10/3,6 - The Game: Difference between revisions

Revision as of 17:40, 12 November 2008

The Game

The idea behind the game is to use linearity (superposition and proportionality) and time invariance to find an output for a given input. An initial input and output are given.

Input	LTI System	Output	Reason
$δ (t)$	$⟹$	$h (t)$	Given
$δ (t - λ)$	$⟹$	$h (t - λ)$	Time Invarience
$x (λ) δ (t - λ)$	$⟹$	$x (λ) h (t - λ)$	Proportionality
$x (t) = \int_{- \infty}^{\infty} x (λ) δ (t - λ) d x$	$⟹$	$\underset{C o n v o l u t i o n I n t e g r a l}{\underset{⏟}{\int_{- \infty}^{\infty} x (λ) h (t - λ) d x}}$	Superposition

With the derived equation, note that you can put in any $x (t)$ to find the given output. Just change your t for a lambda and plug n chug.

Example 1

Let $x (t) = e^{j 2 π n t / T} = e^{j 2 π ω_{n} t}$

$e^{j 2 π ω_{n} t}$	$= \int_{- \infty}^{\infty} e^{j 2 π ω_{n} λ} h (t - λ) d λ$	Let $t - λ = u$ thus $d u = - d λ$
	$= - \int_{\infty}^{- \infty} e^{j 2 π ω_{n} (t - u)} h (u) d u$	The order of integration switched due to changing from $- λ = u$
	$= \underset{e i g e n v a l u e}{\underset{⏟}{(\int_{- \infty}^{\infty} e^{- j 2 π ω_{n} u} h (u) d u)}} \underset{e i g e n f u n c t i o n}{\underset{⏟}{e^{j 2 π ω_{n} t}}}$
	$= ⟨ h ∣ e^{j 2 π ω_{n} u} ⟩ e^{j 2 π ω_{n} t}$	Different notation
	$= H (ω_{n}) e^{j 2 π ω_{n} t}$	Different notation

Example 2

Questions

How do eigenfunction and basisfunctions differ? How do eigenvalues and coefficients differ?

@@ Line 58: / Line 58: @@
 ==Example 2==
+==Questions==
+How do eigenfunction and basisfunctions differ?
+How do eigenvalues and coefficients differ?

10/3,6 - The Game: Difference between revisions

Revision as of 17:40, 12 November 2008

Contents

The Game

Example 1

Example 2

Questions

Navigation menu

10/3,6 - The Game: Difference between revisions

Revision as of 17:40, 12 November 2008

The Game

Example 1

Example 2

Questions

Navigation menu

Search