can u help me??
Bisection Method Code MATLAB
2 136 vues (au cours des 30 derniers jours)
Afficher commentaires plus anciens
Problem 4 Find an approximation to (sqrt 3) correct to within 10−4 using the Bisection method (Hint: Consider f(x) = x 2 − 3.) (Use your computer code)
I have no idea how to write this code. he gave us this template but is not working. If you run the program it prints a table but it keeps running. for some reason the program doesnt stop.
tol = 1.e-10;
a = 1.0;
b = 2.0;
nmax = 100;
% Initialization
itcount = 0;
error = 1.0;
% Graph of the function
xval = linspace(a,b,100);
for i=1:100
fval(i) = func(xval(i));
end
plot(xval,fval);
grid on;
hold on;
% iteration begins here
while (itcount <= nmax && error >= tol)
itcount = itcount + 1;
% Generate and save iteratres
x = a + (b-a)/2;
z(itcount) = x;
fa = func(a);
fb = func(b);
fx = func(x);
error = abs(fx);
% error = abs(x - xold);
if (error < tol)
x_final = x;
else
if (fa*fx < 0)
% root is between a and x
b = x;
else
% root is between x and b
a = x;
end
end
plot(z(1:itcount),zeros(itcount,1),'r+');
pause(5)
end
if (itcount < nmax);
val = func(x);
fprintf(1,'Converged solution after %5d iterations',itcount);
fprintf(1,' is %15.7e, %e \n',x_final, val);
else fprintf(1,'Not converged after %5d iterations',nmax);
end
function val = func(x)
%val = x^3 + 4 * x^2 - 10;
val = x^3 - x - 3;
%val = sin(x);
end
2 commentaires
Aristi Christoforou
le 14 Avr 2021
function[x]=bisect(m)
a=1;
b=3;
k=0;
while b-a>eps*b
x=(a+b)/2
if x^2>m
b=x
else
a=x
end
k=k+1
end
Réponses (6)
David Hill
le 4 Oct 2019
function c = bisectionMethod(f,a,b,error)%f=@(x)x^2-3; a=1; b=2; (ensure change of sign between a and b) error=1e-4
c=(a+b)/2;
while abs(f(c))>error
if f(c)<0&&f(a)<0
a=c;
else
b=c;
end
c=(a+b)/2;
end
Not much to the bisection method, you just keep half-splitting until you get the root to the accuracy you desire. Enter function above after setting the function.
f=@(x)x^2-3;
root=bisectionMethod(f,1,2);
1 commentaire
Justin Vaughn
le 10 Oct 2022
Thank you for this because I was not sure of how to easily send a functino into my method's function. yours helped tremendously!
SHUBHAM GHADOJE
le 29 Mai 2021
function c = bisectionMethod(f,j,k,error)%f=@(x)x^2-3; j=1; k=2; (ensure change of sign between a and b) error=1e-4
c=(j+k)/2;
while abs(f(c))>error
if f(c)<0&&f(a)<0
j=c;
else
k=c;
end
c=(j+k)/2;
end
0 commentaires
Prathamesh Purkar
le 6 Juin 2021
Modifié(e) : Walter Roberson
le 3 Déc 2021
tol = 1.e-10;
a = 1.0;
b = 2.0;
nmax = 100;
% Initialization
itcount = 0;
error = 1.0;
% Graph of the function
xval = linspace(a,b,100);
for i=1:100
fval(i) = func(xval(i));
end
plot(xval,fval);
grid on;
hold on;
% iteration begins here
while (itcount <= nmax && error >= tol)
itcount = itcount + 1;
% Generate and save iteratres
x = a + (b-a)/2;
z(itcount) = x;
fa = func(a);
fb = func(b);
fx = func(x);
error = abs(fx);
% error = abs(x - xold);
if (error < tol)
x_final = x;
else
if (fa*fx < 0)
% root is between a and x
b = x;
else
% root is between x and b
a = x;
end
end
plot(z(1:itcount),zeros(itcount,1),'r+');
pause(5)
end
if (itcount < nmax);
val = func(x);
fprintf(1,'Converged solution after %5d iterations',itcount);
fprintf(1,' is %15.7e, %e \n',x_final, val);
else
fprintf(1,'Not converged after %5d iterations',nmax);
end
function val = func(x)
%val = x^3 -x + 1;
val = x^3 -x + 1;
%val = sin(x);
end
0 commentaires
narendran
le 2 Juil 2022
5cosx + 4.5572 -cos30cosx-ssin30sinx
2 commentaires
Image Analyst
le 2 Juil 2022
@narendran it doesn't look like this is an answer to the original question. I think you posted this in the wrong place.
Walter Roberson
le 2 Juil 2022
syms x
y = 5*cos(x) + 4.5572 - cos(30)*cos(x)-sin(30)*sin(x)
fplot(y, [-20 20]); yline(0)
vpasolve(y,x)
Aman Pratap Singh
le 3 Déc 2021
Modifié(e) : Walter Roberson
le 3 Déc 2021
f = @(x)('x^3-2x-5');
a = 2;
b = 3;
eps = 0.001;
m = (a+b)/2;
fprintf('\nThe value of, after bisection method, m is %f\n', m);
while abs(b-a)>eps
if (f(a)*f(m))<0
b=m;
else
a=m;
end
m = (a+b)/2;
end
fprintf('\nThe value of, after bisection method, m is %f\n', m);
1 commentaire
Walter Roberson
le 3 Déc 2021
f = @(x)('x^3-2x-5');
That means that f will become a function handle that, given any input, will return the character vector ['x', '^', '3', '-', '2', 'x', '-', '5'] which is unlikely to be what you want to have happen.
f(0)
f(1)
f(rand(1,20))
Voir également
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
Translated by 
Vous pouvez également sélectionner un site web dans la liste suivante :
Amériques
- América Latina (Español)
- Canada (English)
- United States (English)
Europe
- Belgium (English)
- Denmark (English)
- Deutschland (Deutsch)
- España (Español)
- Finland (English)
- France (Français)
- Ireland (English)
- Italia (Italiano)
- Luxembourg (English)
- Netherlands (English)
- Norway (English)
- Österreich (Deutsch)
- Portugal (English)
- Sweden (English)
- Switzerland
- United Kingdom (English)
Asie-Pacifique
- Australia (English)
- India (English)
- New Zealand (English)
- 中国
- 日本Japanese (日本語)
- 한국Korean (한국어)