Matrix Operations and Vector Multiplication

A matrix is a 3-dimensional array of numbers.

A matrix is a 2-dimensional array of numbers.

A matrix is a single row of numbers.

A matrix is a single column of numbers.

The vector must have more components than the matrix has rows.

The vector must have fewer components than the matrix has columns.

The vector must have the same number of components as the matrix has rows.

The vector must have the same number of components as the matrix has columns.

Addition

Subtraction

Dot product

Cross product

A single number

A scalar

A new vector

A new matrix

They must be equal for the multiplication to be defined.

They determine the number of rows in the result.

They are irrelevant to the multiplication process.

They determine the number of columns in the result.

A 3x4 matrix

A 3x1 matrix

A 4x3 matrix

A 4x4 matrix

To find the inverse of a matrix

To multiply two matrices

To convert rows into columns and vice versa

To add two matrices

As a linear combination of column vectors

As a division of column vectors

As a subtraction of column vectors

As a multiplication of column vectors

A linear combination of the rows of A

A linear combination of the columns of A

A linear combination of the diagonals of A

A linear combination of the elements of A

A linear combination of column vectors

A dot product of row vectors

A transformation of the vector

A subtraction of matrices