(New page: Thanks for your help with the correction of my first attempt at the solution. I updated the page and hopefully it's better now.)
 
 
(4 intermediate revisions by 2 users not shown)
Line 1: Line 1:
 
Thanks for your help with the correction of my first attempt at the solution. I updated the page and hopefully it's better now.
 
Thanks for your help with the correction of my first attempt at the solution. I updated the page and hopefully it's better now.
 +
 +
 +
I like how you use the Euler formula to illustrate the process of determining the system, however, I think a little more steps will make the final answer much easier to understand. - Bavorndej Chanyasak
 +
 +
________
 +
 +
I do not believe your proof is correct. You state that
 +
 +
<math> e^{2jt} = \cos{t} + 2 j\sin{t} </math>
 +
 +
I think that is false.
 +
 +
<math> e^{2jt} = \cos{2t} + j \sin{2 t} </math>
 +
 +
This problem can be proven using Euler's formula but I think you have incorrectly applied it.
 +
 +
Also I encourage you to learn LaTeX. It makes mathmatical expressions much easier to read - Chris Cadwallader

Latest revision as of 08:54, 19 September 2008

Thanks for your help with the correction of my first attempt at the solution. I updated the page and hopefully it's better now.


I like how you use the Euler formula to illustrate the process of determining the system, however, I think a little more steps will make the final answer much easier to understand. - Bavorndej Chanyasak

________

I do not believe your proof is correct. You state that

$ e^{2jt} = \cos{t} + 2 j\sin{t} $

I think that is false.

$ e^{2jt} = \cos{2t} + j \sin{2 t} $

This problem can be proven using Euler's formula but I think you have incorrectly applied it.

Also I encourage you to learn LaTeX. It makes mathmatical expressions much easier to read - Chris Cadwallader

Alumni Liaison

Ph.D. 2007, working on developing cool imaging technologies for digital cameras, camera phones, and video surveillance cameras.

Buyue Zhang