Answer:
μminimum = 0.2829
Explanation:
Draw a free body diagram of the rod.
Split all forces on the rod into their vertical and horizontal components.
Choose a pivot point so that the torque equation only has one unknown.
ΣFx = 0 (→) ⇒ N - Tx = 0 (1)
ΣFy = 0 (↑) ⇒ Ff + Ty - FL - FR = f + Ty - Wsign = 0 (2)
Στ = 0 ⇒ - Ff*(5 m) + FL*(4 m) = - Ff*(5 m) + (Wsign/2)*(4 m) = 0 (3)
[If you choose the axis of rotation at the end of the rod furthest away from the wall]
Trigonometry tells us that Ty/Tx = tan(23°) (4)
To get Ff use equation (3)
Ff = (2/5) Wsign
To get Ty use equation (2)
Ty = (3/5) Wsign
To get Tx use equation (4)
Tx = (3/5) Wsign / tan(23°)
To get N use equation (1)
N = (3/5) Wsign / tan(23°)
Since f ≤ μ N for static friction,
μminimum = Ff / N = (2/3) tan(23°) = 0.2829
The answer (in this particular case) does not depend on the weight of the sign.
The smallest value of the coefficient of friction μ such that the sign will remain in place is μminimum = 0.2829.
If we make a free body diagram of the rod.
We will split all forces on the rod into their vertical and horizontal components
Next, we choose a pivot point so that the torque equation only has one unknown.
Now, using the knowledge of trigonometry,
Ty/Tx = tan(23°) (4)
To get Ff, we use equation (3)
To get Ty use equation (2)
To get Tx use equation (4)
To get N use equation (1)
Since f ≤ μ N for static friction,
Then, μminimum = Ff / N
= (2/3) tan(23°)
= 0.2829
Hence, in this case, we note that the answer does not depend on the weight of the sign.
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