Max of (sin(x))^(e^x)
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02-26-2018, 03:40 AM
Post: #9
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RE: Max of (sin(x))^(e^x)
Just messing around..
In my early early college days when slide rules were king, and the HP 35 emerged, it seemed miraculous. The guide book to the 35 remarked that this instrument was something like a Dick Tracy or Walter Mitty might be expected to carry. My peers and I wondered if symbolic math, graphing capabilities would ever be possible on a hand held device. It still astounds me...just amazing and wonderful. Still have my best slide rules... |
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Messages In This Thread |
Max of (sin(x))^(e^x) - lrdheat - 02-24-2018, 04:28 PM
RE: Max of (sin(x))^(e^x) - lrdheat - 02-24-2018, 04:48 PM
RE: Max of (sin(x))^(e^x) - lrdheat - 02-24-2018, 04:55 PM
RE: Max of (sin(x))^(e^x) - lrdheat - 02-24-2018, 06:08 PM
RE: Max of (sin(x))^(e^x) - parisse - 02-25-2018, 01:40 PM
RE: Max of (sin(x))^(e^x) - lrdheat - 02-25-2018, 05:00 PM
RE: Max of (sin(x))^(e^x) - lrdheat - 02-25-2018, 06:19 PM
RE: Max of (sin(x))^(e^x) - parisse - 02-25-2018, 08:38 PM
RE: Max of (sin(x))^(e^x) - lrdheat - 02-26-2018 03:40 AM
RE: Max of (sin(x))^(e^x) - Wes Loewer - 03-04-2018, 05:08 AM
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