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I am given data t=[0 1 2 3 4 5 6 7 8 9 10] and
y(t)=[1 2.7 5.8 6.6 7.5 9.9 10.2 11.2 12.6 13.6 15.8]
and have to evaluate the derivative of y at each given t value
using the following finite difference schemes
at 4-point first derivative
My code at finite difference is
t= 0: 1: 10;
y= [1 2.7 5.8 6.6 7.5 9.9 10.2 11.2 12.6 13.6 15.8];
n=length(y);
dfdx=zeros(n,1);
dfdx(t)=(y(2)-y(1))/(t(2)-t(1));
for i=2:n-1
dfdx(1)=(y(i+1)-y(i-1))/(t(i+1)-t(i-1));
end
dfdx(n)=(y(n)-y(n-1))/(t(n)-t(n-1));
but I have interesting of method of 4-point first derivative for more accuracy thanks in avance!

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Aquatris
Aquatris le 3 Août 2018
Please format the question properly and include the "following scheme" for us to be able to help.
alburary daniel
alburary daniel le 3 Août 2018
I did

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Aquatris
Aquatris le 3 Août 2018

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I found a source where the equations for the differentiation are shown, with some typos. Here is an example code, where d4 is 4 point d5 is 5 point differentiation.
dt = 1e-3;
t = 0:0.001:20;
x = sin(0.4*t)+exp(-0.9*t); % sample signal
xd = 0.4*cos(0.4*t)-0.9*exp(-0.9*t);% sample signals exact derivative
n=length(x);
d4=zeros(size(x));
d5=zeros(size(x));
for j = 3:n-2;
d4(j) = -1/6/dt*(-2*x(j+1)-3*x(j)+6*x(j-1)-x(j-2));
d5(j)= 1/12/dt*(x(j-2) - 8.*x(j-1) + 8.*x(j+1) - x(j+2));
end
d4(1:2)=d4(3);
d4(n-1:n)=d4(n-2);
d5(1:2)=d5(3);
d5(n-1:n)=d5(n-2);
plot(t,xd,t,d4,'r--',t,d5,'m-.') % comparison plot

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alburary daniel
alburary daniel le 3 Août 2018
I feeling confused because I do not how include the time data in the above representation for 4 and 5 points, any suggestion?
Aquatris
Aquatris le 3 Août 2018
Modifié(e) : Aquatris le 3 Août 2018
dt is your timestep information. Which part are you confused with?
Edit: My bad. There is a typo in the code. It should be;
dt = 1e-3;
t = 0:dt:20;
to make it clear dt is the time step. Also I thought it was clear t is the time.
alburary daniel
alburary daniel le 3 Août 2018
Modifié(e) : alburary daniel le 3 Août 2018
if true
% code
end
t= 0:dt:10
y= [1 2.7 5.8 6.6 7.5 9.9 10.2 11.2 12.6 13.6 15.8];
n=length(y);
dfdx=zeros(n,1);
dfdx=(y(2)-y(1))/(t(2)-t(1));
for i=2:n-1
dfdx(1)=(y(i+1)-y(i-1))/(t(i+1)-t(i-1));
end
dfdx(n)=(y(n)-y(n-1))/(t(n)-t(n-1));
m=length(y);
d4=zeros(size(y));
d5=zeros(size(y));
for j = 3:m-2 d4(j) = -1/6/dt*(-2*y(j+1)-3*y(j)+6*y(j-1)-y(j-2)); d5(j)= 1/12/dt*(y(j-2) - 8.*y(j-1) + 8.*y(j+1) - y(j+2)); end
d4(1:2)=d4(3); d4(m-1:m)=d4(m-2); d5(1:2)=d5(3); d5(m-1:m)=d5(m-2); plot(t,dfdx,'blue',t,d4,'r--',t,d5,'m-.')
solutions are not equal
Aquatris
Aquatris le 3 Août 2018
I recommend you look into limitations of numeric differentiation to understand the reason. Feels like you are not that familiar.
Mohammad Ezzad Hamdan
Mohammad Ezzad Hamdan le 13 Mar 2019
What do you mean by the terms below;
d5(1:2)=d5(3);
d5(n-1:n)=d5(n-2);
Aquatris
Aquatris le 13 Mar 2019
It is not possible to calculate the first 2 or last 2 elements for the d5, I just equate them to some value. For the last 2 elements I hold the last calculated value of d5 and for the first 2 elements I hold the first calculated value. Depending on the application this might be acceptable.

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Aquatris
Aquatris
le 13 Mar 2019

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