./drivers.py

Getting the current data

Starting examinations

Weird! Seq 729894 apparently is bad data on the website.

Weird! Seq 455004 apparently is bad data on the website.

240810 with guide 2^3 * 3^2 * 5 (class 2) may mutate: Assuming that C122 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

976218 with guide 2^3 * 3^4 * 5 (class 2) may mutate: Assuming that C123 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

971496 with guide 2^3 * 3^2 * 5 (class 2) may mutate: Assuming that C124 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

50892 with guide 2^2 * 7^2 (class 2) may mutate: Assuming that C125 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

360876 with guide 2^2 * 7^2 (class 2) may mutate: Assuming that C126 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

845844 with guide 2^3 * 3^4 * 5 (class 2) may mutate: Assuming that C126 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

48510 with guide 2^3 * 3^2 * 5 (class 2) may mutate: Assuming that C126 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

223398 with guide 2^2 * 7^2 (class 2) may mutate: Assuming that C126 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

104286 with guide 2^3 * 3^2 * 5 (class 2) may mutate: Assuming that C127 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

943182 with guide 2^3 * 3^2 * 5 (class 2) may mutate: Assuming that C127 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

838320 with guide 2^3 * 3^2 * 5 (class 2) may mutate: Assuming that C127 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

752970 with guide 2^3 * 3^2 * 5 (class 2) may mutate: Assuming that C133 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

999558 with guide 2^2 * 7^2 (class 2) may mutate: Assuming that C137 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

880512 with guide 2^3 * 3^2 * 5 (class 2) may mutate: Assuming that C144 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

78474 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C109 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

835264 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C115 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

541458 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C117 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

589380 with guide 2^3 * 3^4 (class 3) may mutate: Assuming that C117 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

224760 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C119 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

196848 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C119 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

199152 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C120 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

329310 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C120 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

151032 with guide 2^5 * 3 * 7^2 (class 3) may mutate: Assuming that C120 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

151032 with guide 2^5 * 3 * 7^2 (class 3) may mutate: Assuming that C120 is made of 3 primes, then since it's 1 (mod 4), it's possible that tau(n)=3=1+1+1 via the following conditions: p1%4==1, p2%4==1, p3%4==1

662016 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C120 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

504756 with guide 2^3 * 3^2 * 5^2 (class 3) may mutate: Assuming that C120 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

293040 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C120 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

31446 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C120 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

31446 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C120 is made of 3 primes, then since it's 1 (mod 4), it's possible that tau(n)=3=1+1+1 via the following conditions: p1%4==1, p2%4==1, p3%4==1

298464 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C121 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

756840 with guide 2^3 * 3^2 * 5^2 (class 3) may mutate: Assuming that C121 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

383320 with guide 2^3 * 3^2 * 5^2 (class 3) may mutate: Assuming that C121 is made of 2 primes, then since it's 3 (mod 8), it's possible that tau(n)=3=1+2 via the following conditions: p1%8==1, p2%8==3

175968 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C121 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

175968 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C121 is made of 3 primes, then since it's 1 (mod 4), it's possible that tau(n)=3=1+1+1 via the following conditions: p1%4==1, p2%4==1, p3%4==1

310440 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C121 is made of 2 primes, then since it's 7 (mod 8), it's possible that tau(n)=3=1+2 via the following conditions: p1%8==3, p2%8==5

595680 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C121 is made of 2 primes, then since it's 3 (mod 8), it's possible that tau(n)=3=1+2 via the following conditions: p1%8==1, p2%8==3

511182 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C122 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

790308 with guide 2^5 * 3 * 7^2 (class 3) may mutate: Assuming that C122 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

661998 with guide 2^3 * 3^2 * 5^2 (class 3) may mutate: Assuming that C122 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

661998 with guide 2^3 * 3^2 * 5^2 (class 3) may mutate: Assuming that C122 is made of 3 primes, then since it's 1 (mod 4), it's possible that tau(n)=3=1+1+1 via the following conditions: p1%4==1, p2%4==1, p3%4==1

72408 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C122 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

72408 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C122 is made of 3 primes, then since it's 1 (mod 4), it's possible that tau(n)=3=1+1+1 via the following conditions: p1%4==1, p2%4==1, p3%4==1

665064 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C122 is made of 2 primes, then since it's 3 (mod 8), it's possible that tau(n)=3=1+2 via the following conditions: p1%8==1, p2%8==3

977592 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C122 is made of 2 primes, then since it's 3 (mod 8), it's possible that tau(n)=3=1+2 via the following conditions: p1%8==1, p2%8==3

584496 with guide 2^3 * 3^4 (class 3) may mutate: Assuming that C122 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

584496 with guide 2^3 * 3^4 (class 3) may mutate: Assuming that C122 is made of 3 primes, then since it's 1 (mod 4), it's possible that tau(n)=3=1+1+1 via the following conditions: p1%4==1, p2%4==1, p3%4==1

