两道算法题:
1、写一个树的中序排序算法。【这道题固定模式,没啥好玩的,自己去熟悉就可以了,没有下面例子题目有趣】
2、是 Leecode 的第 70. 爬楼梯面试题目:
假设你正在爬楼梯。需要 n 阶你才能到达楼顶。
每次你可以爬 1 或 2 个台阶。你有多少种不同的方法可以爬到楼顶呢?
注意:给定 n 是一个正整数。
我的解题思路:
from itertools import permutations
def step_all(n):
total = 0
"""
:param n: 总台阶,每次只走1或2,组合有多少种
:return: all
"""
if n == 1:
return 1
elif n == 2:
return 2
elif n >= 3:
if n % 2 == 0:
step_min = int(n/2) # 最小的step登顶
for i in range(step_min+1, n):
len_i = i # 长度
count_two = (step_min - (len_i - step_min))
count_one = len_i - count_two
list_step = [2 for x in range(count_two)]
list_step.extend([1 for y in range(count_one)])
li_per = list(permutations(list_step))
count = len(set(li_per))
total += count
return total+2
elif n % 2 == 1:
total = 0
step_min = int((n-1) / 2) + 1 # 最小的step登顶,step-min为2的个数 3:2 4:1 5:0
for i in range(step_min+1, n):
len_i = i # 长度
count_two = (step_min - (len_i-(step_min-1)))
print(count_two)
count_one = len_i - count_two
list_step = [2 for x in range(count_two)]
list_step.extend([1 for y in range(count_one)])
li_per = list(permutations(list_step))
count = len(set(li_per))
print(count)
total += count
print(total)
step_min_list = [2 for z in range(step_min-1)]
step_min_list.extend([1 for i in range(1)])
li_per = list(permutations(step_min_list))
step_min_list_count = len(set(li_per))
total = total + step_min_list_count + 1
return total
上述的代码在 1-15 之间的运行是没问题的,所以便提交到 Leecode,发现报错。
然后便换一种方式了,原理不变,借助数学组合公式并去重得出结果【核心是:对 [1,1,1,2,2,1,1] 类似的数据进行去重组合】
def step_all(n):
def mutil_sum(start_x, end_x=None):
sum_total = 1
if end_x:
print(end_x)
for i in range(start_x, start_x - end_x, -1):
sum_total *= i
return sum_total
for i in range(1, start_x + 1):
sum_total *= i
return sum_total
if n == 1:
return 1
elif n == 2:
return 2
elif n >= 3:
if n % 2 == 0:
total = 0
min_len = int((n / 2))
count_two = min_len
count_one = 0
for i in range(min_len, n):
print("只需%s次爬上楼顶"%(count_two + count_one))
print("2的个数:%s" % count_two)
print("1的个数:%s" % count_one)
if count_two >= count_one:
type_sum = mutil_sum((count_one+count_two), count_two) / mutil_sum(count_two)
total += type_sum
print("只需%s次爬上楼顶的组合数为:%s"%((count_two + count_one), type_sum))
else:
type_sum = mutil_sum((count_one + count_two), count_one) / mutil_sum(count_one)
total += type_sum
print("只需%s次爬上楼顶的组合数为:%s" % ((count_two + count_one), type_sum))
count_two -= 1
count_one += 2
print("只需%s次爬上楼顶" % (count_two + count_one))
print("2的个数:%s" % count_two)
print("1的个数:%s" % count_one)
if count_two >= count_one:
print("%s >= %s"%(count_two, count_one))
type_sum = (mutil_sum((count_one+count_two), count_two)) / mutil_sum(count_two)
total += type_sum
print("只需%s次爬上楼顶的组合数为:%s" % ((count_two + count_one), type_sum))
else:
type_sum = (mutil_sum((count_one+count_two), count_two)) / mutil_sum(count_one)
total += type_sum
print("只需%s次爬上楼顶的组合数为:%s" % ((count_two + count_one), type_sum))
return total
if n % 2 == 1:
total = 0
min_len = int(((n - 1) / 2)) + 1
count_two = min_len - 1
count_one = 1
for i in range(min_len, n):
print("只需%s次爬上楼顶"%(count_two + count_one))
print("2的个数:%s" % count_two)
print("1的个数:%s" % count_one)
if count_two >= count_one:
type_sum = (mutil_sum((count_one+count_two), count_two)) / mutil_sum(count_two)
total += type_sum
print("只需%s次爬上楼顶的组合数为:%s"%((count_two + count_one), type_sum))
else:
type_sum = (mutil_sum((count_one+count_two), count_one)) / mutil_sum(count_one)
total += type_sum
print("只需%s次爬上楼顶的组合数为:%s" % ((count_two + count_one), type_sum))
count_two -= 1
count_one += 2
print("只需%s次爬上楼顶" % (count_two + count_one))
print("2的个数:%s" % count_two)
print("1的个数:%s" % count_one)
if count_two >= count_one:
type_sum = (mutil_sum((count_one+count_two), count_two)) / mutil_sum(count_two)
total += type_sum
print("只需%s次爬上楼顶的组合数为:%s" % ((count_two + count_one), type_sum))
else:
type_sum = (mutil_sum((count_one+count_two), count_one)) / mutil_sum(count_one)
total += type_sum
print("只需%s次爬上楼顶的组合数为:%s" % ((count_two + count_one), type_sum))
return total
运行结果 OK,代码的执行效率底下,需要进行优化,目前只是能实现功能而已。可惜当时没时间。没去发现规律。不过我觉得这种更好玩,比那种直接写二叉树啥的固定模式好玩。用例子来描述算法,这方式值得提倡。最近学习了动态规划,利用动态规划试下
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爬楼梯这个题目好多年的经典了
爬楼梯的题不是斐波那契数列吗?一个递归就可以解决呀
