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(28 48 49 50) Bernoulli Numbers
09-10-2023, 03:24 PM
Post: #10
John Keith Offline
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RE: (28 48) Bernoulli numbers
That's very neat but unfortunately it turns out to be slower than your original, smaller program for the limited range of Bernoulli numbers that can be computed this way on the HP-28/48. I imagine that it would be an improvement for systems with multiple precision floats where m can be much larger.
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Messages In This Thread
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 - 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 - John Keith - 09-10-2023, 07:45 PM



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