Must every linearly dependent set have a subset that is dependent and a subset that is...

True or False. Explain. Every subset of a linearly independent set is linearly independent.

True or False. Explain. Every subset of a linearly independent set is linearly independent.

Prove that if a subset of a set of vectors is linearly dependent, then the entire...

Prove that if a subset of a set of vectors is linearly dependent, then the entire set is linearly dependent.

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 say you have a 4 row, 7 column Matrix A that is linearly dependent. How...

Let's say you have a 4 row, 7 column Matrix A that is linearly dependent. How do you find a subset of A that is a basis for R4 and why that set forms a basis for R4?

Show if the set {sinx, sin2x, sin3x} is linearly independent or dependent over R.

Show if the set {sinx, sin2x, sin3x} is linearly independent or dependent over R.

[Q] Prove or disprove: a)every subset of an uncountable set is countable. b)every subset of a...

[Q] Prove or disprove: a)every subset of an uncountable set is countable. b)every subset of a countable set is countable. c)every superset of a countable set is countable.

Let S={v1,...,Vn} be a linearly dependent set. Use the definition of linear independent / dependent to...

Let S={v1,...,Vn} be a linearly dependent set. Use the definition of linear independent / dependent to show that one vector in S can be expressed as a linear combination of other vectors in S. Please show all work.

Answer the following T for True and F for False: __ A vector space must have...

Answer the following T for True and F for False: __ A vector space must have an infinite number of vectors to be a vector space. __ The dimension of a vector space is the number of linearly independent vectors contained in the vector space. __ If a set of vectors is not linearly independent, the set is linearly dependent. __ Adding the zero vector to a set of linearly independent vectors makes them linearly dependent.

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]

if {Av1,Av2,..., Avk} is linearly dependent set of vectors in Rn and A is an nxn...

if {Av1,Av2,..., Avk} is linearly dependent set of vectors in Rn and A is an nxn invertible matrix, the {v1,v2,...vk} is also a linearly dependent set of vectors in Rn