I want to plot an implicit equation

21 Abr. 2022
2 Respuestas
Actualizado a las 21 Abr. 2022
1 Visualización (30 días)

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I have attached the equations and its all variable I don't know how to plot.

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Sam Chak
Sam Chak el 21 de Abr. de 2022
@mohd ayaz
You should press the "Insert MATLAB code" button and then copy/paste the code here, for example, like this:
eqn = sqrt(Va + Vb - Vc)
Else, this makes people lose the drive to type out the super long equation. Moreover, super long equation with lots of brackets is prone to human error. This makes people have to triple check it.
David Goodmanson
David Goodmanson el 21 de Abr. de 2022
HI mohd,
is Qm intended to be negative? If it's positive, the log term is going to give problems unless the square root of all that stuff in the argument of the log term is taken to be negative.
mohd ayaz
mohd ayaz el 21 de Abr. de 2022
phit1=0.026;
Nd1=1e19;
phim1=5.2
ni=1.5e10;
chi=4.1;
Eg=1.1
Vfb1=phim1-(chi+(Eg/2)-phit1*(log(Nd1/ni)))
ni=1.5e10;
q=1.6e-19;
eox=3.9*8.8*1e-14
tf1=6*10^-7
tox=0.7*10^-7
Cox=eox/tox
esi=8.8*11.7*1e-14
Qss1=3*10^-6
Qc1=2*10^-5
Ec1=1.4*10^6;
Tsc1=1*10^-6;
p1=q*Nd1*Tsc1
alpha_1=-((3*sqrt(3))/4)*(Ec1/Qss1)
beeta_1=((3*sqrt(3))/8)*(Ec1/(Qss1^3))
damma_1=0
alpha1=2*tf1*alpha_1
beeta1=4*tf1*beeta_1
damma1=6*tf1*damma_1
Vgd1=1;
N=30;
Vds=linspace(0,1,N);
Qd1=zeros(1,N);
for i=1:N
syms x
assume(x,'real')
eqnLeft = (Vgd1-Vfb1-Vds(i)+((Tsc1/(8*esi))*(x+p1)))-0.026*(log(2*sqrt(((x+p1)*Tsc1)/(8*3.14*0.026*esi))*(1-((x+p1)/(p1)))));
eqnRight =((alpha1+(1/Cox))*((x+p1)/2))+(beeta1*(((x+p1)/2).^3))+(damma1*(((x+p1)/2).^5));
Qd1(1,i)=vpasolve(eqnLeft == eqnRight,x);
end
%Qd1(1,i)=vpasolve(eqnLeft == eqnRight,x,"What should be here?");
mohd ayaz
mohd ayaz el 21 de Abr. de 2022
@David Goodmanson yes Qm is negative

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Respuestas (2)

David Goodmanson
David Goodmanson el 21 de Abr. de 2022
Editada: David Goodmanson el 21 de Abr. de 2022

1 voto

Hi mohd,
This is not really an implicit equation since Vgs appears only once, by itself, on the lhs. So you can take all the other stuff to the rhs and use Qm as the independent variable and Vgs as the dependent variable. You can experiment around for the range of Qm that gives the correct range for Vgs, assuming there is one. When you fine the right range, don't be reluctant to use lots of points in the Qm array. Ater you find the corresponding Vgs array you can plot(Vgs,Qm). One catch is if Qm+qNdtsi goes negative, in which case you will run into problems with the log term.
Sam Chak
Sam Chak el 21 de Abr. de 2022

1 voto

Hi @mohd ayaz
I tried to plot this way to first visualize how the curve looks like for the positive part of .
Qm = linspace(-1, 0, 1001);
Vgs = (1 + 1)*(Qm + 1)/2 + 1*((Qm + 1)/2).^3 + 1*((Qm + 1)/2).^5 + 1 + 1 - 1*(Qm + 1) + 1*log(- Qm.*sqrt((Qm + 1)/(1)));
plot(Qm, Vgs, 'linewidth', 1.5)
grid on
xlabel('Q_{m}')
ylabel('V_{gs}')
So, you want to invert the axes to plot(Vgs, Qm). You can check this documentation:
https://www.mathworks.com/help/matlab/ref/fimplicit.html
f = @(Vgs, Qm) Vgs - ((1 + 1)*(Qm + 1)/2 + 1*((Qm + 1)/2).^3 + 1*((Qm + 1)/2).^5 + 1 + 1 - 1*(Qm + 1) + 1*log(- Qm.*sqrt((Qm + 1)/(1))));
fimplicit(f, [-5 2 -1 0])
grid on
xlabel('V_{gs}')
ylabel('Q_{m}')
Now, make the substitution of the original constants.

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Preguntada:

mohd ayaz
mohd ayaz
el 21 de Abr. de 2022

Respondida:

Sam Chak
Sam Chak
el 21 de Abr. de 2022

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