Number theory is that branch of mathematics that investigates the properties of numbers, typically whole numbers.

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This Java program converts a natural number into a set-theoretic encoding using iteration. Request help/strategies for a recursive solution?

I'm trying to get a better understanding of ZFC set theory, in particular how a computer program might model the axiom of infinity to "construct" natural numbers. The typical symbols I've seen used to ...
6
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1answer
71 views

Number which can be written as sum of two Squares

From the math principle: A number N is expressible as a sum of 2 squares if and only if in the prime factorization of N, every prime of the form (4k+3) occurs an even number of times! What I did ...
2
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1answer
59 views

Using of Binary Search

I have given an Range L to R. I have to find out the how many numbers are there between L to R such that number is having an odd number of divisors. 1<L<R<10^18 Since L and R are quite ...
3
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2answers
80 views

Efficiently finding the number of divisors in Haskell

Trying to work out Problem 12 on Project Euler in Haskell. The sequence of triangle numbers is generated by adding the natural numbers. So the 7th triangle number would be 1 + 2 + 3 + 4 + 5 ...
2
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1answer
73 views

Find the value in range L to R in given array

Given array A, and two indexes L and R,find the value of Summation(AS[i]*AS[j]*AS[k]) where L<=i<j<k<=R holds, and AS is the sorted set of all elements of A in range L to R ...
2
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2answers
105 views

Number of Contigious subarrays satisfying constraints

Given array A , find number of continious sub arrays which satisfies condition: There is no pair (i,j) in the subarray such that i < j and A[i] mod A[j]= M 1<=A[i]<=100000 My ...
-3
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1answer
20 views

Modular arithmetic Basic cofusion

I am just learning number theory .When I was reading modular arithmetic I came across this statement : 29 is congruent to 15 (mod 7). So actually this statement actually shows just 29 is congruent ...
0
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1answer
29 views

Modular arithmetic AND Eucledian Algorithm

I was studying how to find the modular inverse. Suppose the example is: 27*x is congruent to 1 (mod 392) . Now we have to find x. In the process we write this Equation as: x is congruent to ...
2
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1answer
79 views

How to determine the time complexity of this algorithm?

The following function calculates a^b. assume that we already have a prime_list which contain all needed primes and is sorted from small to large. The code is written in python. def power(a,b): ...
0
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1answer
805 views

Number of continuous Segments?

An array A of N integers and one integer K. Count number of non-empty contiguous sub sequences of A, such that there are no bad pairs of integers in this sub segment. A pair (x, y) of integers is ...
-1
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1answer
32 views

Logical error in finding the prime number between two numbers

I am writing code to print prime numbers between two numbers but my code is giving the wrong output and freezing after giving it http://www.spoj.com/problems/PRIME1/ #include<iostream> ...
5
votes
2answers
62 views

Number theory algorithms. Most divisors on the segment

I'm looking for an efficient algorithm to solve the following problem. Let d(n) denote number of positive divisors of n where n is positive integer. We're given some 1 <= a <= b <= 10^18 ...
-3
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2answers
83 views

nth non-Fibonacci number

how to find nth non-Fibonacci number in o(logn) non-Fibonacci number are : 4,6,7,9,10.... below function gives non-Fibonacci number for given value of n static int nonFibonacci(int n){ int ...
1
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2answers
38 views

Kaprekar numbers: I Get ValueError: invalid literal for int() with base 10 ''

I don't know why I get this type of error.. this code is about finding kaprekar numbers in a specefic interval def find_kaprekar(p,q): numbers = [] for i in range(p,q): str_i = ...
0
votes
1answer
13 views

Euler's Totient function permutation

I was doing this problem on SPOJ. www.spoj.com/problems/TIP1. I have written this code but I am getting time limit exceeded when judged. Can anyone help me with any optimization or a better approach. ...
1
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3answers
70 views

Number of subarrays within a sum range

Question Given an array of non negative integers A, and a range (B, C), find the number of continuous subsequences in the array which have sum S in the range [B, C] or B <= S <= C Continuous ...
0
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3answers
46 views

Error in C program to find integer triplets (x,y,z) such that n^x + n^y = n^z for given range of n

