14-240/Tutorial-October7: Difference between revisions

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Check out these proofs:
Check out these proofs:




(1) Let <math>W_1</math>, <math>W_2</math> be subspaces of a vector space <math>V</math>. We show that <math>W_1 \cup W_2</math> is a subspace
(1) Let <math>W_1</math>, <math>W_2</math> be subspaces of a vector space <math>V</math>. We show that <math>W_1 \cup W_2</math> is a subspace
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:Then <math>W_1 \subset W_2 \or W_2 \subset W_1</math>. ''Q.E.D.''
:Then <math>W_1 \subset W_2 \or W_2 \subset W_1</math>. ''Q.E.D.''





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space over <math>R</math>.
space over <math>R</math>.

:We show that <math>V</math> is not commutative.

::Let <math>(a_1, a_2) = (0, 0)</math>.

::Then <math>(0, 0) + (b_1, b_2) = (2b_1, 3b_2) \neq (b_1, b_2)</math>.

::Then <math>V</math> is not commutative.

:Then <math>V</math> is not a vector space. ''Q.E.D.''



Do you spot the subtle error in each?


==Nikita==
==Nikita==

Revision as of 23:56, 11 October 2014

Boris

Subtle Problems in Proofs

Check out these proofs:


(1) Let , be subspaces of a vector space . We show that is a subspace

.

Assume that is a subspace.
Let .
Then and .
Then .
Case 1: :
Since and has additive inverses, then .
Then .
Case 2: :
Since and has additive inverses, then .
Then .
Then .
Then . Q.E.D.


(2) Let . Then , define

and . We show that is not a vector

space over .

We show that is not commutative.
Let .
Then .
Then is not commutative.
Then is not a vector space. Q.E.D.


Do you spot the subtle error in each?

Nikita