Max of (sin(x))^(e^x)

02242018, 04:48 PM
Post: #2




RE: Max of (sin(x))^(e^x)
The solution for d/dx may not be suitable...it should be closer to max of f(x) when solving for it to equal .001, yet it is further away! In fact, when plotting d/dx of the function, I get 2 diverging curves near the max of f(x). This on a tight plot from x=14.1324 to 14.142 .


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Messages In This Thread 
Max of (sin(x))^(e^x)  lrdheat  02242018, 04:28 PM
RE: Max of (sin(x))^(e^x)  lrdheat  02242018 04:48 PM
RE: Max of (sin(x))^(e^x)  lrdheat  02242018, 04:55 PM
RE: Max of (sin(x))^(e^x)  lrdheat  02242018, 06:08 PM
RE: Max of (sin(x))^(e^x)  parisse  02252018, 01:40 PM
RE: Max of (sin(x))^(e^x)  lrdheat  02252018, 05:00 PM
RE: Max of (sin(x))^(e^x)  lrdheat  02252018, 06:19 PM
RE: Max of (sin(x))^(e^x)  parisse  02252018, 08:38 PM
RE: Max of (sin(x))^(e^x)  lrdheat  02262018, 03:40 AM
RE: Max of (sin(x))^(e^x)  Wes Loewer  03042018, 05:08 AM

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