I want to make a C program compatible for DEV-C++ 4.9.9.2 to find integer triplets (x,y,z) such that for any integer n the equation $ n^x + n^y = n^z $ holds where n is any integer in the range [a,b]. ...
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1answer
88 views

C++ Number theory: Fastest way to compute max(y = a_i * x+ b_i) <= k

following Problem, when having to make a fast code: I have a list of 2 integers a_i and b_i and I have to compute the equation: y = (a_i * x + b_i), where I'm only interested in y, not in x. All a_i's ...
1
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1answer
43 views

Different ways of generating the partitions of a number in order

I have an exercise in my algorithms text book that asks me to generate the partitions of a number in order. I have solved it, but while solving the exercise the traditional way I came up with a new ...
1
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2answers
80 views

How to make the Sieve of Eratosthenes faster?

I am trying to solve the 10 problem in the Project Euler. It consists on finding the sum of all the primes below two million. I wrote the following code based on the Sieve of Eratosthenes. import ...
2
votes
1answer
75 views

What is the reason behind calculating GCD in Pollard rho integer factorisation?

This is the pseudo code for calculating integer factorisation took from CLRS. But what is the point in calculating GCD involved in Line 8 and the need for doubling k when i == k in Line 13.? Help ...
4
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3answers
196 views

Riemann Zeta Function in Java - Infinite Recursion with Functional Form

Note: Updated on 06/17/2015. Of course this is possible. See the solution below. Even if anyone copies and pastes this code, you still have a lot of cleanup to do. Also note that you will have ...
4
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2answers
58 views

Number of divisiors upto 10^6

I have been trying to solve this problem. http://www.spoj.com/problems/DIV/ for calcuating interger factors, I tried two ways first: normal sqrt(i) iteration. int divCount = 2; for ...
0
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0answers
19 views

A weird recurrence related to subsets

I was trying to solve an algorithmic problem, and I managed to reduce it to a certain recurrence. The problem has to do with subsets and operations on them, but the simplified version should sound ...
4
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1answer
173 views

How to compute a^^b mod m?

I have to compute efficiently a^^b mod m for large values of a,b,m<2^32 where ^^ is the tetration operator: 2^^4=2^(2^(2^2)) m is not a prime number and not a power of ten. Can you help?
3
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1answer
62 views

Getting the GHC to accept type signature with KnownNat arithmetic

I have been trying to implement the Chinese Remainder Theorem, for the specific case of just two equations, using the Data.Modular package. The idea is that I can specify each equation with only one ...
0
votes
1answer
47 views

RSA key generation

//test whether it is prime number ot not int prime_test(long int prime_number) { long int a, p; srand((unsigned)time(NULL)); //0 and 1 not meaning for prime test. a = ...
2
votes
2answers
74 views

How should I generate random numbers for a genetic algorithm? [closed]

I'm writing a genetic algorithm to solve the Master Mind game. I've done lots of research on best approaches and it's incredibly important to have a diverse population. I'm trying to determine how to ...
5
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3answers
140 views

Product of Prime factors of a number

Given a number X , what would be the most efficient way to calculate the product of the prime factors of that number? Is there a way to do this without actual factorisation ? Note-The product of prime ...
1
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1answer
58 views

How to find m in c = m^e (mod n) if c, e, n are known

Suppose I have known java BigIntegers c, e, and n, is there a way to quickly calculate the BigInteger m, where: c = m^e (mod n)
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1answer
59 views

Divisibility of power [closed]

An array of length n is given as `A[1] , A[2], A[3], A[4] , A[5] , ......., A[n] and a Number x is given. How to find that A[1]^A[2]^A[3]^.....^A[n-1]^A[n] mod x is equal to zero or not ? ...
2
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1answer
76 views

Finding 2 pentagonal numbers whose sum and difference produce pentagonal number

I am trying to calculate two pentagonal numbers whose sum and difference will produce another pentagonal number. In my main function I use pentagonal number theorem to produce pentagonal number sums ...
0
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0answers
43 views

Python equivalent to radical() in Sage?

I'm working on some code to generate the number of triples satisfying the ABC conjecture that are less than a given quality and within a specified integer range. I originally wrote my code in Sage, ...
3
votes
3answers
79 views

How can I reduce the runtime?

