Calculators and numerical differentiation

11042020, 04:14 PM
Post: #11




RE: Calculators and numerical differentiation
(11032020 10:14 PM)Albert Chan Wrote: Slightly off topics, for f(x) = x*g(x), getting f'(0) is easier taking limit directly. If you pull out an \(x\), then \( x \cdot (x^2+x)^{1/3}\) becomes \( x^{4/3} \cdot (x+1)^{1/3}\) which the nonCAS Npsire handles correctly. 

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Messages In This Thread 
Calculators and numerical differentiation  robve  10302020, 09:57 PM
RE: Calculators and numerical differentiation  Paul Dale  10302020, 11:41 PM
RE: Calculators and numerical differentiation  Albert Chan  10312020, 01:20 AM
RE: Calculators and numerical differentiation  Wes Loewer  11012020, 05:39 AM
RE: Calculators and numerical differentiation  Albert Chan  11012020, 05:39 PM
RE: Calculators and numerical differentiation  Albert Chan  11012020, 11:43 PM
RE: Calculators and numerical differentiation  Wes Loewer  11032020, 06:09 PM
RE: Calculators and numerical differentiation  Albert Chan  11032020, 10:14 PM
RE: Calculators and numerical differentiation  Wes Loewer  11042020 04:14 PM
RE: Calculators and numerical differentiation  CMarangon  11032020, 06:55 PM
RE: Calculators and numerical differentiation  Wes Loewer  11042020, 04:04 PM

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