Understanding One-to-One Transformations

Surjective

Bijective

Injective

Projective

Zero or one

Infinite

Exactly two

At least one

No input has an output

Different inputs have different outputs

Every input has multiple outputs

Different inputs can have the same output

Every output has multiple inputs

No input has an output

Multiple inputs have the same output

Every input has a unique output

The matrix has no pivots

The columns of the matrix are linearly dependent

The kernel contains only the zero vector

The range of T has dimension less than n

The transformation is not one-to-one

The matrix is not invertible

The transformation is one-to-one

The matrix is singular

Check if the matrix is square

Find the inverse of the matrix

Write the matrix in row echelon form

Calculate the determinant

No output for any input

Infinite outputs for a single input

Same output for different inputs

Different outputs for the same input

There is no solution

The solution is unique

There are multiple solutions

There is only the trivial solution

A transformation with no outputs

A one-to-one transformation

A transformation projecting onto a plane

A transformation with infinite inputs