clc;
clear;
format long;
% Dados do problema
a = 0;
b = 4;
N = 10;
h = (b-a)/N;
% Vetores
x = zeros(N+1,1);
y = zeros(N+1,1);
% Condição inicial
x(1) = 0;
y(1) = 1;
% Função
f = @(x,y) 1./(1+4*x.^2) + 0.4*y.^2;
% Método de Runge-Kutta de 4ª ordem
for n = 1:N
k1 = f(x(n),y(n));
k2 = f(x(n)+h/2, y(n)+(h/2)*k1);
k3 = f(x(n)+h/2, y(n)+(h/2)*k2);
k4 = f(x(n)+h, y(n)+h*k3);
y(n+1) = y(n) + (h/6)*(k1 + 2*k2 + 2*k3 + k4);
x(n+1) = x(n) + h;
end
fprintf(' x y_aprox\n');
fprintf('---------------------------------\n');
for i = 1:N+1
fprintf('%8.4f %14.10f\n', x(i), y(i));
end
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