Format of a number

Question

Sania Nizamani el 3 de Feb. de 2024

0
Enlazar

Enlace directo a esta pregunta

https://es.mathworks.com/matlabcentral/answers/2077751-format-of-a-number

Editada: Walter Roberson el 29 de Feb. de 2024

How can write or convert the following number as 6.5192e-353 in MATLAB R2020a?

0.00000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000006519189212084746229776610798014015843782113571066818006946457413769773297894931346117308775461249994927327158400893029327734069232681151773609865266731521520054375903565338010423727080339452649084922482509849273285567974490982577103240751064484991178667240948437033727548535692375294238872288406967117777615757244524019518397825957547275970242462715854779648975320964429805929292231364557099949366197615233659670288768272563638001796519438847757405012852185872992289542013224335055773245806454313412733757091902202174306446270378638302539811037703945271596412702870934289523078309661834975228374662651691916691844575389604650486112874690677474198715593749538378138098722106119539312955520393459310616851829420920453027031099134852992191414078925320755874886661755203134433583041067365856197990407535151294849597815149662533367217765732422274124039425622331728003788521934226574093175659329930102209493669914675156094756791723604103890639375296094056543847670814774909966692607698458476102455720781979

Thanks in advance!

3 comentarios
Mostrar 1 comentario más antiguoOcultar 1 comentario más antiguo

Sania Nizamani el 3 de Feb. de 2024

Editada: Walter Roberson el 29 de Feb. de 2024

Abrir en MATLAB Online

The number was the output of the following code of an iterative method called the Newton method. The number shown above is the absolute error at the last iteration:

clc;clear;close all;
% Set the precision to a large number using VPA digits(1000);
%sympref('FloatingPointOutput',true);
% Define your function and its derivative using VPA
f = @(x) vpa(sin(x)^2-x^2+1);
% Replace with your actual function
f_prime = @(x) vpa(sin(2*x)-2*x);
% Replace with the derivative of your function
% Initial guess
initial_guess = 6.5;
tolerance = 1e-300;
max_iterations = 200;
% Initialize variables
x = vpa(initial_guess);
tic;
% Perform iterations
for iteration = 1:max_iterations
    % Compute the next estimate using the Newton-Raphson formula
    x_next = x - f(x) / f_prime(x);
end
    % Calculate the absolute error
    AE = abs(x_next - x);
    disp( 'Error is = ' + string(AE) + char(9) );
    % Check if the change is smaller than the tolerance
    if AE < tolerance
        root = x_next;
        return;
    end
    % Update the current estimate for the next iteration
    x = x_next;
    end
    % If the loop reaches here, the method did not converge within max_iterations 
    error('Newton-Raphson method did not converge within the specified number of iterations');

Sania Nizamani el 3 de Feb. de 2024

Movida: Dyuman Joshi el 3 de Feb. de 2024

NRToleranceFeb1.m

Dear Stephen23, I have attached the .m file. Please have a look. I look forward to hearing from you. Thank you.

Iniciar sesión para comentar.

Iniciar sesión para responder a esta pregunta.

Answer 1

John D'Errico el 3 de Feb. de 2024

0
Enlazar

Enlace directo a esta respuesta

https://es.mathworks.com/matlabcentral/answers/2077751-format-of-a-number#answer_1418986

Movida: John D'Errico el 29 de Feb. de 2024

Abrir en MATLAB Online

You need to understand that MATLAB can represent numbers as large as

realmax
ans = 1.7977e+308

and as small in magnitude as

realmin
ans = 2.2251e-308

as double precision numbers. Actually, it can go a little smaller than that, because of something called de-normalized numbers, but that is an aside that I won't go into. Regardless, the number you have there is too small by a large amount. It underflows to ZERO. As far as MATLAB is concerned, it does not exist as a double.

However, if you have created it, then you are using symbolic tools to create it. And symbolic floats can handle that with nary a problem. As such, if you have the number...

x = sym('0.00000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000006519189212084746229776610798014015843782113571066818006946457413769773297894931346117308775461249994927327158400893029327734069232681151773609865266731521520054375903565338010423727080339452649084922482509849273285567974490982577103240751064484991178667240948437033727548535692375294238872288406967117777615757244524019518397825957547275970242462715854779648975320964429805929292231364557099949366197615233659670288768272563638001796519438847757405012852185872992289542013224335055773245806454313412733757091902202174306446270378638302539811037703945271596412702870934289523078309661834975228374662651691916691844575389604650486112874690677474198715593749538378138098722106119539312955520393459310616851829420920453027031099134852992191414078925320755874886661755203134433583041067365856197990407535151294849597815149662533367217765732422274124039425622331728003788521934226574093175659329930102209493669914675156094756791723604103890639375296094056543847670814774909966692607698458476102455720781979')
x = 6.519189212084746229776610798014e-353

As you can see, MATLAB has no problem expressing it as you ask. And if you want to see only 5 significant digits, then tell vpa to do so.