12-267/Homework Assignment 5: Difference between revisions

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This assignment is due at the tutorial on Friday November 2. Here and everywhere, '''neatness counts!!''' You may be brilliant and you may mean just the right things, but if your readers have a hard time deciphering your work they will give up and assume it is wrong.
This assignment is due in class on Friday November 2. Here and everywhere, '''neatness counts!!''' You may be brilliant and you may mean just the right things, but if your readers have a hard time deciphering your work they will give up and assume it is wrong.


'''Task 1.''' Consider the following systems of equations:
'''Task 1.''' Consider the following systems of equations:
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'''Task 3.''' Let <math>D</math> be the differential operator <math>\frac{d}{dx}</math>, and let <math>f</math> be a function of the variable <math>x</math> whose Taylor series is convergent everywhere. Write a simple formula for <math>(e^Df)(x)</math>.
'''Task 3.''' Let <math>D</math> be the differential operator <math>\frac{d}{dx}</math>, and let <math>f</math> be a function of the variable <math>x</math> whose Taylor series is convergent everywhere. Write a simple formula for <math>(e^Df)(x)</math>.

(Here, of course, <math>e^D:=\sum_{k=0}^\infty \frac{D^k}{k!}</math>).

{{Template:12-267:Dror/Students Divider}}

[http://imgur.com/a/txF9Z#0 Solutions] [[User:Vsbdthrsh|Vsbdthrsh]]


Solutions to HW5: [[User:Dongwoo.kang|Dongwoo.kang]]
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Latest revision as of 21:05, 13 December 2012

This assignment is due in class on Friday November 2. Here and everywhere, neatness counts!! You may be brilliant and you may mean just the right things, but if your readers have a hard time deciphering your work they will give up and assume it is wrong.

Task 1. Consider the following systems of equations:

  1. Write each one in a matrix form.
  2. Find the eigenvalues and eigenvectors of the resulting matrices.
  3. Diagonalize these matrices.
  4. Compute for each of those matrices.
  5. Solve these equations.

Task 2.

  1. Prove that if two matrices and satisfy , then .
  2. Find an example for two matrices and for which .

Task 3. Let be the differential operator , and let be a function of the variable whose Taylor series is convergent everywhere. Write a simple formula for .

(Here, of course, ).

Dror's notes above / Student's notes below

Solutions Vsbdthrsh


Solutions to HW5: Dongwoo.kang