Let V be a vector space, I the identity operator on V (that is, I(v) = v for all v E V), and Z the zero operator on V (that is, Z(v) = 0y for all v e V). Prove that if W is any subspace of V, then W is invariant under both I and Z.

Let V be a vector space, I the identity operator on V (that is, I(v) = v for all v E V), and Z the zero operator on V (that is, Z(v) = 0y for all v e V). Prove that if W is any subspace of V, then W is invariant under both I and Z.

Elementary Linear Algebra (MindTap Course List)

8th Edition

ISBN:9781305658004

Author:Ron Larson

Publisher:Ron Larson

Chapter5: Inner Product Spaces

Section5.CM: Cumulative Review

Problem 24CM

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Let V be a vector space, I the identity operator on V (that is, I(v) = v for all v E V),
and Z the zero operator on V (that is, Z(v) = 0y for all v E V). Prove that if W is
any subspace of V, then W is invariant under both I and Z.

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