(a) Which of the following statements are TRUE? (1) If T : R" –→ R" is a linear transformation, then N(T) is a subspace of R". (2) If Vi and V2 are subsets of F" span the same subspace S of F", then Vị = V2. (3) Let T be a linear operator on F" and let Bị be a basis for F". If Bz is another basis for F", then Ar], (t) = A(7]B, (t). Answer for (a): (b) Which of the following statements are TRUE? (1) If 0 is an eigenvalue of A E Mnxn(F), then A? = A(A) is singular. (2) Let W1 and W2 be subspaces of F", then W1 W2 is a subspace of F". (3) Let A E Mnxn(F). If AP = O for some positive integer p, then det(A) = 0.

No justification is required just tell me true and false

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(a) Which of the following statements are TRUE? (1) If T : R" → R" is a linear transformation, then N(T) is a subspace of R". (2) If Vi and V2 are subsets of F" span the same subspace S of F", then Vị = V2. (3) Let T be a linear operator on F" and let Bị be a basis for F". If Bz is another basis for F", then Ar], (t) = A(7]», (t). Answer for (a): (b) Which of the following statements are TRUE? (1) If 0 is an eigenvalue of A E Mnxn(F), then A? = A(A) is singular. (2) Let W1 and W2 be subspaces of F", then W1n W2 is a subspace of F". (3) Let A E Mnxn(F). If AP = O for some positive integer p, then det(A) = 0. Answer for (b):