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1. ´ÙÀ½ ºñ¼±Çü ¹æÁ¤½ÄÀÇ ±Ù»çÇظ¦ À̺йýÀ» ÀÌ¿ëÇÏ¿© ã¾Æº¸ÀÚ
nf(x)=x^2-4sin(x)
nÃʱâ: a=1, b=3,tol=10^(-5)
nHint:»ç¿ëÀÚ Á¤ÀÇ ÇÔ¼ö¡®f.m¡¯À» Á¤ÀÇÇÏ¿© »ç¿ëÇØ º¸ÀÚ
2.´ÙÀ½ºñ¼±Çü ¹æÁ¤½ÄÀÇ ±Ù»çÇظ¦Newton¹æ¹ýÀ»ÀÌ¿ëÇÏ¿© ã¾Æº¸ÀÚ
nf(x)=x^2-4sin(x)
nÃʱâ:x (±Ù»çÇØ)=3,tol=10^(-5)
nHint1:¾Õ¿¡¼ »ç¿ëÇß´ø »ç¿ëÀÚÁ¤ÀÇ ÇÔ¼ö¡®f.m¡¯À» »ç¿ëÇÏÀÚ
nHint2: f¡¯(x)=2x-4cos(x)»ç¿ë
3.´ÙÀ½ ºñ¼±Çü ¹æÁ¤½ÄÀDZٻçÇظ¦ÇÒ¼±¹ýÀ»ÀÌ¿ëÇÏ¿© ã¾Æº¸ÀÚ
nf(x)=x^2-4sin(x)
nÃʱâ: x0 (±Ù»çÇØ1)=1, x1 (±Ù»çÇØ2)=3,tol=10^(-5)
n itermax(ÃÖ´ë ¿¬»ê Ƚ¼ö)=100
nHint:¾Õ¿¡¼ »ç¿ëÇß´ø »ç¿ëÀÚ Á¤ÀÇ ÇÔ¼ö¡®f.m¡¯À» »ç¿ëÇÏÀÚ
% À̺йý
clear;
clc;
a=1; % ÃÖÃÊ ±¸°£ ¿ÞÂÊ ³¡
b=3; % ÃÖÃÊ ±¸°£ ¿À¸¥ÂÊ ³¡
tol=10^(-5); % tolerance
iter=1;
while abs(b-a) > tol
m=a+(b-a)/2; % Áß°£ À§Ä¡ ãÀ½
if f(a)*f(m) < 0 % ÇØ°¡ ¿ÞÂÊ ¹Ý¿¡ ÀÖÀ½
b=m;
else % ÇØ°¡ ¿À¸¥ÂÊ ¹Ý¿¡ ÀÖÀ½
a=m;
end
x(iter)=m;
iter=iter+1;
end
iter % ÃÑ iteration ¼ö
m
f(m)
plot(x, '-ro')
grid on;
% ´ºÅÏ
clear;
clc;
x=3; % ÃÖÃÊ ±Ù»çÇØ
tol=10^(-5); % tolerance
iter=1;
while abs(f(x)) > tol
x=x-f(x)/(2*x-4*cos(x));
xx(iter)=x;
iter=iter+1;
end
iter % ÃÑ iteration ¼ö
x
f(x)
plot(xx, '-ro');
grid on;
% ÇÒ¼±¹ý
clear;
clc;
x0=1;
x1=3;
tol=10^(-5); % tolerance
itermax=100;
for i=1:itermax
x2=x1-f(x1)*(x1-x0)/(f(x1)-f(x0));
if abs(f(x2)) < tol
break;
end
x0=x1;
x1=x2;
zz(i)=x2;
end
i % ÃÑ iteration ¼ö
x2
f(x2)
plot(zz, '-ro');
grid on;
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