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k-th-smallest-prime-fraction.py
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k-th-smallest-prime-fraction.py
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# Time: O(nlogr)
# Space: O(1)
# Another cool O(n) solution by using quick select with median of median could be found here:
# https://leetcode.com/problems/k-th-smallest-prime-fraction/discuss/115545/O(n)
# A sorted list A contains 1, plus some number of primes.
# Then, for every p < q in the list, we consider the fraction p/q.
#
# What is the K-th smallest fraction considered?
# Return your answer as an array of ints, where answer[0] = p and answer[1] = q.
#
# Examples:
# Input: A = [1, 2, 3, 5], K = 3
# Output: [2, 5]
# Explanation:
# The fractions to be considered in sorted order are:
# 1/5, 1/3, 2/5, 1/2, 3/5, 2/3.
# The third fraction is 2/5.
#
# Input: A = [1, 7], K = 1
# Output: [1, 7]
#
# Note:
# - A will have length between 2 and 2000.
# - Each A[i] will be between 1 and 30000.
# - K will be between 1 and A.length * (A.length + 1) / 2.
class Solution(object):
def kthSmallestPrimeFraction(self, A, K):
"""
:type A: List[int]
:type K: int
:rtype: List[int]
"""
def check(mid, A, K, result):
tmp = [0]*2
count = 0
j = 0
for i in xrange(len(A)):
while j < len(A):
if i < j and A[i] < A[j]*mid:
if tmp[0] == 0 or \
tmp[0]*A[j] < tmp[1]*A[i]:
tmp[0] = A[i]
tmp[1] = A[j]
break
j += 1
count += len(A)-j
if count == K:
result[:] = tmp
return count >= K
result = []
left, right = 0.0, 1.0
while right-left > 1e-8:
mid = left + (right-left) / 2.0
if check(mid, A, K, result):
right = mid
else:
left = mid
if result:
break
return result