Difference between revisions of "06-240/Homework Assignment 9"

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* Assuming you are ready to wait and shuffle screens, will you trust the results? (Remember that even if electrical power will be available to eternity and electronic components will never fail, every time a computer adds or multiplies two 14-digits numbers it makes a rounding error of size around <math>10^{-14})</math>.
 
* Assuming you are ready to wait and shuffle screens, will you trust the results? (Remember that even if electrical power will be available to eternity and electronic components will never fail, every time a computer adds or multiplies two 14-digits numbers it makes a rounding error of size around <math>10^{-14})</math>.
 
* Estimate how long it will take Golem to compute <math>\det A</math> using row operations.
 
* Estimate how long it will take Golem to compute <math>\det A</math> using row operations.
* Assuming you are ready to wait, will you trust the results (Remembering the same comment as above)? How many screens will you go through this time?
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* Assuming you are ready to wait, will you trust the results (remembering the same comment as above)? How many screens will you go through this time?
  
  

Revision as of 20:28, 22 November 2006

In Preparation

The information below is preliminary and cannot be trusted! (v)

Read sections 3.3 and 3.4 in our textbook. Remember that reading math isn't like reading a novel! If you read a novel and miss a few details most likely you'll still understand the novel. But if you miss a few details in a math text, often you'll miss everything that follows. So reading math takes reading and rereading and rerereading and a lot of thought about what you've read. Also, preread all of chapter 4, just to get a feel for the future.

Solve problems 1, 2, 3, 8 and 10 on pages 179-181 and problems 1, 2abe, 2cdfghij and 5 on pages 195-196 but submit only your solutions of the underlined problems. This assignment is due at the tutorials on Thursday November 23.

Just for fun. A certain 100\times 100 matrix A of random numbers between 0 and 1 is fed into a computer called Golem, capable of about 10^9 arithmetic operations per second (between floating point numbers, at roughly 14 decimal digits of precision).

  • Estimate how long it will take Golem to compute \det A using the explicit recursive formula.
  • As you may know, glass is really a liquid and it slowly flows with gravity. How many times will you need to replace your screen before the computation is done?
  • Assuming you are ready to wait and shuffle screens, will you trust the results? (Remember that even if electrical power will be available to eternity and electronic components will never fail, every time a computer adds or multiplies two 14-digits numbers it makes a rounding error of size around 10^{-14}).
  • Estimate how long it will take Golem to compute \det A using row operations.
  • Assuming you are ready to wait, will you trust the results (remembering the same comment as above)? How many screens will you go through this time?


06-240-Det100x100.png
Computed on Dror's laptop in a fraction of a second. The matrix is cropped, of course.