14-240/Tutorial-December 2: Difference between revisions

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Let <math>A</math> be a <math>n \times n</math> matrix and <math>B</math> be the matrix <math>A</math> with two '''adjacent''' rows interchanged. Then <math>det(A) = -det(B)</math>.
Let <math>A</math> be a <math>n \times n</math> matrix and <math>B</math> be the matrix <math>A</math> with two '''adjacent''' rows interchanged. Then <math>det(A) = -det(B)</math>.



All we need to show is that <math>det(A) + det(B) = 0</math>. Assume that <math>B</math> is the matrix <math>A</math> with row <math>i</math> of <math>A</math> interchanged with row <math>i + 1</math> of <math>A</math>. Since the determinant of a matrix with two identical rows is <math>0</math>, then:
All we need to show is that <math>det(A) + det(B) = 0</math>. Assume that <math>B</math> is the matrix <math>A</math> with row <math>i</math> of <math>A</math> interchanged with row <math>i + 1</math> of <math>A</math>. Since the determinant of a matrix with two identical rows is <math>0</math>, then:

Revision as of 15:14, 7 December 2014

Boris

Theorem

Let be a matrix and be the matrix with two rows interchanged. Then . Boris decided to prove the following lemma first:

Lemma 1

Let be a matrix and be the matrix with two adjacent rows interchanged. Then .


All we need to show is that . Assume that is the matrix with row of interchanged with row of . Since the determinant of a matrix with two identical rows is , then:



.


Since the determinant is linear in each row, then we continue where we left off:



.


Then and .

Nikita