How to get real root of a function using fminbnd?

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rezheen
rezheen on 30 Apr 2025
Commented: rezheen on 1 May 2025
Hello, How can I force MATLAB to only give real solutions to a math function using fminbnd?
This is my code:
x=-1:0.01:8; y=@(x) (x).^(4/3); yinv=@(x) -((x).^(4/3)); x_1=-1; x_2=8;
[xmin, ymin]=fminbnd(y,x_1,x_2);
[xmax, ymax]=fminbnd(yinv,x_1,x_2);
fprintf('The local maximum is %.2f at x = %.2f\n', -ymax, xmax)
fprintf('The local minimum is %.2f at x = %.2f\n', ymin, xmin)
Gives this as output:
The local maximum is 16.00 at x = 8.00 % Good. This is what it's supposed to be based on the x domain
The local minimum is -0.50 at x = -1.00 % This is the problem. (-1)^(4/3)=1 (The real solution)
Also, when I test in the Command Window:
(-1)^(4/3)
I get
-0.5000-0.866i
I think my code is spitting out the real part of (-1)^(4/3) that I get in Command Window.
Thanks for your help
  1 Comment
John D'Errico
John D'Errico on 30 Apr 2025
Moved: John D'Errico on 30 Apr 2025
@rezheen
I think you are confused. FMINBND is a MINIMIZER. It does not compute a root. If the minimum of your objective can be negative, you will get it.
You want to use fzero to compute a root. Even at that, you need to understand that raising a negative number to a fractional power has a complex result as the primary solution.

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Accepted Answer

John D'Errico
John D'Errico on 30 Apr 2025
Edited: John D'Errico on 30 Apr 2025
Ran in:
It sounds like you want to see the result:
(-1)^(4/3) == 1
To do that, you want to use nthroot, by splitting the fraction in that exponent into two parts.
x^(4/3) = (x^(1/3))^4
And therefore, we would have
f = @(x) nthroot(x,3)^4;
f(-1)
ans = 1
So now a nice real number.
This works as long as the denominator of the exponent is an integer, and thus we can use nthroot. Will it still work, if we tried that trick on x^0.63? Well, in theory, it migh seem so, since 0.63 = 63/100. But nthroot will fail then. Try it:
nthroot(-2,100)^63
Error using nthroot (line 20)
If X is negative, N must be an odd integer.
  1 Comment
rezheen
rezheen on 1 May 2025
Perfect. the nthroot function does exactly what I'm asking. It works not only for this problem but 3 other similar problems of y functions of x with fractional exponents. Thank you

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More Answers (1)

Walter Roberson
Walter Roberson on 30 Apr 2025
Ran in:
x=-1:0.01:8; y=@(x) (x).^(4/3); yinv=@(x) -((x).^(4/3)); x_1=-1; x_2=8;
[xmin, ymin]=fminbnd(y,x_1,x_2);
[xmax, ymax]=fminbnd(yinv,x_1,x_2);
fprintf('The local maximum is %.2f at x = %.2f\n', -ymax, xmax)
The local maximum is 16.00 at x = 8.00
fprintf('The local minimum is %.2f+%.2fi at x = %.2f\n', real(ymin), imag(ymin), xmin)
The local minimum is -0.50+0.87i at x = -1.00
fprintf() ignores the imaginary component of numbers.
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Steven Lord
Steven Lord on 30 Apr 2025
Ran in:
The realpow and/or nthroot functions may also be of interest.
x1 = (-1)^(1/3)
x1 = 0.5000 + 0.8660i
x2 = nthroot(-1, 3)
x2 = -1
x = roots([1, 0, 0, 1]) % all three roots
x =
-1.0000 + 0.0000i 0.5000 + 0.8660i 0.5000 - 0.8660i

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