I assume that #£ is a typo.
By the way, this is not twitter. No # before the tags. Thanks.
how to calculate the area under a curve?
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#£x=[0:100];
y=30-60*cos(2*pi/100*x);
plot (y);
Hello! how con i calculate the area under the curve above? i would also like to calculate portions of that area.
thanks
Réponses (3)
Jan
le 9 Juil 2019
Modifié(e) : Jan
le 9 Juil 2019
The area between a curve and the X axis is determined by the integral. So use trapz:
x = 0:100; % Square brackets waste time here only
y = 30 - 60 * cos(2 * pi / 100 * x);
A = trapz(x, y)
You can obtain the integral by hand also here:
30 * (x - 100*sin(pi * x / 50) / pi) + const.
Now insert the limits 0 and 100 to get 3000 as solution.
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Star Strider
le 9 Juil 2019
‘I would also like to calculate portions of that area.’
Use cumtrapz, and then subtract the values of the limits:
x=[0:100];
y=30-60*cos(2*pi/100*x);
Int = cumtrapz(x,y);
Intv = @(a,b) max(Int(x<=b)) - min(Int(x>=a));
SegmentArea = Intv(25, 75)
SegmentArea =
3409.2309572264
Checking:
SegmentArea = integral(@(x)30-60*cos(2*pi/100*x), 25, 75)
SegmentArea =
3409.85931710274
1 commentaire
Abolfazl Jalali Shahrood
le 31 Mai 2020
Thanks for your instructions, what if we ignore max& min in the following function?
Intv = @(a,b) max(Int(x<=b)) - min(Int(x>=a));
GIULIA CISOTTO
le 3 Nov 2020
If you would like to compute the integral of a function y(x) you can use:
Area = trapz(x,y);
or:
Int = cumtrapz(x,y);
However, if you are interested in computing the area under the curve (AUC), that is the sum of the portions of (x,y) plane in between the curve and the x-axis, you should preliminarily take the absolute value of y(x). That is, you should use the following code:
myInt = cumtrapz(x,abs(y));
myIntv = @(a,b) max(myInt(x<=b)) - min(myInt(x>=a));
AUC = myIntv(x(1), x(end));
Check it out the difference in the two computations in Figure 1 ('Your example') and Figure 2 ("1 cos period").
Figure 2 represents the toy example to check the correctness of your calculations. As we know, the integral of cos in one period (or its multiples) should be 0. Moreover, looking at the same Figure 1, we can do a double-check and roughtly compute the expected AUC between 33-th and 67-th sample as: 0.5*(67-33) + (67-33)*0.5/2 = 24 (the actual value being slightly larger).
Here are the results from the two different computations:
myInt(33,67) = 27.8845
Int(33,67) = 31.8205
2 commentaires
GIULIA CISOTTO
le 3 Nov 2020
In case of "1 cos period", I used the following y function:
y = cos(2*pi/100*x);
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