def sumOfConsectutivePrimes(limit=1000000):
p.genPrimesESieve(1000000, True)
i, j = 1, 2
runningSum, maxPrime = p.primes[i], 0
result, longest = runningSum, 1
for i in xrange(1, len(p.primes)):
j = i+1
count = 1
runningSum = p.primes[i]
if runningSum >= 40:
break
curLongest, curMaxPrime = 2, 0
while runningSum+p.primes[j] < limit:
count +=1
runningSum += p.primes[j]
if p.isPrime(runningSum):
curLongest = count
curMaxPrime = runningSum
j += 1
if curLongest >= longest:
result = curMaxPrime
longest = curLongest
print longest, result
return longest, result
def largestPandigitalPrime():
p.genPrimesESieve(7654321, True)
index = len(p.primes)
while index >= 1:
prime = p.primes[index]
if isPandigital(prime):
return prime
index -= 1
return None
def sumOfTruncatablePrimes(n=11):
S = []
p.genPrimesESieve(1000000, True)
for nth in xrange(5, len(p.primes)+1):
prime = p.primes[nth]
# via wiki, 83 right-truncatable primes vs 4260 left-truncatable
# Test left to right prime building first
if truncatablePrime(prime, True) and truncatablePrime(prime, False):
S.append(prime)
n -= 1
if n == 0:
break
return sum(S)
def firstOfFourConsecutive():
p.genPrimesESieve(1000000, True)
consecutivePrimes, firstPrime = 0, 2
n = 2*3*5*7-1
while consecutivePrimes < 4:
n += 1
nPrimes = nOfPrimeFactors(n)#len(DistinctPrimes(n))
if nPrimes == 4:
consecutivePrimes += 1
if consecutivePrimes == 1:
firstPrime = n
else:
consecutivePrimes = 0
return firstPrime
def golbachProvedWrong():
p.genPrimesESieve(10000, True)
for n in xrange(3, p.primes[len(p.primes)], 2):
if n in p.primes.values():
continue
contradicted = True
root = 0
nthPrime = 1
while n >= p.primes[nthPrime]:
if isTwiceSquare(n-p.primes[nthPrime]):
contradicted = False
break
nthPrime +=1
if contradicted:
return n
return 'Something is wrong here...'
def threePrimePermutations():
p.genPrimesESieve(10000, True)
i = 1
nPrimes = len(p.primes)
while i < nPrimes:
prime = p.primes[i]
if prime > 1000 and prime != 1487:
sortedPrime = sorted(str(prime))
j = i+1
while j < nPrimes:
secondPrime = p.primes[j]
if sorted(str(secondPrime)) == sortedPrime:
diff = secondPrime - prime
testValue = secondPrime + diff
if sorted(str(testValue)) == sortedPrime and testValue in p.primes.values():
return str(prime) + str(secondPrime) + str(testValue)
j += 1
i += 1
return None
def coefficientProducts(a=1000, b=1000):
aMax, bMax, nMax = (0, 0, 0);
for a in xrange(-1000, 1001):
for b in xrange(-1000, 1001):
n = 0
while p.isPrime(abs(n*n + a*n + b)):
n += 1
if (n > nMax):
aMax = a
bMax = b
nMax = n
return aMax*bMax
def coefficientProducts2():
aMax, bMax, nMax = (0, 0, 0)
for a in xrange(-999, 1001, 2):
key = 1
while p.primes[key] <= 1000:
for sign in (1, -1):
n = 0;
offset = -1 if p.primes[key]%2 == 0 else 0 # Making a even if b is even
while p.isPrime(abs(n*n + (a+offset)*n + sign*p.primes[key])):
n += 1
if (n > nMax):
aMax = a;
bMax = p.primes[key];
nMax = n;
key += 1
return aMax*bMax, nMax
def truncatablePrime(n, leftToRight=True):
'''Returns if all numbers of length ≤ 1 are also prime.
leftToRight flag determines in which direction the new number
is built up from.
'''
n = str(n)
if not leftToRight:
n = n[::-1]
newNumber = ''
for i in xrange(len(n)-1):
if leftToRight:
newNumber += n[i]
else:
newNumber = n[i] + newNumber
if not p.isPrime(int(newNumber)):
return False
return True
def main():
p.genPrimesESieve(87400)
print 'Product of the coefficients for which produces the ' +\
'longest sequence of primes.'
print coefficientProducts2()
