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smallest |cos(x)| ?
10-08-2021, 08:24 AM (This post was last modified: 10-08-2021 08:26 AM by EdS2.)
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EdS2 Offline
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RE: smallest |cos(x)| ?
What an excellent investigation!

Does this approach to tan(z) work out as suitably accurate in this case, when the divisor is so small? (Hoping the question makes sense!)
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Messages In This Thread
smallest |cos(x)| ? - Albert Chan - 10-07-2021, 12:14 PM
RE: smallest |cos(x)| ? - Werner - 10-07-2021, 03:40 PM
RE: smallest |cos(x)| ? - Albert Chan - 10-07-2021, 06:40 PM
RE: smallest |cos(x)| ? - Werner - 10-08-2021, 07:02 AM
RE: smallest |cos(x)| ? - Albert Chan - 10-08-2021, 08:17 PM
RE: smallest |cos(x)| ? - ijabbott - 10-09-2021, 01:15 PM
RE: smallest |cos(x)| ? - Albert Chan - 10-09-2021, 02:09 PM
RE: smallest |cos(x)| ? - Albert Chan - 10-09-2021, 05:01 PM
RE: smallest |cos(x)| ? - EdS2 - 10-08-2021 08:24 AM
RE: smallest |cos(x)| ? - Werner - 10-08-2021, 02:16 PM
RE: smallest |cos(x)| ? - Albert Chan - 10-08-2021, 07:54 PM
RE: smallest |cos(x)| ? - Werner - 10-11-2021, 01:16 PM
RE: smallest |cos(x)| ? - Albert Chan - 10-11-2021, 04:22 PM
RE: smallest |cos(x)| ? - Albert Chan - 10-10-2021, 01:36 PM
RE: smallest |cos(x)| ? - Albert Chan - 10-11-2021, 10:05 PM



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