How to define a special function with some points

10 Oct 2020
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Updated 10 Oct 2020
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I want to define a function like this
f(0.2)=1.42007;
f(0.4)=1.88124;
f(0.5)=2.12815;
f(0.6)=2.38676;
f(0.7)=2.65797;
f(0.8)=3.94289;
f(1)=3.55975;
to use these values in a For Loop. How can I define function f?
Thanks in advance.

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 Accepted Answer

Ameer Hamza
Ameer Hamza on 10 Oct 2020
Edited: Ameer Hamza on 10 Oct 2020

0 votes

You can use interp1()
x = [0.2 0.4 0.5 0.6 0.7 0.8 1];
y = [1.42007 1.88124 2.12815 2.38676 2.65797 3.94289 3.55975];
f = @(xq) interp1(x, y, xq);
Then you can also evaluate in for in-between points
>> f(0.2)
ans =
1.4201
>> f(0.3)
ans =
1.6507
>> f(0.55)
ans =
2.2575

6 Comments
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Mojtaba Mohareri
Mojtaba Mohareri on 10 Oct 2020
Edited: Mojtaba Mohareri on 10 Oct 2020
Thank you very much.
This is my code
clear all;
clc;
x = [0.2 0.4 0.5 0.6 0.7 0.8 1];
y = [1.42007 1.88124 2.12815 2.38676 2.65797 3.94289 3.55975];
f = @(xq) interp1(x, y, xq);
x = 0.6;
h = 0.4;
D(1,1) = (f(x + h) -2*f(x)+ f(x - h))/(h^2)
for i=1:2
h = h/2;
D(i + 1,1) = (f(x + h) -2*f(x)+ f(x - h))/(h^2);
for j=1:i
D(i + 1,j + 1) = (4^j*D(i + 1,j) - D(i,j))/(4^j - 1)
end
end
But the output is as follows
D =
NaN 0 0
26.2652 NaN 0
1.2600 -7.0751 NaN
Could you please tell me what the "NaN" is?
Mojtaba Mohareri
Mojtaba Mohareri on 10 Oct 2020
When I compute (f(x + h) -2*f(x)+ f(x - h))/(h^2) in Command Window separately, it equels to 1.2600, but actually D(1,1)=(f(x + h) -2*f(x)+ f(x - h))/(h^2) which is NaN.
Walter Roberson
Walter Roberson on 10 Oct 2020
Ran in:
Ran in:
clear all;
clc;
X = [0.2 0.4 0.5 0.6 0.7 0.8 1];
y = [1.42007 1.88124 2.12815 2.38676 2.65797 3.94289 3.55975];
f = @(xq) interp1(X, y, xq, 'linear', 'extrap');
x = 0.6;
h = 0.4;
f(x+h)
ans = 3.5598
f(x)
ans = 2.3868
x-h
ans = 0.2000
(x-h) - X(1)
ans = -5.5511e-17
f(x-h)
ans = 1.4201
D(1,1) = (f(x + h) -2*f(x)+ f(x - h))/(h^2)
D = 1.2894
for i=1:2
h = h/2;
D(i + 1,1) = (f(x + h) -2*f(x)+ f(x - h))/(h^2)
for j=1:i
D(i + 1,j + 1) = (4^j*D(i + 1,j) - D(i,j))/(4^j - 1)
end
end
D = 2×1
1.2894 26.2652
D = 2×2
1.2894 0 26.2652 34.5905
D = 3×2
1.2894 0 26.2652 34.5905 1.2600 0
D = 3×2
1.2894 0 26.2652 34.5905 1.2600 -7.0751
D = 3×3
1.2894 0 0 26.2652 34.5905 0 1.2600 -7.0751 -9.8528
Walter Roberson
Walter Roberson on 10 Oct 2020
If you look closely at this, you will see that 0.6 - 0.4 is not equal to 0.2 and instead is slightly less. Because of that, interp1() considered you to be doing extrapolation and the default extrapolation is NaN.
Ameer Hamza
Ameer Hamza on 10 Oct 2020
It happens when the input xq goes beyond the range of values in x. In your case, if xq is less than 0.2 or higher than 1.0, interp1 will give NaN. To avoid this, use extrapolation.
clear all;
clc;
x = [0.2 0.4 0.5 0.6 0.7 0.8 1];
y = [1.42007 1.88124 2.12815 2.38676 2.65797 3.94289 3.55975];
f = @(xq) interp1(x, y, xq, 'linear', 'extrap');
x = 0.6;
h = 0.4;
D(1,1) = (f(x + h) -2*f(x)+ f(x - h))/(h^2)
for i=1:2
h = h/2;
D(i + 1,1) = (f(x + h) -2*f(x)+ f(x - h))/(h^2);
for j=1:i
D(i + 1,j + 1) = (4^j*D(i + 1,j) - D(i,j))/(4^j - 1)
end
end
Mojtaba Mohareri
Mojtaba Mohareri on 10 Oct 2020
Edited: Mojtaba Mohareri on 10 Oct 2020
I understood. It works properly. Thank you so much for your consideration.

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