Something must be a floating point scalar?
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Mathidiot Superfacial
on 14 Mar 2016
Commented: Walter Roberson
on 10 Apr 2022
f=@(x,y) sqrt(9-x.^2-y.^2);
xmax=@(y) sqrt(9-y.^2);
volume=integral2(f,0,xmax,0,3)
But it says XMAX must be a floating point scalar? What's wrong?
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Accepted Answer
James Tursa
on 14 Mar 2016
Edited: James Tursa
on 14 Mar 2016
The error message seems pretty clear. The x limits must by scalar values. The y limits can be functions of x. Just rearrange things so that is the case. Since f is symmetric with respect to x and y, you can just switch arguments.
integral2(f,0,3,0,xmax)
2 Comments
Walter Roberson
on 14 Mar 2016
Edited: Walter Roberson
on 14 Mar 2016
For 2D integrals, theory says that it does not matter which order you evaluate the integration. So define the function handle to be integrated so that the first parameter is the one with fixed bounds and the second parameter is the one with variable bounds. Remember it is not required that x be the first parameter.
f = @(y, x) x.^2 + x.*sin(y).^2;
xmax=@(y) sqrt(9-y.^2);
integral2(f, 0, 3, 0, xmax )
More Answers (1)
Albert Justin
on 10 Apr 2022
Enter the function f(x,y)=@(x,y) x.*y
Enter the outer integral lower limit:0
Enter the outer integral upper limit:a
Enter the inner integral lower limit:@(x) x.^2
Enter the inner integral upper limit:@(x) 2-x
i get the same error
1 Comment
Walter Roberson
on 10 Apr 2022
a = 5;
f = @(x,y) x.*y
xmin = 0
xmax = a
ymin = @(x) x.^2
ymax = @(x) 2-x
integral2(f, xmin, xmax, ymin, ymax)
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