Block #160,323

2CCLength 11★★★☆☆

Cunningham Chain of the Second Kind · Discovered 9/11/2013, 8:17:42 PM · Difficulty 9.8615 · 6,630,671 confirmations

2CC

Cunningham Chain of the Second Kind

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

Block Header

Block Hash

97426a5abac4279f825e057da6a6b4e9f752dce70e5b433227848f891f3afe1f

View on Chainz ↗

Height

#160,323

Difficulty

9.861508

Transactions

Size

881 B

Version

Bits

09dc8bcd

Nonce

378,546

Timestamp

9/11/2013, 8:17:42 PM

Confirmations

6,630,671

Merkle Root

800dcb3e4a6e246664e840af8b5055bbd9eb472499d146e1cba4eed7128f16ee

Transactions (3)

Coinbaseac630af1e9b260…698575196a7d2c

1 in → 1 out10.2900 XPM109 B

AX99MLNm…vtidqEwE

aab22cff70ab53…4c8a8bd1ed2d29

3 in → 2 out400.0185 XPM524 B

AXjDzfzQ…Cj4gfHtC ATv1GqYg…qPzuV95p

adcc64cd53f411…a1737971f77449

1 in → 1 out10.2400 XPM158 B

ASBP4Bg7…s5H8sBpA

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.

6.702 × 10⁹³(94-digit number)

67021116480618374358…36907148325329838201

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

6.702 × 10⁹³(94-digit number)

67021116480618374358…36907148325329838201

Verify on FactorDB ↗Wolfram Alpha ↗

×2−1 →

2^1 × origin + 1

1.340 × 10⁹⁴(95-digit number)

13404223296123674871…73814296650659676401

Verify on FactorDB ↗Wolfram Alpha ↗

×2−1 →

2^2 × origin + 1

2.680 × 10⁹⁴(95-digit number)

26808446592247349743…47628593301319352801

Verify on FactorDB ↗Wolfram Alpha ↗

×2−1 →

2^3 × origin + 1

5.361 × 10⁹⁴(95-digit number)

53616893184494699486…95257186602638705601

Verify on FactorDB ↗Wolfram Alpha ↗

×2−1 →

2^4 × origin + 1

1.072 × 10⁹⁵(96-digit number)

10723378636898939897…90514373205277411201

Verify on FactorDB ↗Wolfram Alpha ↗

×2−1 →

2^5 × origin + 1

2.144 × 10⁹⁵(96-digit number)

21446757273797879794…81028746410554822401

Verify on FactorDB ↗Wolfram Alpha ↗

×2−1 →

2^6 × origin + 1

4.289 × 10⁹⁵(96-digit number)

42893514547595759589…62057492821109644801

Verify on FactorDB ↗Wolfram Alpha ↗

×2−1 →

2^7 × origin + 1

8.578 × 10⁹⁵(96-digit number)

85787029095191519178…24114985642219289601

Verify on FactorDB ↗Wolfram Alpha ↗

×2−1 →

2^8 × origin + 1

1.715 × 10⁹⁶(97-digit number)

17157405819038303835…48229971284438579201

Verify on FactorDB ↗Wolfram Alpha ↗

×2−1 →

2^9 × origin + 1

3.431 × 10⁹⁶(97-digit number)

34314811638076607671…96459942568877158401

Verify on FactorDB ↗Wolfram Alpha ↗

×2−1 →

2^10 × origin + 1

6.862 × 10⁹⁶(97-digit number)

68629623276153215342…92919885137754316801

Verify on FactorDB ↗Wolfram Alpha ↗

What this block proved

The miner who found this block proved the existence of 11 consecutive prime numbers forming a Cunningham Chain of the Second 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

RareChain length 11

Approximately 1 in 1,000 blocks. Noteworthy discoveries.

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 2CC formula:

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

Cross-reference on Chainz Explorer