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(28 48 49 50) Bernoulli Numbers
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09-08-2023, 08:09 PM
Post: #7
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RE: (28 48) Bernoulli numbers
Update: The programs in the first post have been replaced by new ones that are faster as well as HP-28 and HP-48S compatible. The thread title has been changed to reflect these changes. The program in post 6 above is still preferable in most cases as it returns the Bernoulli number <= B(28) as a fraction with separate numerator and denominator.
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| Messages In This Thread |
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(28 48 49 50) Bernoulli Numbers - John Keith - 09-05-2023, 05:27 PM
RE: (48G) Bernoulli numbers - Gerald H - 09-06-2023, 08:48 AM
RE: (48G) Bernoulli numbers - John Keith - 09-06-2023, 11:04 AM
RE: (48G) Bernoulli numbers - Gerald H - 09-06-2023, 02:34 PM
RE: (48G) Bernoulli numbers - Albert Chan - 09-07-2023, 03:37 PM
RE: (48G) Bernoulli numbers - John Keith - 09-07-2023, 04:18 PM
RE: (28 48) Bernoulli numbers - Albert Chan - 09-09-2023, 06:33 PM
RE: (28 48) Bernoulli numbers - Albert Chan - 09-09-2023, 07:34 PM
RE: (28 48) Bernoulli numbers - John Keith - 09-08-2023 08:09 PM
RE: (28 48) Bernoulli numbers - John Keith - 09-10-2023, 03:24 PM
RE: (28 48) Bernoulli numbers - Albert Chan - 09-10-2023, 07:39 PM
RE: (28 48) Bernoulli numbers - John Keith - 09-10-2023, 07:45 PM
RE: (28 48 49 50) Bernoulli Numbers - Gerald H - 09-17-2023, 02:32 PM
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