Submit | All submissions | Best solutions | Back to list |
JPM2 - Just Primes II |
Given a positive integer N, calculate the minimum number of distinct primes required such that their sum equals to N. Also calculate the number of different ways to select these primes. Two ways are considered to be different iff there exists at least one prime in one set not existing in the other.
Input
The first line contains an integer T, denoting the number of test cases. Each of the next subsequent T lines contain a positive integer N.
Constraints
- 1 ≤ T ≤ 500,000
- 1 ≤ N ≤ 500,000
Output
For each test case, output two integers X and Y separated by a single space. X denotes the minimum number of distinct primes required such that their summation equals to N, and Y is the number of ways to select these primes. If it is not possible to express N as a summation of distinct primes, set X and Y to -1 and output them. You can safely assume that the answer will always fit in a signed 32 bit integer.
Sample Input
20 1 2 10 27 100 666 1000 1729 4572 4991 10000 100000 480480 482790 499799 499847 499901 499979 499999 500000
Sample Output
-1 -1 1 1 2 1 3 3 2 6 2 31 2 28 3 2393 2 110 3 13396 2 127 2 810 2 8499 2 8291 3 31121027 3 31139901 3 31124665 1 1 3 30974053 2 3052
Warm Up
Too hard? Try the easier version here - Just PrimesAdded by: | sgtlaugh |
Date: | 2021-02-25 |
Time limit: | 5s |
Source limit: | 50000B |
Memory limit: | 1536MB |
Cluster: | Cube (Intel G860) |
Languages: | All |
Resource: | Own Problem |
hide comments
2021-06-05 17:36:21 [Lakshman]
Finally got AC ;) -> Great work, congrats! Last edit: 2021-09-02 18:52:07 |
|
2021-03-17 12:52:51
Even the dp solution here is taking around 100s!!!!! -> Not the classic coin change problem this time :) Last edit: 2021-03-21 22:54:19 |
|
2021-03-13 13:52:12 [Lakshman]
Is there a way to solve this without FFT? I have a semi brute force that takes 15s on SPOJ. -> I don't think so. Of course you can use Karatsuba or any other faster multiplication techniques instead of FFT, but the underlying idea would be the same. Last edit: 2021-03-21 22:55:02 |