Understanding Linear Transformations and Matrices

The input and output vectors must have the same number of components.

The number of components in the input and output vectors can vary.

The output vector always has more components than the input vector.

The input vector always has more components than the output vector.

The number of rows in the transformation matrix.

The number of columns in the transformation matrix.

The number of components in the output vector.

The number of transformations applied.

5 by 5

6 by 6

6 by 5

5 by 6

Matrix A is the input vector.

Matrix A is the output vector.

Matrix A is the transformation matrix.

Matrix A is the identity matrix.

3 by 3

6 by 6

6 by 3

3 by 6

The number of transformations applied.

The number of components in the input vector.

The number of columns in the matrix.

The number of rows in the matrix.

The matrices must be square matrices.

Both matrices must have the same dimensions.

The number of columns in the first matrix must equal the number of rows in the second matrix.

The number of rows in the first matrix must equal the number of columns in the second matrix.

The dimensions of the second matrix.

The sum of the dimensions of both matrices.

The outer dimensions of the matrices being multiplied.

The dimensions of the first matrix.

To ensure the output vector is larger than the input vector.

To ensure the matrices have the same dimensions.

To ensure the multiplication is defined.

To ensure the matrices are square.

It is a 6 by 6 matrix.

It is a 3 by 3 matrix.

It is a 6 by 3 matrix.

It is a 3 by 6 matrix.