Chapter 5 Problem 64

Problem

An object of mass ${\displaystyle m}$ is constrained to move in a circle of radius ${\displaystyle r}$. Its tangential acceleration as a function of time is given by ${\displaystyle a_{\text{tan}}=b+ct^{2}}$, where ${\displaystyle b}$ and ${\displaystyle c}$ are constants. If ${\displaystyle v=v_{0}}$ at ${\displaystyle t=0}$, determine the tangential and radial components of the force, ${\displaystyle F_{\text{tan}}}$ and </math>F_R</math> , acting on the object at any time </math>t>0</math>.

Solution

The tangential force is simply the mass times the tangential acceleration.

${\displaystyle a_{T}=b+ct^{2}}$ ${\displaystyle \rightarrow F_{T}=ma_{T}=m(b+ct^{2})}$

To find the radial force, we need the tangential velocity, which is the anti-derivative of the tangential acceleration. We evaluate the constant of integration so that ${\displaystyle v=v_{0}}$ at ${\displaystyle t=0}$.

${\displaystyle a_{T}=b+ct^{2}}$ ${\displaystyle \rightarrow v_{T}=c+bt+{\frac {1}{3}}ct^{3}}$ ${\displaystyle \rightarrow v(0)=c=v_{0}}$ ${\displaystyle \rightarrow v_{T}=v_{0}+bt+{\frac {1}{3}}ct^{3}}$

${\displaystyle F_{R}={\frac {mv_{T}^{2}}{r}}={\frac {m}{r}}\left(v_{0}+bt+{\frac {1}{3}}ct^{3}\right)^{2}}$