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Week of...
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Notes and Links
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1
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Sep 11
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About, Tue, HW1, Putnam, Thu
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2
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Sep 18
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Tue, HW2, Thu
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3
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Sep 25
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Tue, HW3, Photo, Thu
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4
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Oct 2
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Tue, HW4, Thu
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5
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Oct 9
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Tue, HW5, Thu
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6
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Oct 16
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Why?, Iso, Tue, Thu
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7
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Oct 23
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Term Test, Thu (double)
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8
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Oct 30
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Tue, HW6, Thu
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9
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Nov 6
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Tue, HW7, Thu
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10
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Nov 13
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Tue, HW8, Thu
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11
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Nov 20
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Tue, HW9, Thu
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12
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Nov 27
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Tue, HW10, Thu
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13
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Dec 4
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On the final, Tue, Thu
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F
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Dec 11
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Final: Dec 13 2-5PM at BN3, Exam Forum
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Register of Good Deeds
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Add your name / see who's in!
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edit the panel
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Our remaining goal for this semester is to study the following theorem:
Theorem. Let be an matrix (with entries in some field ) and let be the characteristic polynomial of . Assume has distinct roots , that is, has distinct eigenvalues , and let be corresponding eigenvectors, so that for all . Let be the diagonal matrix that has through on its main diagonal (in order) and let be the matrix whose columns are these eigenvectors: . Then is invertible and the following equalities hold:
- and .
- For any positive integer we have and .
- Likewise if and then and .
Order of the proceedings.
- Assuming P is invertible, a proof of 1.
- Proof of 2.
- Example - the "reproduction of rabbits" matrix (see the mathematica session below).
- Discussion of 3.
- The relationship with linear transformations and changes of basis.
- thorough form a basis and is invertible.