Q2_3

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[Content_Types].xml
 
 
 
 
 
 
 
 
_rels/.rels
 
 
 
 
 
 
 
matlab/document.xml
 
T=[0:0.1:5];
gs = tf(1,[1 4 3])
gs = step(gs,T);
y=0.3333+0.1667*exp(-3*T)-0.5*exp(-T);
plot(T,gs,T,y); grid;
xlabel('Tempo');
ylabel('Amplitude')
matlab/output.xml
 manual code ready 0.4119763773381105 text gs =
 
 1
 -------------
 s^2 + 4 s + 3
 
Continuous-time transfer function.
<a href="matlab:disp(char('',' Numerator: {[0 0 1]} ',' Denominator: {[1 4 3]} ',' Variable: ''s'' ',' IODelay: 0 ',' InputDelay: 0 ',' OutputDelay: 0 ',' InputName: {''''} ',' InputUnit: {''''} ',' InputGroup: [1×1 struct] ',' OutputName: {''''} ',' OutputUnit: {''''} ',' OutputGroup: [1×1 struct] ',' Notes: [0×1 string] ',' UserData: [] ',' Name: '''' ',' Ts: 0 ',' TimeUnit: ''seconds'' ',' SamplingGrid: [1×1 struct] ',' '))">Model Properties</a>
 false false 3 figure 731bb6d1-43a0-4bf9-b376-d381cee19e69 data:image/png;base64,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
415.55556656401865 312.2222304932867 4 5 6 4 6 7 8 true false 0 1 1 false false 1 2 2 0 false false 2 3 3 false false 3 4 4 false false 4 5 5 1 false false 5 6 6 1 false true 6 7 7 1
metadata/coreProperties.xml
 
 2023-07-08T20:53:05Z
 2023-07-08T22:49:49Z
metadata/mwcoreProperties.xml
 
 application/vnd.mathworks.matlab.code
 MATLAB Code
 R2023a
metadata/mwcorePropertiesExtension.xml
 
 6777ef5e-82a6-49e6-9001-8d4122d505d1
metadata/mwcorePropertiesReleaseInfo.xml
 
 9.14.0.2299052
 R2023a
 Update 3
 Jun 09 2023
 2263450500