Brachistochrone: Difference between revisions

Introduction

To find the shape of the curve which the time is shortest possible. . .

Theory

Variational Calculus and Euler--Lagrange Equation

The time from ${\displaystyle P_{a}}$ to ${\displaystyle P_{b}}$ is ${\displaystyle t=\int _{P_{a}}^{P_{b}}{\frac {1}{v}}ds}$ where ${\displaystyle ds={\sqrt {1+y'{^{2}}}}dx}$ is the Pythagorean distance measure and ${\displaystyle v}$ is determined from the the law of conservation of energy ${\displaystyle {\frac {1}{2}}mv^{2}=mgy}$. giving ${\displaystyle v={\sqrt {2gy}}}$. Plugging these in, we get ${\displaystyle t=\int _{P_{a}}^{P_{b}}{\sqrt {\frac {1+y'^{2}}{2gy}}}dx=\int _{P_{a}}^{P_{b}}fdx}$, where ${\displaystyle f=f(y,y')}$ is the function subject to variational consideration.

According to the Euler--Lagrange differential equation the stationary value is to be found, if E-L equation ${\displaystyle {\frac {\partial f}{\partial y}}-{\frac {d}{dx}}{\frac {\partial f}{\partial y'}}=0}$ is satisfied.

No Friction

We get

${\displaystyle {\frac {\partial f}{\partial y'}}={\frac {\partial }{\partial y'}}{\sqrt {\frac {1+y'^{2}}{2gy}}}={\frac {1}{\sqrt {2gy}}}{\frac {\partial }{\partial y'}}{\sqrt {1+y'^{2}}}={\frac {2y'}{\sqrt {2gy}}}{\frac {1}{2{\sqrt {1+y'^{2}}}}}}$.

Since ${\displaystyle f}$ does not depend on ${\displaystyle x}$, we may use the simplified E--L formula ${\displaystyle f-y'{\frac {\partial f}{\partial y'}}={\text{Constant}}}$.

Thus, we have

${\displaystyle f-y'{\frac {\partial f}{\partial y'}}={\sqrt {\frac {1+y'{^{2}}}{2gy}}}-{\frac {y'{^{2}}}{{\sqrt {2gy}}{\sqrt {1+y'^{2}}}}}=C}$ So we have ${\displaystyle {\frac {1+y'{^{2}}}{\sqrt {2gy(1+y'{^{2}})}}}-{\frac {y'{^{2}}}{{\sqrt {2gy}}{\sqrt {1+y'^{2}}}}}={\frac {1}{\sqrt {2gy(1+y'{^{2}})}}}=C}$ and multiplying this with the denominator and rearring, we have ${\displaystyle y\left(1+y'^{2}\right)={\frac {1}{2gC^{2}}}=k^{2}}$

by redefining the constant. The standard solution to this equation is given by

${\displaystyle {\begin{aligned}x&={\frac {1}{2}}k^{2}(\theta -\sin \theta )\\y&={\frac {1}{2}}k^{2}(1-\cos \theta )\end{aligned}}}$

and is the equation of a cycloid.

Rolling Ball: Angular momentum

The rotational energy is ${\displaystyle E_{\text{rot}}={\frac {1}{2}}I\omega ^{2}}$ and by applying non-slipping condition ${\displaystyle v=\omega r}$ we get ${\displaystyle E_{\text{rot}}={\frac {v^{2}}{2r^{2}}}I}$. The conservation energy states

${\displaystyle {\begin{aligned}E_{\text{kin}}&=E_{\text{rot}}\\{\frac {1}{2}}mv^{2}+{\frac {v^{2}}{2r^{2}}}I&=mgy\\v^{2}&={\frac {mgy}{m+I/(2r^{2})}}\\&={\frac {2mgr^{2}}{2m+I}}\end{aligned}}}$

Thus, the path shape is same, than previous.

Friction

The friction depends on the normal force of the path. The normal force is

${\displaystyle N=-{\frac {dy}{dx}}{\vec {x}}+{\frac {dx}{dy}}{\vec {y}}}$

Rolling Ball with radius

References

https://mathworld.wolfram.com/BrachistochroneProblem.html

https://physicscourses.colorado.edu/phys3210/phys3210_sp20/lecture/lec04-lagrangian-mechanics/

http://hades.mech.northwestern.edu/images/e/e6/Legeza-MechofSolids2010.pdf

https://www.tau.ac.il/~flaxer/edu/course/computerappl/exercise/Brachistochrone%20Curve.pdf