Question

A model airplane with a mass of 0.741kg is tethered by a wire so that it flies in a circle 30.9 m in radius. The airplane engine provides anet thrust of 0.795 N perpendicular tothe tethering wire.

(a) Find the torque the net thrust producesabout the center of the circle.
N·m

(b) Find the angular acceleration of the airplane when it is inlevel flight.
rad/s2

(c) Find the linear acceleration of the airplane tangent to itsflight path.
m/s2

Answer 1

(a) 24.6 Nm

The torque produced by the net thrust about the center of the circle is given by:

`\tau = F r`

where

F is the magnitude of the thrust

r is the radius of the wire

Here we have

F = 0.795 N

r = 30.9 m

Therefore, the torque produced is

`\tau = (0.795 N)(30.9 m)=24.6 N m`

(b)
`0.035 rad/s^2`

The equivalent of Newton's second law for a rotational motion is

`\tau = I \alpha`

where

`\tau` is the torque

I is the moment of inertia

`\alpha` is the angular acceleration

If we consider the airplane as a point mass with mass m = 0.741 kg, then its moment of inertia is

`I=mr^2 = (0.741 kg)(30.9 m)^2=707.5 kg m^2`

And so we can solve the previous equation to find the angular acceleration:

`\alpha = (\tau)/(I)=(24.6 Nm)/(707.5 kg m^2)=0.035 rad/s^2`

(c)
`1.08 m/s^2`

The linear acceleration (tangential acceleration) in a rotational motion is given by

`a=\alpha r`

where in this problem we have

`\alpha = 0.035 rad/s^2` is the angular acceleration

r = 30.9 m is the radius

Substituting the values, we find

`a=(0.035 rad/s^2)(30.9 m)=1.08 m/s^2`