Intersection of subspaces is a subspace ↩

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created: 2021-11-06 00:57:52
modified: 2022-01-10 04:13:04

Statement:
If

is any collection of subspaces, then:

Proof

By definition, is a subspace if any sum of its vectors stays in and these vectors stay in when multiplied by any scalar.

Now let . Then if we consider their sum, they must stay in each since they are subspaces as well: is part of every subspace, but then it must be part of as well the sum part of the definition holds.
The same consideration is true for multiplying with scalars too.