APS2 - Q1

Cinética Básica

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UTFPR

Nátalli Geik Klems
09/12/2021
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[Content_Types].xml
 
 
 
 
 
 
 
 
_rels/.rels
 
 
 
 
 
 
 
matlab/document.xml
 clear;clc
%Reações elementares consecutivas
%Chamei de 1 tudo que não é do estado permamente
ka=1;kb=2;A0=0.5;
t = 0:0.1:5; %tempo
A1 = A0*exp(-ka*t); %Concentração de A
I1= (ka/(kb-ka))*(exp(-ka*t)-exp(-kb*t))*A0; %Concentração de I
e=1+((ka*exp(-(kb*t))-kb*exp(-(ka*t)))/(kb-ka));%Parte da equação de P
P1=A0*e; %Concentração de P
%Aproximação do estado permanente
%Chamei de 2 tudo que é referente ao estado permanente
ka=1;kb=2;A0=0.5;
t = 0:0.1:5; %tempo
Aproximacao=ka/kb
A2 = A0*exp(-ka*t); %Concentração de A
I2=(ka/kb)*A1; %Concentração de I
P2=(1-exp(-ka*t))*A0; %Concentração do P
%GRÁFICO
plot(t,A1,t,I1,t,P1, 'LineWidth',2)
grid on
xlim([0.00 5.00])
ylim([0.000 0.500])
xlabel('tempo(min)')
ylabel('Concentração(mol L^{-1})')
hold on
plot(t,A2,t,I2,t,P2,'LineWidth',2)
grid on
xlim([0.00 5.00])
ylim([0.000 0.500])
legend({'[A1]','[I1]','[P1]','[A2]','[I2]','[P2]'},'Location','best')
xlabel('tempo(min)')
ylabel('Concentração(mol L^{-1})')
xlim([0.00 5.00])
ylim([0.000 0.500])
%Cálculo do I máximo
t_max=(1/(ka-kb))*log(ka/kb)
I_max=(ka/(kb-ka))*(exp(-ka*t_max)-exp(-kb*t_max))*A0
matlab/output.xml
 manual code ready 0.3458977395672993 variable Aproximacao 0.5000 1 1 15 figure 48def9af-9d18-4478-acd1-8ab3f6b43a66 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
577 433 20 21 22 23 24 25 26 27 28 20 28 29 30 31 32 33 34 35 36 variable t_max 0.6931 1 1 39 variable I_max 0.1250 1 1 40 true false 0 0 0 false false 1 3 3 false false 2 4 4 false false 3 5 5 false false 4 6 6 false false 5 7 7 false false 6 8 8 false false 7 12 12 false false 8 13 13 false false 9 14 14 0 false false 10 15 15 false false 11 16 16 false false 12 17 17 false false 13 20 20 false false 14 21 21 false false 15 22 22 false false 16 23 23 false false 17 24 24 false false 18 25 25 false false 19 26 26 false false 20 27 27 1 false false 21 28 28 1 false false 22 29 29 1 false false 23 30 30 1 false false 24 31 31 1 false false 25 32 32 1 false false 26 33 33 1 false false 27 34 34 1 false false 28 35 35 1 false false 29 38 38 2 false true 30 39 39 3
metadata/coreProperties.xml
 
 2021-11-26T14:20:28Z
 2021-11-30T19:34:27Z
metadata/mwcoreProperties.xml
 
 application/vnd.mathworks.matlab.code
 MATLAB Code
 R2021b
metadata/mwcorePropertiesExtension.xml
 
 e7e0370f-2cb3-47c3-937b-9b0260ccac47
metadata/mwcorePropertiesReleaseInfo.xml
 
 9.11.0.1811744
 R2021b
 Update 1
 Nov 05 2021
 3707796215