Statistical - Cubic Regression (Cubic Spline Fit) ?
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06-03-2022, 09:42 AM
Post: #21
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RE: Statistical - Cubic Regression (Cubic Spline Fit) ?
(06-01-2022 03:20 PM)Thomas Klemm Wrote: Use a cubic spline if you want a function that goes smoothly through the given data points. This is consistent with the Prime's spline command. However, some cubic spline implementations don't limit themselves to y=f(x), but instead treat x and y parametrically, finding x(t) and y(t) where t is the parametric variable. The GeoGebra help page says: Quote:The result of the spline command is a curve. Spline algorithm is used for x and y coordinates separately: first we determine values of t that correspond to the points (based on Euclidian distances between the points), then we find cubic splines as functions t->x and t->y. In GeoGebra, if the first and last points are the same, forming a loop, the algorithm also smooths out where they join. |
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06-03-2022, 03:37 PM
Post: #22
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RE: Statistical - Cubic Regression (Cubic Spline Fit) ?
One of my favourite resources for curve fitting per se is the one that's included with Graphpad Prism. Luckily, their help pages are available to non-customers too.
https://www.graphpad.com/guides/prism/la.../index.htm Their general statistics guide is great for both beginners and those looking for a refresher on the principles of statistical analysis. https://www.graphpad.com/guides/prism/la.../index.htm |
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06-06-2022, 01:03 PM
Post: #23
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RE: Statistical - Cubic Regression (Cubic Spline Fit) ?
(06-03-2022 09:42 AM)Wes Loewer Wrote: This is consistent with the Prime's spline command. However, some cubic spline implementations don't limit themselves to y=f(x), but instead treat x and y parametrically, finding x(t) and y(t) where t is the parametric variable. This is not a "limit". We can get same kind of results with CAS spline command. XCAS> T,X,Y := range(5), [0,2,3,4,5], [1,0,3,5,4] XCAS> tx := spline(T,X) :; XCAS> ty := spline(T,Y) :; To interpolate for x=1, we solve for t first. XCAS> t1 := fsolve(tx[0]=1,x=.5) → 0.451840260174 XCAS> [tx[0], ty[0]] (x=t1) → [1.0, 0.156460522575] We could also use complex numbers, combined 2 splines into 1 XCAS> txy := spline(T, X+i*Y) :; XCSS> txy[0](x=t1) → 1.0 + 0.156460522575*i Note: curve shape is *very* different than cubic-spline of X,Y XCAS> spline(X,Y)[0](x=1.) → -0.433139534884 |
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06-08-2022, 07:24 AM
Post: #24
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RE: Statistical - Cubic Regression (Cubic Spline Fit) ?
(06-06-2022 01:03 PM)Albert Chan Wrote: XCAS> T,X,Y := range(5), [0,2,3,4,5], [1,0,3,5,4] I think this is how I would have handled it as well. GeoGebra adds a twist by having T be based on the distance between the points instead of the point number. The result is a more intuitive curve when two points are close together. (06-06-2022 01:03 PM)Albert Chan Wrote: We could also use complex numbers, combined 2 splines into 1 Very interesting. I'm always fascinated by the use of complex numbers (or even quaternions) in applications that are originally intended for real numbers. |
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06-08-2022, 11:05 AM
Post: #25
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RE: Statistical - Cubic Regression (Cubic Spline Fit) ?
I took a look through my 48 book collection and found a group of programs that can be used in 48/49/50 series calculators (the book in question is Calculus on the HP-48G/GX - Grapevine Publications). The focus in the book is on calculating integrals, but the techniques/programs can be used for more general statistical curve fitting workflows too.
It's available in digital form via: https://literature.hpcalc.org/items/1500 But here's so examples from the book. |
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06-11-2022, 09:11 PM
(This post was last modified: 06-11-2022 09:11 PM by rprosperi.)
Post: #26
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RE: Statistical - Cubic Regression (Cubic Spline Fit) ?
I'm not sure if there is interest in the 71B User Library Cubic Spline interpolation program I mentioned, however it's taken weeks to find it, and since I have it now, here's a scan of the user library program description, including an overview, a little theory review, sample problem, sample program run output and BASIC program listing.
https://1drv.ms/b/s!AiI5Ei2M2Ja2mRDm0BOo...n?e=LdBPIH Note: The HP-71B MATH PAC ROM (or JFG's enhanced 2B version) must be installed for this to work. --Bob Prosperi |
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