Vector Mechanics — Double Gear Rolling on a Rack

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Alexanddros81
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Homework Statement
The double gear shown rolls on the stationary lower rack; the velocity of its
center A is 1.2 m/s directed to the right. Determine (a) the angular velocity
of the gear, (b) the velocities of the upper rack R and of point D of the gear.
Relevant Equations
-
Hi!
My first question: How does he get the equation ##\frac {x_A} {2πr_1} = -\frac {θ} {2π}## ?
 

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You forgot to define ##\theta## (Solution forgot it too !)
Ask youriself: how far does ##A## go to the right for one revolution (##\theta = 2\pi##) ? For half a revoluton ? For a given ##\theta ## ?
 
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Alexanddros81 said:
Homework Statement:: The double gear shown rolls on the stationary lower rack; the velocity of its
center A is 1.2 m/s directed to the right. Determine (a) the angular velocity
of the gear, (b) the velocities of the upper rack R and of point D of the gear.
Relevant Equations:: -

Hi!
My first question: How does he get the equation ##\frac {x_A} {2πr_1} = -\frac {θ} {2π}## ?
What is the definition of a radian? How is it connected to this question?
 
Chestermiller said:
What is the definition of a radian? How is it connected to this question?

A radian is ratio between length of the arc and its radius:

$$\theta = \frac {x} {r}$$

For a complete circle, it became:

$$\theta = \frac {2 \pi r} {r} \\
\theta = 2 \pi ~ \text {rad}$$
 
bagasme said:
A radian is ratio between length of the arc and its radius:

$$\theta = \frac {x} {r}$$

For a complete circle, it became:

$$\theta = \frac {2 \pi r} {r} \\
\theta = 2 \pi ~ \text {rad}$$
I was asking the OP to help him/her understand where the equation in question had come from.
 
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Hi!
I will provide my thinking soon for this question
 
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BvU said:
You forgot to define ##\theta## (Solution forgot it too !)
Ask youriself: how far does ##A## go to the right for one revolution (##\theta = 2\pi##) ? For half a revoluton ? For a given ##\theta ## ?

for one revolution ##A## goes to the right ##2\pi r_1##. For half a revolution ##\pi r_1##.
For a given ##\theta## goes to the right ##\theta r_1##?
 
Alexanddros81 said:
For a given ##\theta## goes to the right ##\theta r_1##
No. Theta is an angle. It does not go to the right. You mean: For a given ##\theta##, A goes to the right ##\theta r_1##. Correct.

Now think the lower rack out of the way. Le A be a fixed axis
Ask youriself: how far does B (rack R) go to the right wrt A for one revolution (##\theta=2\pi##) ? For half a revoluton ? For a given ##\theta## ?