1006.Clumsy Factorial(笨阶乘)
Description
Normally, the factorial of a positive integer n is the product of all positive integers less than or equal to n. For example, factorial(10) = 10 * 9 * 8 * 7 * 6 * 5 * 4 * 3 * 2 * 1.
We instead make a clumsy factorial: using the integers in decreasing order, we swap out the multiply operations for a fixed rotation of operations: multiply (*), divide (/), add (+) and subtract (-) in this order.
For example, clumsy(10) = 10 * 9 / 8 + 7 - 6 * 5 / 4 + 3 - 2 * 1. However, these operations are still applied using the usual order of operations of arithmetic: we do all multiplication and division steps before any addition or subtraction steps, and multiplication and division steps are processed left to right.
Additionally, the division that we use is floor division such that 10 * 9 / 8 equals 11. This guarantees the result is an integer.
Implement the clumsy function as defined above: given an integer N, it returns the clumsy factorial of N.
通常,正整数 n 的阶乘是所有小于或等于 n 的正整数的乘积。例如,factorial(10) = 10 * 9 * 8 * 7 * 6 * 5 * 4 * 3 * 2 * 1。
相反,我们设计了一个笨阶乘 clumsy:在整数的递减序列中,我们以一个固定顺序的操作符序列来依次替换原有的乘法操作符:乘法(*),除法(/),加法(+)和减法(-)。
例如,clumsy(10) = 10 * 9 / 8 + 7 - 6 * 5 / 4 + 3 - 2 * 1。然而,这些运算仍然使用通常的算术运算顺序:我们在任何加、减步骤之前执行所有的乘法和除法步骤,并且按从左到右处理乘法和除法步骤。
另外,我们使用的除法是地板除法(floor division),所以 10 * 9 / 8 等于 11。这保证结果是一个整数。
实现上面定义的笨函数:给定一个整数 N,它返回 N 的笨阶乘。
题目链接:https://leetcode.com/problems/clumsy-factorial/
个人主页:http://redtongue.cn or https://redtongue.github.io/
Difficulty: medium
Example 1:
Input: 4
Output: 7
Explanation: 7 = 4 * 3 / 2 + 1
Example 2:
Input: 10
Output: 12
Explanation: 12 = 10 * 9 / 8 + 7 - 6 * 5 / 4 + 3 - 2 * 1
Note:
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1 <= N <= 10000
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-2^31 <= answer <= 2^31 - 1 (The answer is guaranteed to fit within a 32-bit integer.)
分析
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以4为基础,每一部分的前四个数字对应Mul=(a+3)*(a+2)/(a+1),Add=a;
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和为s,第一部分是s=Mul+Add,后面的部分是s=s-Mul+Add(后面返回结果时,若长度小于4也要日常考虑)
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去掉完整的四个数字构成一部分,还有一部分长度N-N//44的计算式,对应[空、-1、-21、-3*2/1];
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两部分相加即是最后的结果。
参考代码
class Solution(object):
def clumsy(self, N):
n=N//4
index=N-n*4
s=0
for i in range(n):
judgeMul=int((index+4*(n-i))*(index+4*(n-i)-1)/(index+4*(n-i)-2))
judgeAdd=index+4*(n-i)-3
if(s==0):
s=judgeMul+judgeAdd
else:
s-=judgeMul
s+=judgeAdd
li=[0,1,2,6]
if(s==0):
return li[index]
return s-li[index]