A square matrix A is nilpotent if A"= 0 for some positive integer n. Let V be the vector space of all 2 × 2 matrices with real entries. Let H be the set of a 2 × 2 nilpotent matrices with real entries. Is H a subspace of the vector space V? 1. Is H nonempty? choose 2. Is H closed under addition? If it is, enter CLOSED. If it is not, enter two matrices in H whose sum is not in H, using a comma separated list and syntax such as [[1,2], [3,4]], [[5,6], [7,8]] for the answer [12] [5 3 4 8 . (Hin to show that H is not closed under addition, it is sufficient to find two nilpotent matrices A and B such that (A+B)" 0 for all positive integers n.) 3. Is H closed under scalar multiplication? If it is, enter CLOSED. If it is not, enter a scalar in R and a matrix in H whose product is not in H, using a comma separated list and syntax such as 2, [[3,4], [5,6]] for the answer 2, [34] 5 6 (Hint: to show that H is not closed under scalar multiplication, it is sufficient to find a real number r and a nilpotent matrix A such that (rA)" 0 for all positiv integers n.) 4. Is H a subspace of the vector space V? You should be able to justify your answe by writing a complete, coherent, and detailed proof based on your answers to
A square matrix A is nilpotent if A"= 0 for some positive integer n. Let V be the vector space of all 2 × 2 matrices with real entries. Let H be the set of a 2 × 2 nilpotent matrices with real entries. Is H a subspace of the vector space V? 1. Is H nonempty? choose 2. Is H closed under addition? If it is, enter CLOSED. If it is not, enter two matrices in H whose sum is not in H, using a comma separated list and syntax such as [[1,2], [3,4]], [[5,6], [7,8]] for the answer [12] [5 3 4 8 . (Hin to show that H is not closed under addition, it is sufficient to find two nilpotent matrices A and B such that (A+B)" 0 for all positive integers n.) 3. Is H closed under scalar multiplication? If it is, enter CLOSED. If it is not, enter a scalar in R and a matrix in H whose product is not in H, using a comma separated list and syntax such as 2, [[3,4], [5,6]] for the answer 2, [34] 5 6 (Hint: to show that H is not closed under scalar multiplication, it is sufficient to find a real number r and a nilpotent matrix A such that (rA)" 0 for all positiv integers n.) 4. Is H a subspace of the vector space V? You should be able to justify your answe by writing a complete, coherent, and detailed proof based on your answers to
Linear Algebra: A Modern Introduction
4th Edition
ISBN:9781285463247
Author:David Poole
Publisher:David Poole
Chapter5: Orthogonality
Section5.4: Orthogonal Diagonalization Of Symmetric Matrices
Problem 26EQ
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