Find an example of a nonzero, non-Invertible 2x2 matrix A and a linearly independent set {V,W}...

Give an counter example or explain why those are false a) every linearly independent subset of...

Give an counter example or explain why those are false a) every linearly independent subset of a vector space V is a basis for V b) If S is a finite set of vectors of a vector space V and v ⊄span{S}, then S U{v} is linearly independent c) Given two sets of vectors S1 and S2, if span(S1) =Span(S2), then S1=S2 d) Every linearly dependent set contains the zero vector

Let S={u,v,w}S={u,v,w} be a linearly independent set in a vector space V. Prove that the set...

Let S={u,v,w}S={u,v,w} be a linearly independent set in a vector space V. Prove that the set S′={3u−w,v+w,−2w}S′={3u−w,v+w,−2w} is also a linearly independent set in V.

Give an example of a nondiagonal 2x2 matrix that is diagonalizable but not invertible. Show that...

Give an example of a nondiagonal 2x2 matrix that is diagonalizable but not invertible. Show that these two facts are the case for your example.

Suppose A is a 2x2 matrix with vectors v1=(-12, 10) v2=(-15,13). Find an invertible matrix P...

Suppose A is a 2x2 matrix with vectors v1=(-12, 10) v2=(-15,13). Find an invertible matrix P and a diagonal matrix D so that A=PDP-1. Use your answer to find an expression for A7 in terms of P, a power of D, and P-1 in that order.

Let A be a 2x2 matrix 6 -3 -4 2 first, find all vectors V so...

Let A be a 2x2 matrix 6 -3 -4 2 first, find all vectors V so the distance between AV and the unit basis vector e_1 is minimized, call this set of all vectors L. Second, find the unique vector V0 in L such that V0 is orthogonal to the kernel of A. Question: What is the x-coordinate of the vector V0 equal to. ?/? (the answer is a fraction which the sum of numerator and denominator is 71)

Prove that the span of three linearly independent vectors, u, v, w is R3

Prove that the span of three linearly independent vectors, u, v, w is R3

Prove this: Given that V is a linearly dependent set of vectors, show that there exists...

Prove this: Given that V is a linearly dependent set of vectors, show that there exists a nontrivial linear combination of the vectors of V that yields the zero vector.

If v1 and v2 are linearly independent vectors in vector space V, and u1, u2, and...

If v1 and v2 are linearly independent vectors in vector space V, and u1, u2, and u3 are each a linear combination of them, prove that {u1, u2, u3} is linearly dependent. Do NOT use the theorem which states, " If S = { v 1 , v 2 , . . . , v n } is a basis for a vector space V, then every set containing more than n vectors in V is linearly dependent." Prove without...

Find a linearly independent set of vectors that spans the same subspace of R3 as that...

Find a linearly independent set of vectors that spans the same subspace of R3 as that spanned by the vectors [-3,1,3] , [-6,5,5],[0,-3,1] Linearly independent set: [x,y,z] , [x,y,z]

4. Prove the Following: a. Prove that if V is a vector space with subspace W...

4. Prove the Following: a. Prove that if V is a vector space with subspace W ⊂ V, and if U ⊂ W is a subspace of the vector space W, then U is also a subspace of V b. Given span of a finite collection of vectors {v1, . . . , vn} ⊂ V as follows: Span(v1, . . . , vn) := {a1v1 + · · · + anvn : ai are scalars in the scalar field}...