Here is a link to the problem I'm trying to solve: http://acm.timus.ru/problem.aspx?space=1&num=1086 Here is my approach: #include <stdio.h> #include <math.h> int main() { int ...
2
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4answers
61 views

iterative implementation of the ruler function (1,2,1,3,1,2,1,4,1,2,1,3,…)

What is an iterative implementation of the ruler function? This website asserts that "The ruler function can be generated non-recursively" but never shows an example. A recursive implementation ...
0
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1answer
47 views

Modular arithmetic and semi elgamal encryption

I'm implementing a semi ELGamal cryptosystem(from a research paper) function that has been used in PVSS. Unfortunately, I fail to decrypt as it has been described in the algorithm. Here is the ...
1
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2answers
84 views

How to compute the remainder of a very large number (string with 1 mi digits) in the division by 1500

I'm wondering if there is a trick with number theory to compute this remainder without need to implement a BigInt division algorithm.
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2answers
57 views

Needs a proof in a part of prime factorisation

According to topcoder Link, We need to compute till square root of number to list its all prime factors... Now I am able to prove in the following code that we are doing right till we are in the for ...
-2
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1answer
91 views

Find number of occurrences of digits from 1 to N without using loop

For example, n=11 means, then the map should have 0-1, 1-4, 2-1, 3-1, 4-1, 5-1, 6-1, 7-1, 8-1, 9-1 public void countDigits(int n, Map map) { while (n != 0) { int d = n%10; ...
0
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0answers
41 views

How to recognize binomial coefficients(n choose r) in a given input

I'm trying to do a reverse binomial coefficient calculation in which I get a set of random combinations of (n,r), then I must be able to determine any n-Choose-r(n,r) in the set or subsets. For e.g. ...
2
votes
1answer
46 views

How to define matching axis notches from existing “step list”

I need a way to align tick marks on two separate axis, while being able to control the "step" value (value between tick marks), where both axis start at mark 0 and end on a different maximum value. ...
3
votes
2answers
284 views

How to check if the number can be represented prime power (nth root is prime or not)

I am trying this problem for a while but getting wrong answer again and again. number can be very large <=2^2014. 22086. Prime Power Test Explanation about my algorithm: For a Given number I am ...
1
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1answer
49 views

How to generate public key for Okamoto Uchiyama Cryptosystem?

I am implementing Okamoto Uchiyama Cryptosystem in Java. The algorithm is here For public key, value of a parameter h is calculated as, h = g^n mod n where, g is primitive root of prime p (340 ...
3
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2answers
94 views

Maximum “divide” operations on an array

Given an array of n positive integers a[1], a[2], ..., a[n] and m good pairs of integers (i1, j1), (i2, j2), ..., (im, jm) where 1 ≤ ik < jk ≤ n , n<=100 & m<=100 EDIT: Each good pair ...
0
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3answers
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Better Algorithm to find the maximum number who's square divides K :

Given a number K which is a product of two different numbers (A,B), find the maximum number(<=A & <=B) who's square divides the K . Eg : K = 54 (6*9) . Both the numbers are available i.e 6 ...
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3answers
181 views

Java BigInteger , number theory , modular arithmetic [closed]

Anyone have an idea on how to implement such a problem in java ? "Implement a subroutine that takes three positive integer arguments (a; b; n) and returns the value of ( (a to the power of b) mod n), ...
1
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2answers
61 views

Find smallest integer in array which is a divisor of all previous integers

I've been solving previous years' exam questions for practice and I came across one problem that I /suspect/ I can't solve without a number theory relation that I am not aware of. The problem is: ...
5
votes
2answers
274 views

Efficiently compute the modulo of the sum of two numbers

I have three N-bit numbers, A, B, and C. I cannot easily calculate (A + B) % C but I can easily calculate A % C and B % C. If the modulo operation is unsigned and I know ahead of time that A + B ...
1
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0answers
51 views

Practical Prime Factorization

I've read about factorization of integers into the prime factors and did a proof of concept implementation of Pollard's rho algorithm: https://en.wikipedia.org/wiki/Pollard%27s_rho_algorithm The ...
2
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0answers
173 views

how to calculate a^(b^c) mod n? [duplicate]

Can someone tell me the efficient way to solve this problem ? abc mod m a, b, c, and m are 32 bit int where m is not a prime number and a is not coprime to m?I've looking for the answer, but haven't ...