Block #468,794

1CCLength 10★★☆☆☆

Cunningham Chain of the First Kind · Discovered 3/31/2014, 6:09:55 PM · Difficulty 10.4329 · 6,357,459 confirmations

1CC

Cunningham Chain of the First Kind

A sequence where each prime is double the previous prime plus one.

Block Header

Block Hash

c25b121eafcaad09f899b0398ef438234a4a94373d54a6cb500a4abf28b957ed

View on Chainz ↗

Height

#468,794

Difficulty

10.432926

Transactions

Size

428 B

Version

Bits

0a6ed443

Nonce

101,823

Timestamp

3/31/2014, 6:09:55 PM

Confirmations

6,357,459

Mined by

⛏️ P2SHAeKNrjNjtSncLJjUrDnQbrfzMS1NEq95Ta

Merkle Root

30fb4da4b752e316aaceb2dfe8d303ab20ad5bfc18f856dcc7fc63baeac42bc4

Transactions (2)

Coinbased3b7e528e2a8f6…19ca78589cda44

1 in → 1 out9.1800 XPM110 B

AeKNrjNj…1NEq95Ta

696f8c5d8a4e00…b4ebfccbc7eb9c

1 in → 2 out1.5941 XPM227 B

AVte8V9C…WBoEgANU AdiS6zRd…3b4nx1jq

Prime Chain Origin

This is the prime chain origin stored in the block header. It is a composite number (not prime itself) — it equals the first prime in the chain multiplied by a primorial. The origin anchors the entire chain to this specific block.

9.234 × 10⁹⁶(97-digit number)

92345403964511677694…60097266382373846399

Discovered Prime Numbers

p_k = 2^k × origin − 1

These are the actual prime numbers discovered by this block, computed using the verified Primecoin formula. Each number has been independently confirmed to pass the Fermat primality test. Use the FactorDB links to verify any number independently.

origin − 1

9.234 × 10⁹⁶(97-digit number)

92345403964511677694…60097266382373846399

Verify on FactorDB ↗Wolfram Alpha ↗

×2+1 →

2^1 × origin − 1

1.846 × 10⁹⁷(98-digit number)

18469080792902335538…20194532764747692799

Verify on FactorDB ↗Wolfram Alpha ↗

×2+1 →

2^2 × origin − 1

3.693 × 10⁹⁷(98-digit number)

36938161585804671077…40389065529495385599

Verify on FactorDB ↗Wolfram Alpha ↗

×2+1 →

2^3 × origin − 1

7.387 × 10⁹⁷(98-digit number)

73876323171609342155…80778131058990771199

Verify on FactorDB ↗Wolfram Alpha ↗

×2+1 →

2^4 × origin − 1

1.477 × 10⁹⁸(99-digit number)

14775264634321868431…61556262117981542399

Verify on FactorDB ↗Wolfram Alpha ↗

×2+1 →

2^5 × origin − 1

2.955 × 10⁹⁸(99-digit number)

29550529268643736862…23112524235963084799

Verify on FactorDB ↗Wolfram Alpha ↗

×2+1 →

2^6 × origin − 1

5.910 × 10⁹⁸(99-digit number)

59101058537287473724…46225048471926169599

Verify on FactorDB ↗Wolfram Alpha ↗

×2+1 →

2^7 × origin − 1

1.182 × 10⁹⁹(100-digit number)

11820211707457494744…92450096943852339199

Verify on FactorDB ↗Wolfram Alpha ↗

×2+1 →

2^8 × origin − 1

2.364 × 10⁹⁹(100-digit number)

23640423414914989489…84900193887704678399

Verify on FactorDB ↗Wolfram Alpha ↗

×2+1 →

2^9 × origin − 1

4.728 × 10⁹⁹(100-digit number)

47280846829829978979…69800387775409356799

Verify on FactorDB ↗Wolfram Alpha ↗

What this block proved

The miner who found this block proved the existence of 10 consecutive prime numbers forming a Cunningham Chain of the First Kind. The prime chain origin — the large number shown above — anchors the chain and is divisible by a primorial (the product of small primes), cryptographically tying these prime numbers to this specific block.

★★☆☆☆

Rarity

UncommonChain length 10

Roughly 1 in 100 blocks. Solid but expected in a healthy network.

How Primecoin's Proof-of-Work Constructs These Primes

Primecoin stores a value called the prime chain origin in each block. The miner found a large integer such that when divided by a primorial (the product of small primes: 2 × 3 × 5 × 7 × …), the result is the first prime in the chain. The origin is deliberately divisible by this primorial — that divisibility is part of the proof.

Prime Chain Origin = First Prime × Primorial (2·3·5·7·11·…)

Source: Primecoin prime.cpp — CheckPrimeProofOfWork()

This is why the origin has many small prime factors — those factors are the primorial divisor. The chain then extends from the first prime using the 1CC formula:

1CC: p₁ (first prime), p₂ = 2p₁ + 1, p₃ = 2p₂ + 1, …

Cross-reference on Chainz Explorer

Block #468,794

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