sequence of vectors in Rn then A) n = 4...

If S=(v1,v2,v3,v4) is a linearly independent sequence of vectors in Rn then A) n = 4 B) The matrix ( v1 v2 v3 v4) has a unique pivot column. C) S is a basis for Span(v1,v2,v3,v4)

Prove that Let S={v1,v2,v3} be a linearly indepedent set of vectors om a vector space V....

Prove that Let S={v1,v2,v3} be a linearly indepedent set of vectors om a vector space V. Then so are {v1},{v2},{v3},{v1,v2},{v1,v3}，{v2,v3}

Let {V1, V2,...,Vn} be a linearly independent set of vectors choosen from vector space V. Define...

Let {V1, V2,...,Vn} be a linearly independent set of vectors choosen from vector space V. Define w1=V1, w2= v1+v2, w3=v1+ v2+v3,..., wn=v1+v2+v3+...+vn. (a) Show that {w1, w2, w3...,wn} is a linearly independent set. (b) Can you include that {w1,w2,...,wn} is a basis for V? Why or why not?

Show that v1 and v2 are Linearly independent, then v1+v2 and v1-v2 are linearly independent as...

Show that v1 and v2 are Linearly independent, then v1+v2 and v1-v2 are linearly independent as well.

Determine all real numbers a for which the vectors v1 = (1,−1,1,a,2) v2 = (−1,0,0,1,0) v3...

Determine all real numbers a for which the vectors v1 = (1,−1,1,a,2) v2 = (−1,0,0,1,0) v3 = (1,2,a + 1,1,0) v4 = (2,0,a + 3,2a + 3,4) make a linearly independent set. For which values of a does the set contain at least three linearly independent vectors?

Consider four vectors v1 = [1,1,1,1], v2 = [-1,0,1,2], v3 = [a,1,0,b], and v4 = [3,2,a+b,0],...

Consider four vectors v1 = [1,1,1,1], v2 = [-1,0,1,2], v3 = [a,1,0,b], and v4 = [3,2,a+b,0], where a and b are parameters. Find all conditions on the values of a and b (if any) for which: 1. The number of linearly independent vectors in this collection is 1. 2. The number of linearly independent vectors in this collection is 2. 3. The number of linearly independent vectors in this collection is 3. 4. The number of linearly independent vectors in...

suppose {V1, V2 , V3 } is a pairwise orthogonal set of nonzero vectors in Rn....

suppose {V1, V2 , V3 } is a pairwise orthogonal set of nonzero vectors in Rn. Show that {V1, V2 , V3 } is also linear independent.

1. Prove that if {⃗v1, ⃗v2, ⃗v3} is a linear dependent set of vectors in V...

1. Prove that if {⃗v1, ⃗v2, ⃗v3} is a linear dependent set of vectors in V , and if ⃗v4 ∈ V , then {⃗v1, ⃗v2, ⃗v3, ⃗v4} is also a linear dependent set of vectors in V . 2. Prove that if {⃗v1,⃗v2,...,⃗vr} is a linear dependent set of vectors in V, and if⃗ vr + 1 ,⃗vr+2,...,⃗vn ∈V, then {⃗v1,⃗v2,...,⃗vn} is also a linear dependent set of vectors in V.

If S is the set of vectors in R^4 (S= {v1, v2, v3, v4, v5}) where,...

If S is the set of vectors in R^4 (S= {v1, v2, v3, v4, v5}) where, v1 = (1,2,-1,1), v2 = (-3,0,-4,3), v3 = (2,1,1,-1), v4 = (-3,3,-9,-6), v5 = (3,9,7,-6) Find a subset of S that is a basis for the span(S).