Two classical theorems on commuting matrices
AM= MA Then either M = ° or M is nonsingular Furthermore if A = A (so that M commutes with each element of ~l) then M is scalar :l PROOF Suppose that the rank of M is r, and write (II" M = P ° where P, Q are nonsingular and II' is the r X r identity matrix Then for each AE~l, (2) (II' (P-IAP) ° ° 0) _ (QAQ-I) Put (All P-IAP= A~I
EXERCISES OF MATRICES OPERATIONS Question 1
EXERCISES OF MATRICES OPERATIONS 3 (24) If A,Bare both n×nmatrices and ABis singular, then Ais singular or Bis singular (25) Ais diagonalizable, then Ais non-singular (26) Ais symmetric, then Ais non-singular
2 ALGEBRE` - Major-Prépa
6 La matrice triangulaire A admet deux valeurs propres r´eelles 1 et −1 : elle est diagonalisable a) Si M ∈ R, alors AM = M3 = MA et M ∈ C Par la question pr´ec´edente, M est donc de la forme αI + βA b) Comme A2 = I, on a (αI +βA)2 = (α2 +β2)I +2αβA et cette matrice vaut A lorsque α2 + β2 = 0 et 2αβ = 1, on a donc β
TD 03 : Matrices
(c)Montrer qu’il existe une base B de R3 dans laquelle la matrice de u est égale à 0 1 0 0 0 0 0 0 2 (d)Déterminer les endomorphismes qui commutent avec u 6 / Montrer que 0 0 0 1 1 −1 2 2 −2 est semblable à −1 0 0 0 0 0 0 0 0 7 / Montrer qu’une matrice A ∈M n(K) est semblable à la matrice dont
Rank of Matrix by Determinant
Example 1 Find the Rank of Matrix using Determinant ????= 1 2 3 2 4 7 3 6 10 ????=140−42−220−21+312−12 =1−2−2−1+30
Some Linear Algebra Notes
ij] is row (column) equivalent to a unique ma-trix in reduced (column) row echelon form The uniqueness proof is involved, see Ho man and Kunze, Linear Algebra, 2nd ed Note: the row echelon form of a matrix is not unique Why? Theorem 2 3 Let Ax= band Cx= dbe two linear systems, each of mequations in nunknowns If
Rank of Matrix by Normal Form - WordPresscom
R3 R3 –R2, ????≅ 1 0 0 2 0 0 3 1 0 C2 C2-2C1, ????≅ 1 0 0 0 0 0 0 1 0 As, Normal Form of given matrix A is having Identity Matrix of Order 2 rank (A)= r(A) = 2 ????≅ 1
64 Hermitian Matrices - Naval Postgraduate School
Ch 6: Eigenvalues 6 4 Hermitian Matrices We consider matrices with complex entries (a i;j 2C) versus real entries (a i;j 2R) 1 in R the length of a real number xis jxj= the length from the origin to the number
TD - Matrices
Exercice 17 Soit A ∈Mn (R)une matrice nilpotente d’ordre p >1 On pose B =In −A 1 Montrer que B est inversible et exprimer son inverse à l’aide de A (penser à la factorisation de I −Ap) 2 Application : B = 1 −1 0 0 0 1 −1 0 0 0 1 −1 0 0 0 1
Matrix Multiplication - University of Plymouth
Table of Contents 1 Introduction 2 Matrix Multiplication 1 3 Matrix Multiplication 2 4 The Identity Matrix 5 Quiz on Matrix Multiplication Solutions to Exercises
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