45570 with guide 2^3 * 3^4 (class 3) may mutate: Assuming that C122 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

45570 with guide 2^3 * 3^4 (class 3) may mutate: Assuming that C122 is made of 3 primes, then since it's 1 (mod 4), it's possible that tau(n)=3=1+1+1 via the following conditions: p1%4==1, p2%4==1, p3%4==1

81192 with guide 2^5 * 3 * 7^2 (class 3) may mutate: Assuming that C122 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

81192 with guide 2^5 * 3 * 7^2 (class 3) may mutate: Assuming that C122 is made of 3 primes, then since it's 1 (mod 4), it's possible that tau(n)=3=1+1+1 via the following conditions: p1%4==1, p2%4==1, p3%4==1

531024 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C123 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

214120 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C123 is made of 2 primes, then since it's 7 (mod 8), it's possible that tau(n)=3=1+2 via the following conditions: p1%8==3, p2%8==5

141720 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C123 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

141720 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C123 is made of 3 primes, then since it's 1 (mod 4), it's possible that tau(n)=3=1+1+1 via the following conditions: p1%4==1, p2%4==1, p3%4==1

576150 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C123 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

576150 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C123 is made of 3 primes, then since it's 1 (mod 4), it's possible that tau(n)=3=1+1+1 via the following conditions: p1%4==1, p2%4==1, p3%4==1

172554 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C124 is made of 2 primes, then since it's 3 (mod 8), it's possible that tau(n)=3=1+2 via the following conditions: p1%8==1, p2%8==3

125034 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C124 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

290160 with guide 2^3 * 3^2 * 5^2 (class 3) may mutate: Assuming that C124 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

290160 with guide 2^3 * 3^2 * 5^2 (class 3) may mutate: Assuming that C124 is made of 3 primes, then since it's 1 (mod 4), it's possible that tau(n)=3=1+1+1 via the following conditions: p1%4==1, p2%4==1, p3%4==1

504810 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C124 is made of 2 primes, then since it's 3 (mod 8), it's possible that tau(n)=3=1+2 via the following conditions: p1%8==1, p2%8==3

129696 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C124 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

775230 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C125 is made of 2 primes, then since it's 3 (mod 8), it's possible that tau(n)=3=1+2 via the following conditions: p1%8==1, p2%8==3

897204 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C125 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

671560 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C125 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

200022 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C126 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

229516 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C127 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

229516 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C127 is made of 3 primes, then since it's 1 (mod 4), it's possible that tau(n)=3=1+1+1 via the following conditions: p1%4==1, p2%4==1, p3%4==1

821232 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C127 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

821232 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C127 is made of 3 primes, then since it's 1 (mod 4), it's possible that tau(n)=3=1+1+1 via the following conditions: p1%4==1, p2%4==1, p3%4==1

788910 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C128 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

69828 with guide 2^3 * 3^4 (class 3) may mutate: Assuming that C128 is made of 2 primes, then since it's 7 (mod 8), it's possible that tau(n)=3=1+2 via the following conditions: p1%8==3, p2%8==5

258450 with guide 2^3 * 3^2 * 5^2 (class 3) may mutate: Assuming that C128 is made of 2 primes, then since it's 3 (mod 8), it's possible that tau(n)=3=1+2 via the following conditions: p1%8==1, p2%8==3

111624 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C128 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

265776 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C132 is made of 2 primes, then since it's 7 (mod 8), it's possible that tau(n)=3=1+2 via the following conditions: p1%8==3, p2%8==5

293826 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C134 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

293826 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C134 is made of 3 primes, then since it's 1 (mod 4), it's possible that tau(n)=3=1+1+1 via the following conditions: p1%4==1, p2%4==1, p3%4==1

146964 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C135 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

48780 with guide 2^3 * 3^2 * 5^2 (class 3) may mutate: Assuming that C140 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

48780 with guide 2^3 * 3^2 * 5^2 (class 3) may mutate: Assuming that C140 is made of 3 primes, then since it's 1 (mod 4), it's possible that tau(n)=3=1+1+1 via the following conditions: p1%4==1, p2%4==1, p3%4==1

966180 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C144 is made of 2 primes, then since it's 1 (mod 4), it's possible that tau(n)=2=1+1 via the following conditions: p1%4==1, p2%4==1

966180 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C144 is made of 3 primes, then since it's 1 (mod 4), it's possible that tau(n)=3=1+1+1 via the following conditions: p1%4==1, p2%4==1, p3%4==1

755250 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C148 is made of 2 primes, then since it's 3 (mod 8), it's possible that tau(n)=3=1+2 via the following conditions: p1%8==1, p2%8==3

1464 with guide 2^3 * 3^2 (class 3) may mutate: Assuming that C167 is made of 2 primes, then since it's 3 (mod 8), it's possible that tau(n)=3=1+2 via the following conditions: p1%8==1, p2%8==3