Understanding Vectors and Linear Dependence

A plane in R3

A line in R2

A cube in R3

A point in R2

They lie on the same line

They are linearly independent

They form a plane

They are orthogonal

All vectors are parallel

All vectors are orthogonal

One vector can be expressed as a combination of others

The vectors form a basis for R3

The vectors are orthogonal

The vectors form a plane

Vector 3 is a sum of vectors 1 and 2

All vectors are multiples of each other

A point in R2

A plane in R3

A line in R2

The entire R2 space

A single vector that spans a space

A set of orthogonal vectors

A set of vectors that span a space without redundancy

A set of linearly dependent vectors

The span becomes a line

The span becomes a point

The span becomes a plane

The span remains unchanged

If they form a line

If they are all zero vectors

If they form a plane

If no vector can be expressed as a combination of others

They cannot be expressed as a combination of each other

They are collinear

They are all zero vectors

They lie on the same plane

The vectors must be collinear

The vectors must be linearly independent

The vectors must be linearly dependent

The vectors must be coplanar