Radial and Tangential Acceleration

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Faiq
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Homework Statement



2 A particle P of mass mkg moves on an arc of a circle with centre O and radius a metres. At time t = 0
the particle is at the point A. At time t seconds, angle POA = sin^2 2t.
Find
(i) the value of t when the transverse component of the acceleration of P is first equal to zero

The answer is [tex]\frac{d^2\theta}{dt^2} = 0[/tex]
Isn't d^2theta/dt^2 equal to radial acceleration. Since angular velocity is rate of change of theta, thus rate of change of change of theta should be angular acceleration aka radial acceleration?
Then why are the equating it as transverse component?
 
on Phys.org
FactChecker said:
If P goes around in a circle, the velocity vector is always at right angles to the radius through P. So the radial and transverse acceleration are equal.

In the next part, we are supposed to calculate radial force and transverse force and the answer is 3ma and 4ma respectively. If they are both equal then the force due to their acceleration should be same as well
 
Chestermiller said:
The radial acceleration is ##v^2/a##, where v is the instantaneous tangential velocity. When they are talking about transverse acceleration, it think they mean tangential acceleration.
I went through a post on a different website which acquired the following relation. Is it correct?
[tex]\frac{d}{dt}v=r\frac{d}{dt}\omega[/tex]
[tex]a_t=ra_r[/tex]
 
Why? I don't see anything wrong with the equation?
 
Is there a difference between radial, angular and centripetal acceleration for a circular motion? In our class, we used them interchangeably
 
Faiq said:
Is there a difference between them? In our class, we used them interchangeably
Let me understand this correctly: In your class, they think that radial acceleration is the same thing as angular acceleration? Actually, they are entirely different quantities. The correct equation for radial acceleration is ##a_r=\omega ^2r## and angular acceleration is ##\alpha=\frac{d\omega}{dt}##. They don't even have the same units.
 
So
radial acceleration = centripetal acceleration
but
angular acceleration = tangential acceleration / radius.