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##[$AcWing$ $790$. 数的三次方根](https://www.acwing.com/problem/content/description/792/)
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### 一、题目描述
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给定一个浮点数 $n$,求它的三次方根。
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**输入格式**
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共一行,包含一个浮点数 $n$。
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**输出格式**
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共一行,包含一个浮点数,表示问题的解。
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注意,结果保留 $6$ 位小数。
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**数据范围**
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$−10000≤n≤10000$
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输入样例:
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```cpp {.line-numbers}
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1000.00
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```
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**输出样例:**
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```cpp {.line-numbers}
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10.000000
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```
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### 二、理解与感悟
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浮点数二分还是很简单的,最开始使劲设置最大和最小,精度一般设为$1e-8$,然后根据条件写$check()$,发现符合就向左或向右逼近,直到结果的差,精度在可以接受的范围内,完事。
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### 三、C++代码
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```cpp {.line-numbers}
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#include <bits/stdc++.h>
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using namespace std;
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const double eps = 1e-8;
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int main() {
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double x;
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cin >> x;
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cin >> x;
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double l = -10000, r = 10000;
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while (r - l > eps) {
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double mid = (l + r) / 2; // 注意:浮点数这里不能用右移1位!!
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if (mid * mid * mid > x)
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r = mid; // mid>x后面没有"="
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else
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l = mid;
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}
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printf("%.6lf\n", l);
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return 0;
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}
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```
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### 四、牛顿迭代法
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**[如何通俗易懂地讲解牛顿迭代法?](https://www.matongxue.com/madocs/205/)**
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#### 概述
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**牛顿迭代法** 是非常高效的求解方程的根的方法。其求解原理可以参考各文献。大体的思路如下:
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> 通过不断地做切线来逼近真实的根,直到误差小于精度。
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<center><img src='https://img-blog.csdnimg.cn/63455a4dedf6426887a989333bebc42b.png'></center>
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可得迭代公式:
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$$\large x_{n+1}=x_n-\frac{f(x_n)}{f'(x_n)}$$
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通过这种不断地做切线的方法,直到 $∣x_n − x_∗∣ <$ 给定的精度,在误差范围内可以认为 $x_n$ 就是方程的根了。
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#### 牛顿法求平法根
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假设我们要求解$n$的平方根,那么我们可以构建函数$f(x)=x^2-n$。那么方程 $x^2-n=0$ 的理论根为 $x=\sqrt{n}$ ,即求解这个方程得到的根就是求的$n$的平方根。
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例如求$5$的平方根,那么可以构建函数 $f(x)=x^2-5$,方程 $x^2-5=0$ 的理论根即为 $\sqrt{5}$ ,在误差范围内,用牛顿法求解出方程 $x^2-5=0$ 的根即可认为是$5$的平方根。
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**迭代公式**
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构建函数
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$f(x)=x^2-n$
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那么有:
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$f'(x)=2x$
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根据牛顿法的迭代公式有:
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$\large x_{n+1}=x_n-\frac{f(x_n)}{f'(x_n)}=x_n-\frac{x_n^2-n}{2x_n}=\frac{x_n+n/x_n}{2}$
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#### 牛顿法求多次方根
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跟求平方根同理,只是构建的函数不同,例如求解$m$次方根,那么就需要构建函数
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$f(x)=x^m −n$
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那么就有:
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$f'(x)=m∗x^{m−1}$
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根据牛顿法的迭代公式有:
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$\huge x_{n+1}=x_n-\frac{f(x_n)}{f'(x_n)}= x_n-\frac{x_n^m-n}{m*x_n^{m-1}}$
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例如求解$n$的$3$次方根,那么就有:
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$\huge x_{n+1}=x_n − \frac{x_n^3-n}{3*x_n^2}=\frac{2x_n^3+n}{3*x_n^2}$
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例如求解$n$的$4$次方根,那么就有:
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$\huge x_{n+1}=x_n − \frac{x_n^4-n}{4*x_n^3}=\frac{3x_n^4+n}{4*x_n^3}$
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...
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以此类推
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#### 实现代码
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```cpp {.line-numbers}
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#include <bits/stdc++.h>
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using namespace std;
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/*
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浮点数不能太大,10000>=a>=-10000
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*/
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double sqrt(int n) {
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double x = n;
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for (int i = 1; i <= 100; i++) x = (x * x + n) / (2 * x);
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return x;
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}
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double sqrt3(int n) {
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double x = n;
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for (int i = 1; i <= 100; i++) x = (2 * x * x * x + n) / (3 * x * x);
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return x;
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}
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double sqrt4(int n) {
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double x = n;
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for (int i = 1; i <= 100; i++) x = (3 * x * x * x * x + n) / (4 * x * x * x);
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return x;
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}
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double sqrt5(int n) {
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double x = n;
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for (int i = 1; i <= 100; i++) x = (4 * x * x * x * x * x + n) / (5 * x * x * x * x);
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return x;
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}
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int main() {
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// 求n的平方根和立方根
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double n;
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cin >> n;
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// 平方根
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printf("%.6lf\n", sqrt(n));
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// 立方根
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printf("%.6lf\n", sqrt3(n));
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// 4次方根
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printf("%.6lf\n", sqrt4(n));
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// 5次方根
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printf("%.6lf\n", sqrt5(n));
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return 0;
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}
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```
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