给定精确度ξ,用二分法求函数f(x)零点近似值的步骤如下:
1 确定区间[a,b],验证f(a)·f(b)<0,给定精确度ξ.
2 求区间(a,b)的中点c.
3 计算f(c).
(1) 若f(c)=0,则c就是函数的零点;
(2) 若f(a)·f(c)<0,则令b=c;
(3) 若f(c)·f(b)<0,则令a=c.
(4) 判断是否达到精确度ξ:即若|a-b|<ξ,则得到零点近似值a(或b),否则重复2-4
double fun(double a, double b,double ep)//二分法,[a,b]区间进行迭代递归,ep是精度 { int k = 0; while (abs(a - b) > 2 * ep) { double x0 = (a + b) * 0.5; double fx0 = fx(x0); double fa = fx(a); double fb = fx(b); if (fa * fx0 < 0) { b = x0; } else if (fa * x0 == 0) { break; } else { a = x0; } k++; printResult(a, b, k); } return (a + b )*0.5; } double fx(double x)//函数式只需要对返回值进行修改即可 { return exp(x) - x * x + 3.0 * x - 2.0; } void printResult(double ax, double bx,int k) { cout<<k<<" " << ax << " " << bx << " " << (ax+bx)*0.5 << " "; if (fx((ax + bx) * 0.5) > 0) { cout << "+" << endl; } else { cout << "-" << endl; } }