Matrix operations Definition - College Algebra Key Term |...

Definition

Matrix operations involve procedures such as addition, subtraction, and multiplication of matrices, which are rectangular arrays of numbers. These operations are fundamental tools for solving systems of linear equations.

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5 Must Know Facts For Your Next Test

Matrix addition and subtraction require matrices to have the same dimensions.
Matrix multiplication is not commutative; that is, $A \times B \neq B \times A$ in general.
The identity matrix acts as a multiplicative identity in matrix multiplication, similar to how 1 acts for real numbers.
The determinant of a square matrix can be used to determine if the matrix is invertible; a zero determinant means the matrix is not invertible.
The inverse of a matrix, if it exists, can be used to solve systems of linear equations through methods like Gaussian elimination.

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Determinant:

A scalar value derived from a square matrix that indicates whether the matrix is invertible.

Identity Matrix:

A square matrix with ones on the diagonal and zeros elsewhere; it serves as the multiplicative identity in matrix operations.

Inverse Matrix:

A matrix that, when multiplied by its original matrix, yields the identity matrix. It exists only if the original matrix has a non-zero determinant.

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Matrix operations

Definition

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