Display maximal value in a range?
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Hello. I would like to display the max(abs(sigma)) from around t=7 to t=10 from this code. The plot is from 0 to 10 and I tried to display that max value but it shows me the maximum value from the whole range (from 0 to 10) instead from 7 to 10. How can I do it? Here’s my code:
clear all
t=0;% initial time
x=[1,1,1];% initial condition for t=0
alpha=30;
tau=0.0001;
k=1; % counter
while t<=10
f=-sin(t+5)-0.5*cos(t)-x(2);
v=x(1);
vc=sin(t+1)-cos(0.5*t-2);
vcc=cos(t+1)+0.5*sin(0.5*t-2);
sigma=v-vc;
sigmadot=f-vcc;
u=alpha*((abs(sigmadot)).^2*sign(sigmadot)+sigma)/((sigmadot).^2+abs(sigma));
dx=[f,cos(1+x(1)+x(3))+(2-cos(x(1)+x(3)+1))*u,cos(x(1)+0.5*x(3)-t)-x(3)+u];
x=x+dx*tau;
t=t+tau;
sigmav(k)=sigma;
sigmadotv(k)=sigmadot;
tv(k)=t;
k=k+1;
end
figure
plot(tv,sigmav,'b',tv,sigmadotv,'r')
Help is appreciated!
Accepted Answer
Star Strider
on 10 Aug 2019
Edited: Star Strider
on 10 Aug 2019
I do not see any max function calls, so I am not certain what result you want.
Displying only the values for ‘tv’ between 7 and 10 is straightforward:
Lidx = (tv>=7) & (tv<=10);
figure
plot(tv(Lidx),sigmav(Lidx),'b',tv(Lidx),sigmadotv(Lidx),'r')
with ‘Lidx’ being the logical index vector. This will select the values of the vectors you want.
To display ‘max(abs(sigma))’, assuming you intend ‘sigmav’:
maxSigma = max(abs(sigmav(Lidx)))
maxSigma =
4.451070235722554e-07
If you simply want to restrict the plot, you can also do that with the xlim function.
3 Comments
Desiree
on 10 Aug 2019
Desiree
on 10 Aug 2019
Star Strider
on 10 Aug 2019
As always, my pleasure!
More Answers (1)
KALYAN ACHARJYA
on 10 Aug 2019
Edited: KALYAN ACHARJYA
on 10 Aug 2019
"I would like to display the max(abs(sigma)) from around t=7 to t=10 from this code"
Is this one:
t=0;% initial time
x=[1,1,1];% initial condition for t=0
alpha=30;
tau=0.0001;
k=1; % counter
l=1;
while t<=10
f=-sin(t+5)-0.5*cos(t)-x(2);
v=x(1);
vc=sin(t+1)-cos(0.5*t-2);
vcc=cos(t+1)+0.5*sin(0.5*t-2);
sigma=v-vc;
%% I haved changed Here
if t>=7 & t<=10
sigma_update(l)=sigma;
l=l+1;
end
%%
sigmadot=f-vcc;
u=alpha*((abs(sigmadot)).^2*sign(sigmadot)+sigma)/((sigmadot).^2+abs(sigma));
dx=[f,cos(1+x(1)+x(3))+(2-cos(x(1)+x(3)+1))*u,cos(x(1)+0.5*x(3)-t)-x(3)+u];
x=x+dx*tau;
t=t+tau;
sigmav(k)=sigma;
sigmadotv(k)=sigmadot;
tv(k)=t;
k=k+1;
end
figure
plot(tv,sigmav,'b',tv,sigmadotv,'r');
disp(max(abs(sigma_update)));
Result:
4.451070235722554e-07
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