# Project Euler #27 [closed]

I'm challenging myself in Project Euler but currently stuck on problem 27, in which the problem states:

Euler published the remarkable quadratic formula:

n² + n + 41

It turns out that the formula will produce 40 primes for the consecutive values n = 0 to 39. However, when n = 40, 402 + 40 + 41 = 40(40 + 1) + 41 is divisible by 41, and certainly when n = 41, 41² + 41 + 41 is clearly divisible by 41.

Using computers, the incredible formula n² 79n + 1601 was discovered, which produces 80 primes for the consecutive values n = 0 to 79. The product of the coefficients, 79 and 1601, is 126479.

Considering quadratics of the form:

n² + an + b, where |a| 1000 and |b| 1000

where |n| is the modulus/absolute value of n e.g. |11| = 11 and |4| = 4 Find the product of the coefficients, a and b, for the quadratic expression that produces > the maximum number of primes for consecutive values of n, starting with n = 0.

I wrote the following code, which gives me the answers pretty quick but it is wrong (it spits me (-951) * (-705) = 670455). Can somebody check my code to see where is/are my mistake(s)?

``````#include <iostream>
#include <vector>
#include <cmath>
#include <time.h>
using namespace std;

bool isprime(unsigned int n, int d[339]);
int main()
{
clock_t t = clock();
int c[] = {13,17,19,23,29,31,37,41,43,47,53,59,61,67,71,73,79,83,89,97,101,103,107,109,113,127,131,137,139,149,151,157,163,167,173,179,181,191,193,197,199,211,223,227,229,233,239,241,251,257,263,269,271,277,281,283,293,307,311,313,317,331,337,347,349,353,359,367,373,379,383,389,397,401,409,419,421,431,433,439,443,449,457,461,463,467,479,487,491,499,503,509,521,523,541,547,557,563,569,571,577,587,593,599,601,607,613,617,619,631,641,643,647,653,659,661,673,677,683,691,701,709,719,727,733,739,743,751,757,761,769,773,787,797,809,811,821,823,827,829,839,853,857,859,863,877,881,883,887,907,911,919,929,937,941,947,953,967,971,977,983,991,997,1009,1013,1019,1021,1031,1033,1039,1049,1051,1061,1063,1069,1087,1091,1093,1097,1103,1109,1117,1123,1129,1151,1153,1163,1171,1181,1187,1193,1201,1213,1217,1223,1229,1231,1237,1249,1259,1277,1279,1283,1289,1291,1297,1301,1303,1307,1319,1321,1327,1361,1367,1373,1381,1399,1409,1423,1427,1429,1433,1439,1447,1451,1453,1459,1471,1481,1483,1487,1489,1493,1499,1511,1523,1531,1543,1549,1553,1559,1567,1571,1579,1583,1597,1601,1607,1609,1613,1619,1621,1627,1637,1657,1663,1667,1669,1693,1697,1699,1709,1721,1723,1733,1741,1747,1753,1759,1777,1783,1787,1789,1801,1811,1823,1831,1847,1861,1867,1871,1873,1877,1879,1889,1901,1907,1913,1931,1933,1949,1951,1973,1979,1987,1993,1997,1999,2003,2011,2017,2027,2029,2039,2053,2063,2069,2081,2083,2087,2089,2099,2111,2113,2129,2131,2137,2141,2143,2153,2161,2179,2203,2207,2213,2221,2237,2239,2243,2251,2267,2269,2273,2281,2287,2293,2297,2309,2311};
int result[4];
result[3] = 0;
for (int a = -999; a < 1000; a+=2)
{
for (int b = -999; b < 1000; b+=2)
{
bool prime;
int n = 0, count = 0;
do
{
prime = isprime(n*n + a*n + b, c);
n++;
count++;
} while (prime);
count--;
n--;
if (count > result[3])
{
result[0] = a;
result[1] = b;
result[2] = n;
result[3] = count;
}
}
if ((a+1) % 100 == 0)
cout << a+1 << endl;
}
cout << result[0] << endl << result[1] << endl << result[2] << endl << result[3] << endl << clock()-t;
cin >> result[0];
return 0;
}

bool isprime(unsigned int n, int d[339])
{
int j = 0, l;
if ((n == 2) || (n == 3) || (n == 5) || (n == 7) || (n == 11))
return 1;
if ((n % 2 == 0) || (n % 3 == 0) || (n % 5 == 0) || (n % 7 == 0) || (n % 11 == 0))
return 0;
while (j <= int (sqrt(n) / 2310))
{
for (int k = 0; k < 339; k++)
{
l = 2310 * j + d[k];
if (n % l == 0)
return 0;
}
j++;
}
return 1;
}
``````
-
It doesn't bite you here, but in principle, you need more values in the `c` array, all numbers coprime to `2310`, so also `169, 221, 247, 289, ...`, e.g. `2310 + 221 = 2531` is prime; if you ever tested `2531^2`, you'd report that as prime. –  Daniel Fischer Apr 6 '13 at 15:46

## closed as too localized by woodchips, user93353, talonmies, Verbeia, Cheran ShunmugavelApr 6 '13 at 7:39

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There's a bug in isprime function.

In your function, you check all 2310 * j + d[k] where j < int (sqrt(n) / 2310)) to ensure the target n is a prime number. However, an additional condition that l < sqrt(n) is also required, or you will over-exclude some prime numbers.

For example, when a = 1, b = 41 and n = 0, your function will check whether 41 is a prime number starting from j = 0. So whether 41 can be divisible by 2310 * 0 + d[7] = 41 is also verified, which leads to a false return.

``````This version should be correct:
bool isprime(unsigned int n, int d[])
{
int j = 0, l;
if ((n == 2) || (n == 3) || (n == 5) || (n == 7) || (n == 11))
return 1;
if ((n % 2 == 0) || (n % 3 == 0) || (n % 5 == 0) || (n % 7 == 0) || (n % 11 == 0))
return 0;
double root = sqrt(n);
while (j <= int (root / 2310))
{
for (int k = 0; k < 339; k++)
{
l = 2310 * j + d[k];
if (l < root && n % l == 0)
return 0;
}
j++;
}
return 1;
}
``````
-
hmmm... thank you for it works (now the return has some reasonable values). the result i obtained is the formula P = n^2 - 61n + 971, which gives me the right answer ;) –  flymousechiu Apr 6 '13 at 1:53