ENG  RUSTimus Online Judge
Online Judge
Problems
Authors
Online contests
About Online Judge
Frequently asked questions
Site news
Webboard
Links
Problem set
Submit solution
Judge status
Guide
Register
Update your info
Authors ranklist
Current contest
Scheduled contests
Past contests
Rules

University academic school olympiad in informatics 2019

About     Problems     Submit solution     Judge status     Standings
Contest is over

G. Polyphemus' triples

Time limit: 1.0 second
Memory limit: 256 MB
Cyclops Polyphemus, once blinded by cunning Odysseus, have given up sheep breeding and started to do math. For the past time the offense on insidious Greek subsided somewhat, Polyphemus have analyzed the situation and now he is totally absorbed by the work on the bugs. Blind Polyphemus sees the root of his defeat in square root ignorance. Now they are the only topic of his research.
At the moment, cyclops is entertained by the triplets of positive integer numbers, possessing the following property: sum of the square roots of the first two numbers equals the square root of the third number (in tribute to the researcher we will call such triplets Polyphemus’). For example, √ 7857  + √ 24832  = √ 60625  is a Polyphemus’ triplet.
To a greater extent Polyphemus was fascinated by the fact that some numbers may be part of multiple different Polyphemus’ triplets. For each number C Polyphemus defined z(C) as a number of pair of nonnegative integer numbers A ≤ B, such that  A  + √ B  = √ C . Cyclops have found truly wonderful algorithm for calculating z(C) using only a compass and a ruler, but, unfortunately, because of his blindness Polyphemus can’t implement it in real life! That’s why you should help him find z(C).

Input

A single line contains a single integer number C, 0 ≤ C ≤ 1018.

Output

You should output a single number  — z(C).

Samples

inputoutput
9
2
3
1
Problem Author: Pavel Klimov
Problem Source: University academic school olympiad in informatics 2019
To submit the solution for this problem go to the Problem set: 2117. Polyphemus' triples