Determinant of 2X2 Matrix

Last modified by

KurtHeckman

on

Jun 25, 2021, 1:21:41 PM

Created by

MichaelBartmess

on

Jul 4, 2014, 7:21:26 AM

$det (A) = A_"1,1" * A_"2,2" - A_"2,1" * A_"1,2"$

$"Matrix A"$

The Math

This equation computes the determinant of of a two-by-two matrix. Given a square matrix where

A = $((A_11,A_12),(A_21,A_22))$

det(A) = $A_11 * A_22 - A_12 *A_21$
The multiplication pattern for the determinant, which extends to larger square matrices, is along the diagonals. So, the first term is the product of the matrix elements along the diagonal sloping to the right: $A_11 * A_33$ . The second term is the product of the matrix elements along the diagonal sloping to the left: $A_12 * A_21$ .

The terms formed of the product of the right sloping diagonals are positive and the terms formed of the left sloping diagonals are negative.

When added together, you get: det(A) = $A_11 * A_22$ - $A_12 * A_21$ .

This equation, Determinant of 2X2 Matrix, is used in 5 pages

Calculators

• Cramer's Rule Calculator by MichaelBartmess

Equations and Data Items

• Cramer's Rule (two equations) by MichaelBartmess

• Cramer's Rule (two equations, solved for x) by MichaelBartmess

• Cramer's Rule (two equations, solved for y) by MichaelBartmess

• Minor of a 3x3 Matrix by MichaelBartmess

Collections

Comments
Attachments
Stats

No comments

No attachments

Last 12 Months

This site uses cookies to give you the best, most relevant experience. By continuing to browse the site you are agreeing to our use of cookies.

Determinant of 2X2 Matrix

The Math

Datasets

Equations and Data Items

Calculators

Equations and Data Items

Collections