14-240/Tutorial-October7: Difference between revisions
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=====Proof 1===== |
=====Proof 1===== |
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Let <math>W_1</math>, <math>W_2</math> be subspaces of a vector space <math>V</math>. |
Let <math>W_1</math>, <math>W_2</math> be subspaces of a vector space <math>V</math>. |
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<math>\implies W_1 \subset W_2 \or W_2 \subset W_1</math>. |
We show that <math>W_1 \cup W_2</math> is a subspace <math>\implies W_1 \subset W_2 \or W_2 \subset W_1</math>. |
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:Assume that <math>W_1 \cup W_2</math> is a subspace. |
:Assume that <math>W_1 \cup W_2</math> is a subspace. |
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:Let <math>x \in W_1, y \in W_2</math>. |
:Let <math>x \in W_1</math>, <math>y \in W_2</math>. |
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:Then <math>x, |
:Then <math>x, y \in W_1 \cup W_2</math>. |
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:Then <math>x + y \in W_1 \cup W_2</math>. |
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:Then <math>x + y \in W_1 \or x + y \in W_2</math>. |
:Then <math>x + y \in W_1 \or x + y \in W_2</math>. |
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Let <math>V=\{(a_1, a_2):a_1, a_2 \in R\}</math>. Then <math>\forall (a_1, a_2), (b_1, b_2) \in V, \forall c \in R</math>, define |
Let <math>V=\{(a_1, a_2):a_1, a_2 \in R\}</math>. Then <math>\forall (a_1, a_2), (b_1, b_2) \in V, \forall c \in R</math>, define |
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<math>(a_1, a_2) + (b_1, b_2) = (a_1 + 2b_1, a_2 + 3b_2)</math> and <math>c(a_1, a_2)=(ca_1, ca_2)</math>. |
::<math>(a_1, a_2) + (b_1, b_2) = (a_1 + 2b_1, a_2 + 3b_2)</math> and <math>c(a_1, a_2)=(ca_1, ca_2)</math>. |
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space over <math>R</math>. |
We show that <math>V</math> is not a vector space over <math>R</math>. |
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:We show that <math>V</math> is not commutative. |
:We show that <math>V</math> is not commutative. |
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::Let <math>(a_1, a_2) = (0, 0)</math>. |
::Let <math>(a_1, a_2) = (0, 0)</math>. |
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::Then <math>(0, 0) + (b_1, b_2) = (2b_1, 3b_2) \neq (b_1, b_2 |
::Then <math>(0, 0) + (b_1, b_2) = (2b_1, 3b_2) \neq (b_1, b_2)</math>. |
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::Then <math>V</math> is not commutative. |
::Then <math>V</math> is not commutative. |
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:Then <math>V</math> is not a vector space. ''Q.E.D.'' |
:Then <math>V</math> is not a vector space. ''Q.E.D.'' |
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Can you spot the subtle error in each? |
Can you spot the subtle error in each? |
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=====Error in Proof 1===== |
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In Proof 1, the equivalence of (2) the last line and (1) the "let" statement to the second last line is not obvious: |
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=====Error in Proof 2===== |
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(1) Let <math>x \in W_1, y \in W_2</math>. [Many lines] Then <math>x \in W_2 \or y \in W_1</math>. |
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(2) Then <math>W_1 \subset W_2 \or W_2 \subset W_1</math>. |
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Rewrite sentences (1) and (2) into a form that is easier to compare: |
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(1) <math>\forall x \in W_1, \forall y \in W_2, (x \in W_2 \or y \in W_1)</math>. |
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(2) <math>( \forall x \in W_1, x \in W_2) \or ( \forall y \in W_2, y \in W_1)</math>. |
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For Proof 1 to be correct, we must show that sentences (1) and (2) are equivalent. Alternatively, alter the structure of Proof 1 into a proof by contradiction. |
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In Proof 2, the only thing that is shown is that <math>(0, 0)</math> is not the additive identity. For Proof 2 to be correct, either plug in a vector that is not <math>(0, 0)</math> or show that <math>(0, 0)</math> is the additive identity by some other means, which introduces a contradiction. |
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==Nikita== |
==Nikita== |
Latest revision as of 19:31, 7 November 2014
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Boris
Subtle Errors in Proofs
Check out these proofs:
Proof 1
Let , be subspaces of a vector space .
We show that is a subspace .
- Assume that is a subspace.
- Let , .
- Then .
- Then .
- Then .
- Case 1: :
- Since and has additive inverses, then .
- Then .
- Case 2: :
- Since and has additive inverses, then .
- Then .
- Then .
- Then . Q.E.D.
Proof 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.
Can you spot the subtle error in each?
In Proof 1, the equivalence of (2) the last line and (1) the "let" statement to the second last line is not obvious:
(1) Let . [Many lines] Then .
(2) Then .
Rewrite sentences (1) and (2) into a form that is easier to compare:
(1) .
(2) .
For Proof 1 to be correct, we must show that sentences (1) and (2) are equivalent. Alternatively, alter the structure of Proof 1 into a proof by contradiction.
In Proof 2, the only thing that is shown is that is not the additive identity. For Proof 2 to be correct, either plug in a vector that is not or show that is the additive identity by some other means, which introduces a contradiction.