Paper 1, Section II, F
Let and be finite-dimensional real vector spaces, and let be a surjective linear map. Which of the following are always true and which can be false? Give proofs or counterexamples as appropriate.
(i) There is a linear map such that is the identity map on .
(ii) There is a linear map such that is the identity map on .
(iii) There is a subspace of such that the restriction of to is an isomorphism from to .
(iv) If and are subspaces of with then .
(v) If and are subspaces of with then .
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