Curvature - Printable Version +- HP Forums (https://www.hpmuseum.org/forum) +-- Forum: HP Calculators (and very old HP Computers) (/forum-3.html) +--- Forum: HP Prime (/forum-5.html) +--- Thread: Curvature (/thread-18938.html) |
Curvature - Eddie W. Shore - 10-06-2022 02:30 PM Gratitude to Arno K. and rombio for helping me with derivatives and CAS programs. The following CAS functions calculates the curvature of: functions, y(x) polar functions, r(t) (t: Θ) parametric functions, x(t), y(t) Let Δα be the angle of rotation angle and Δs is the slight change of distance. Then the radius of curvature is: K = abs(Δα ÷ Δs) as Δs → 0 And the radius of curvature is the reciprocal of K. For circles, the radius of curvature is constant. Wankel engines and rotary engines have their pistons traveling in a circle. Calculating the curvature depends on the form of the function. Function: y(x) K = abs( y''(x) ) ÷ (1 + (y'(x))^2) ^(3/2) Polar: r(t) (t replaces Θ) K = abs( r(t)^2 + 2 * (r'(t))^2 - r(t) * r''(t) ) ÷ ( r(t)^2 + r'(t)^2 )^(3/2) Parametric: x(t), y(t) K = abs( x'(t) * y''(t) - y'(t) * x''(t) ) ÷ ( x'(t)^2 + y'(t)^2 )^(3/2) Radius of Curvature: r = 1 ÷ K HP Prime CAS Program: crvfunc Code: #cas HP Prime CAS Program: crvpol Code: #cas HP Prime CAS Program: crvpar Code: #cas Source: Svirin, Alex Ph.D. "Curvature and Radius of Curvature" Math24 https://math24.net/curvature-radius.html 2022. Last Updated September 12, 2022. RE: Curvature - Arno K - 10-07-2022 01:41 PM Nice to see we could help you. Arno |