Unit Step Function
Transcript of Unit Step Function
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Unit Step Function
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p238 : 6.3.2 The Unit Step Function
The unit step function U(t-a) is defined :
at
atatU
,1
0,0
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When a function f is multiplied by U(t-a), the unit step function " turns OFF " the portion of the graph of f from at 0 .
Unit Step Function
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Example :
Given 1ttf , then tftU 5 means that the ONLY portion of tf from 50 t is " turn OFF ".
Unit Step Function
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Another very useful unit step function is
U(t-a ) - U(t-b).
otherwise,0
,1 btabtUatU
Unit Step Function
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When a function f is multiplied by [U(t-a) - U(t-b)], only the portion of the graph of f from bta is
" turn ON ".
Unit Step Function
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Example : Given 1ttf , then tftUtU 51 means that ONLY the portion of tf from 50 t is " turn ON ".
Unit Step Function
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A piecewise function, f (t) is defined by different sub-functions for different intervals of t.
Example 1 :
otherwise
7442
20
0
,1,112
,5
tt
t
tt
t
tf sub-function
Unit Step Function
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Any piecewise function can be expressed as a single equation by :
1. applying unit step function on each sub-function
2. add each result obtained from 1.
Unit Step Function
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Example 2 : Express piecewise function tf from example 1 using unit step function.
1. applying unit step function on each sub-function
For 20 t , 555 tUtUtt
42112112 tUtUtt For 42 t ,
7411 tUtUtt For 74 t ,
For 7t , 0
otherwise
7442
20
0
,1,112
,5
tt
t
tt
t
tf
Unit Step Function
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2. Add each result obtained from 1.
tf
42112 tUtUt
741 tUtUt
Unit Step Function
25 tUtUt