Woooooo! looks like i found one of the blocks last night!
shares: 565 invalid: 3 pool_shares: 126977 pool_balance:
66.3436 pool_mature: 66.3436 pool_spm: 567.183 earned(est): 0.295204 mature earned(est): 0.295204 fee: 0% address: PdTUgK6JsKkVnM4rZYUsRbSCJaiELG3QMA hpm: 133.773
20131115T080742.658114
0000acd50b739de967cd5b3f12c863692f866c6d0653708a4d610a40602a5468 shares: 566 invalid: 3 pool_shares: 127606 pool_balance:
99.5148 pool_mature: 99.5148 pool_spm: 518.987 earned(est): 0.441401 mature earned(est): 0.441401 fee: 0% address: PdTUgK6JsKkVnM4rZYUsRbSCJaiELG3QMA hpm: 133.791
You are all very welcome.
Edit: can someone explain the difficulty for PTS to me. So we are looking for hashes that currently have four leading zeros, correct? So is there also a fractional part of the difficulty? how is that calculated, for example, later the same night i found another hash, with four leading zeros and it was
not a block solution. Bytemaster, maybe you can help me understand this better?
shares: 802 invalid: 5 pool_shares: 235593 pool_balance:
364.884 pool_mature: 364.884 pool_spm: 836.202 earned(est): 1.24213 mature earned(est): 1.24213 fee: 0% address: PdTUgK6JsKkVnM4rZYUsRbSCJaiELG3QMA hpm: 135.808
20131115T103454.569109
0000ac25ca2f637f30ea35755c71b97ad4fabeb02ac67251e0e2bf218fb77dd4 shares: 803 invalid: 5 pool_shares: 236822 pool_balance:
364.884 pool_mature: 364.884 pool_spm: 884.528 earned(est): 1.23723 mature earned(est): 1.23723 fee: 0% address: PdTUgK6JsKkVnM4rZYUsRbSCJaiELG3QMA hpm: 135.845