Understanding Subspaces and Orthogonal Complements

Their dimensions add up to n.

Their dimensions are equal.

Their dimensions are unrelated.

Their dimensions are always zero.

A basis vector

A unit vector

The zero vector

Any vector in Rn

It is a unit vector.

It is orthogonal to all vectors in the subspace.

It can be expressed as a linear combination of the subspace's basis vectors.

It is the zero vector.

It is a unit vector.

It is the zero vector.

It is a basis vector.

It is a random vector.

k

n

n - k

k + n

They are all zero vectors.

They can be expressed as a linear combination of each other.

They span the entire space.

The only solution to their linear combination equaling zero is all coefficients being zero.

As a quotient of vectors from V and V perp

As a difference of vectors from V and V perp

As a product of vectors from V and V perp

As a sum of a vector from V and a vector from V perp

They are dependent on each other.

They cannot span Rn.

They are all zero vectors.

They form a basis for Rn.

A set that spans only V

A dependent set

A linearly independent set that forms a basis for Rn

A set of zero vectors

The vectors are identical.

The vectors are orthogonal.

The vectors are linearly dependent.

The vectors are linearly independent.