Matriks dan Ruang Vektor : Mencari Determinan dengan Metode Baris Tereduksi
Some Theorem About Determinants by Row Reduction
- Let A be a square matrix. If A has a row of zeros or a column of zeros, then det(A) = 0
- Let A be a square matrix. Then det(A) = det(A^T)
- Let A be an n×n matrix:
- If B is the matrix that results when a single row or single column of A is multiplied by a scalar k, then det(B) = k det(A)
- If B is the matrix that results when two rows or two columns of A are interchanged, then det(B) = -det(A)
- If B is the matrix that results when a multiple of one row of A is added to another or when a multiple of one column is added to another, then det(B) = det(A)
Row Operation and Determinant
Using Row Reduction to Evaluate a Determinant
- Use row reduction to reduce the matrix into triangular matrix
- Calculate the determinant for triangular matrix
If you haven't any ideas to use reduction row matrix, you can check previous article as shown below.
Example :
Evaluate det(A) where
Row Operations and Cofactor Expansion
Evaluate det(A) where
Answer :
Sumber
Slide Materi MRV : Determinants in Matrices
No comments:
Post a Comment