They are less important than three-dimensional vectors.

They are easier to visualize and understand.

They require more computational power.

They are more complex to understand.

They only apply to two-dimensional transformations.

They are irrelevant in three-dimensional space.

They are used to describe the transformation completely.

They determine the color of the vectors.

j-hat

l-hat

k-hat

i-hat

Nine

Three

Six

Twelve

It moves to the z-axis.

It moves to the x-axis.

It stays in its original position.

It disappears.

Divide the vector by the matrix.

Subtract the vector from the matrix.

Multiply the vector's coordinates by the matrix columns and add the results.

Add the vector to the matrix.

Apply the transformation of the right matrix first.

Add the matrices together.

Subtract the matrices.

Apply the transformation of the left matrix first.