Esempio n. 1
0
        public BigInteger Solve(BigInteger?input = null)
        {
            bool[]     primesUnderAMillion = PrimeHelper.FindPrimesUnderLimit(1000000);
            BigInteger result = 0;

            for (int i = 2; i < 1000000; i++)
            {
                var testNumber = i;
                var circular   = true;
                var testString = testNumber.ToString();

                for (int j = 0; j <= i.ToString().Length + 1; j++)
                {
                    if (!primesUnderAMillion[testNumber] || testNumber > 1000000)
                    {
                        circular = false;
                        break;
                    }

                    testString = testString.Insert(testString.Length, testString.Substring(0, 1));
                    testString = testString.Remove(0, 1);
                    testNumber = int.Parse(testString);
                }

                if (circular)
                {
                    result++;
                }
            }

            return(result);
        }
Esempio n. 2
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        public BigInteger Solve(BigInteger?input = null)
        {
            int result      = 0;
            int primesLimit = 100000;

            while (result == 0)
            {
                BigInteger numberOfPrimes = 0;
                bool[]     test           = PrimeHelper.FindPrimesUnderLimit(primesLimit);
                for (int i = 0; i < test.Length; i++)
                {
                    if (test[i])
                    {
                        numberOfPrimes++;

                        if (numberOfPrimes == input)
                        {
                            result = i;
                        }
                    }
                }

                primesLimit += 100000;
            }
            return(result);
        }
Esempio n. 3
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        public BigInteger Solve(BigInteger?input = null)
        {
            bool[]     primesUnderLimit = PrimeHelper.FindPrimesUnderLimit(2000000);
            BigInteger total            = 0;

            for (int i = 0; i < primesUnderLimit.Length; i++)
            {
                if (primesUnderLimit[i])
                {
                    total += i;
                }
            }

            return(total);
        }
Esempio n. 4
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        public BigInteger Solve(BigInteger?input = null)
        {
            var        primes          = PrimeHelper.FindPrimesUnderLimit(28124);
            List <int> abundantNumbers = new List <int>();

            for (int i = 2; i < 28124; i++)
            {
                if (DivisorsHelper.SumOfProperDivisors(i, primes) > i)
                {
                    abundantNumbers.Add(i);
                }
            }

            BigInteger result = 0;

            bool[] canBeSummed = new bool[28124];
            for (int i = 0; i < abundantNumbers.Count; i++)
            {
                for (int j = 0; j < abundantNumbers.Count; j++)
                {
                    if (abundantNumbers[i] + abundantNumbers[j] >= 28124)
                    {
                        break;
                    }

                    canBeSummed[abundantNumbers[i] + abundantNumbers[j]] = true;
                }
            }

            for (int i = 1; i < 28124; i++)
            {
                if (!canBeSummed[i])
                {
                    result += i;
                }
            }

            return(result);
        }
Esempio n. 5
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        public BigInteger Solve(BigInteger?input = null)
        {
            // b must be prime for the case when n = 0; -- this must make it easier,
            // b + a + 1 must be prime -- does this? IT TURNS OUT IT DOES, as long as b isn't 2 a must be odd
            // n^2 + an + b = p
            var primesUnder2Million = PrimeHelper.FindPrimesUnderLimit(2000000);
            int highestIndex = 39, bestABProduct = 41;

            // skip even version of a, hope a isn't 2
            for (int a = -999; a < 1000; a += 2)
            {
                int b = 3;
                while (b < 1000)
                {
                    // b has to be prime!
                    if (primesUnder2Million[b])
                    {
                        int i = 0;
                        // iterate to see how deep the rabbit hole goes for this combination of a and b
                        while (i * i + a * i + b > 0 && primesUnder2Million[i * i + a * i + b])
                        {
                            i++;
                        }

                        // we have a highestindex
                        if (i > highestIndex)
                        {
                            highestIndex  = i;
                            bestABProduct = a * b;
                        }
                    }

                    b++;
                }
            }

            return(bestABProduct);
        }
Esempio n. 6
0
        public BigInteger Solve(BigInteger?input = null)
        {
            BigInteger result = 0;

            bool[] primesUnderLimit = PrimeHelper.FindPrimesUnderLimit(10001);
            for (int i = 2; i < 10000; i++)
            {
                if (primesUnderLimit[i])
                {
                    continue;
                }

                BigInteger sumOfDivisors = DivisorsHelper.SumOfDivisors(i, primesUnderLimit) - i;
                if (sumOfDivisors < 10000 &&
                    sumOfDivisors != i &&
                    DivisorsHelper.SumOfDivisors((int)sumOfDivisors, primesUnderLimit) - sumOfDivisors == i)
                {
                    result += i;
                }
            }

            return(result);
        }
Esempio n. 7
0
        public BigInteger Solve(BigInteger?input = null)
        {
            int numberOfDivisors = 0;
            int i = 2, triangleNumber = 1;

            while (numberOfDivisors < 500)
            {
                numberOfDivisors = 0;
                triangleNumber  += i;

                int testNumber = triangleNumber;
                Dictionary <int, int> divisors = DivisorsHelper.CalculatePrimeDivisors(testNumber, PrimeHelper.FindPrimesUnderLimit(200000000));

                numberOfDivisors = divisors.Values.ElementAt(0) + 1;
                for (int l = 1; l < divisors.Count; l++)
                {
                    numberOfDivisors *= divisors.Values.ElementAt(l) + 1;
                }

                i++;
            }


            return(triangleNumber);
        }