How to solve a nonlinear equation?

CS
20 Ott 2020
1 Risposta
Aggiornato 21 Ott 2020
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I have an equation as follows
x^(8.5)+3*x^(2)=3000
How can I solve for x?
Thanks for any help!

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Matt J
Matt J il 20 Ott 2020
Modificato: Matt J il 20 Ott 2020
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[x,fval] = fzero( @(x) x^(8.5)+3*x.^2-3000,nthroot(3000,8.5))
x = 2.5629
fval = 4.5475e-13

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CS
CS il 20 Ott 2020
Thanks!
What is the function of nthroot(3000,9)?
Matt J
Matt J il 20 Ott 2020
You're welcome. Please Accept-click if you are satisfied with the answer.
nthroot(3000,9) is the initial guess provided to fzero. With such a large exponent, we can expect the left hand side of the equation to be approximately x^9.
CS
CS il 20 Ott 2020
And what is fval indicating?
Matt J
Matt J il 20 Ott 2020
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It is the value of the function at the point found by fzero. You use it to see if the point is approximately a root. Equivalently, you could do,
fun=@(x) x^(8.5)+3*x.^2-3000;
x = fzero( fun,nthroot(3000,8.5)),
x = 2.5629
fval=fun(x)
fval = 4.5475e-13
CS
CS il 21 Ott 2020
How about the below one?
[x,fval] = fzero( @(x) ((1/(3.52*10.^(22)))*x^(8.14))+(1/207000)*x.^2-4.52,0)
CS
CS il 21 Ott 2020
It gives the error
Exiting fzero: aborting search for an interval containing a sign change
because complex function value encountered during search.
(Function value at -0.0282843 is -4.52+3.0076e-36i.)
Check function or try again with a different starting value.
How to solve this?
Matt J
Matt J il 21 Ott 2020
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[x,fval] = fzero( @(x) ((1/(3.52*10.^(22)))*abs(x)^(8.14))+(1/207000)*x.^2-4.52,0)
x = -656.6949
fval = -8.8818e-16

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CS
CS
il 20 Ott 2020

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Matt J
Matt J
il 21 Ott 2020

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