how to perform data fit like excel? and plot

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  1. I have observed array of data ( y_obs) and predicted data (y_pred)
  2. Predicted data is obtained from an equation
  3. How do I fit the observed data to the predicted data by minimizing the coefficient "d" in the equation? ( This is possible in excel, but I could not find a suitable method in matlab
Below is my code for steps 1 and 2:
% observed data
y_obs = [0.3 0.2 0.28 0.318 0.421 0.492 0.572 0.55 0.63 0.61 0.73 0.8 0.81 0.84 0.93 0.91]'; % If y_obs should equal to predicted, I can have more data. J us fo rthe code, I am providing limited observed data
t1 = [300:300:21600]';
a=0.0011;
gama = 0.01005;
d=0.000000000302;
n=1;
t=300;
L2 = zeros(14,1);
L3 = zeros(14,1);
L4 = zeros(14,1);
At = zeros(14,1);
t = 300;
n =1;
L1 = ((8*gama)/((pi*(1-exp(-2*gama*a)))));
format shortE
for t= 300:300:21600
for n=1:1:14
L2(n) = exp((((2*n + 1)^2)*-d*pi*pi*t)/(4*a*a));
L3(n) = (((-1)^n)*2*gama)+(((2*n+1)*pi)*exp(-2*gama*a))/(2*a);
L4(n)= ((2*n)+1)*((4*gama*gama)+((((2*n)+1)*pi)/(2*a))^2);
L5(n) = ((L2(n).*L3(n))/L4(n));
end
S(t/300) = sum(L5);
y_pred(t/300) = 1 -L1*S(t/300); % predicted data
end
  2 Comments
Walter Roberson
Walter Roberson on 16 Jun 2021
L2 = zeros(14);
that should probably be
L2 = zeros(14,1);
like the other variables.
Anand Ra
Anand Ra on 16 Jun 2021
Thanks for the response, I can update it.
Can you please guide me on how to perform the data fitting in the fashion I described in bullet point 3?

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Accepted Answer

Walter Roberson
Walter Roberson on 16 Jun 2021
Edited: Walter Roberson on 16 Jun 2021
format shortE
% observed data
y_obs = [0.3 0.2 0.28 0.318 0.421 0.492 0.572 0.55 0.63 0.61 0.73 0.8 0.81 0.84 0.93 0.91]'; % If y_obs should equal to predicted, I can have more data. J us fo rthe code, I am providing limited observed data
t1 = [300:300:21600]';
T1 = t1(1:length(y_obs)).';
a=0.0011;
gama = 0.01005;
d0 = 0.000000000302;
syms d
n=1;
t=300;
L2 = sym(zeros(14,1));
L3 = sym(zeros(14,1));
L4 = sym(zeros(14,1));
At = sym(zeros(14,1));
t = 300;
n =1;
L1 = ((8*gama)/((pi*(1-exp(-2*gama*a)))));
y_pred = sym(zeros(length(T1),1));
for t = T1
for n=1:1:14
L2(n) = exp((((2*n + 1)^2)*-d*pi*pi*t)/(4*a*a));
L3(n) = (((-1)^n)*2*gama)+(((2*n+1)*pi)*exp(-2*gama*a))/(2*a);
L4(n)= ((2*n)+1)*((4*gama*gama)+((((2*n)+1)*pi)/(2*a))^2);
L5(n) = ((L2(n).*L3(n))/L4(n));
end
S(t/300) = sum(L5);
y_pred(t/300) = 1 -L1*S(t/300); % predicted data
end
sse = expand(sum((y_pred - y_obs(:)).^2));
f = matlabFunction(sse)
ans = 
opt1 = fmincon(f, d0)
opt2 = fminsearch(f, d0)
  35 Comments
Anand Ra
Anand Ra on 25 Jun 2021
However, I had to keep attempting the inital value to get the right number that would produce a fit. The optimized coefficient is same as my initial assumption.
When I tried with different datab set for y_obs, I am unable to find that perfect inital guess that would produce me a good fit.
Not sure what is going wrong.
Anand Ra
Anand Ra on 26 Jun 2021
Did I make any mistake like earlier with the code? Is there a way to get a good fit with an arbitrary initial guess?

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