Question

ws#2 - friction
directions: draw a fbd and show your ( f_{\text{net}} ) equation for all. put all answers to 2 sig digs.

1. it takes a 50 n horizontal force to pull a 20 kg object along the ground at a constant velocity. what is the coefficient of friction?
2. if the coefficient of friction is 0.30, how much horizontal force is needed to pull a mass of 15 kg across a level board at a uniform velocity?
3. it takes 775 n of force to keep a ford truck moving at a constant velocity with a coefficient of friction of 0.31. what is its mass?
4. the coefficient of friction between rubber and ice is 0.040. how much force is needed to keep a 175 g puck sliding?
5. a 5.0 kg box will accelerate at 2.0 m/s² when we push it with 29.6 n of force. what is the coefficient of friction?
6. a cart with a mass of 2.0 kg is pulled across a level desk by a force horizontally of 4.0 n. if the coefficient of kinetic friction is 0.12, what is the acceleration of the cart?
7. a 4.8 kg object is accelerating across a level surface with a coefficient of friction of 0.40. the force of friction is 15 n and the applied force is 25 n. what is the acceleration?

answers

1. ( mu = 0.26 )
2. ( f_a = 44 , \text{n} )
3. ( m = 260 , \text{kg} )
4. ( f_a = 0.069 , \text{n} )
5. ( mu = 0.40 )
6. ( a = 0.82 , \text{m/s}^2

ightarrow (\text{right}) )

1. ( a = 2.1 , \text{m/s}^2

ightarrow (\text{right}) )

Explanation:

Problem 1:

Step1: Identify forces (constant velocity, so \( F_{net} = 0 \))

Horizontal force \( F = 50 \, \text{N} \), friction \( f = \mu N \). Normal force \( N = mg \) (since level surface), \( m = 20 \, \text{kg} \), \( g = 9.8 \, \text{m/s}^2 \). So \( F = f = \mu mg \).

Step2: Solve for \( \mu \)

\( \mu = \frac{F}{mg} = \frac{50}{20 \times 9.8} \)
\( \mu = \frac{50}{196} \approx 0.255 \approx 0.26 \) (2 sig digs)

Step1: Friction force formula (\( f = \mu N \)), \( N = mg \)

\( m = 15 \, \text{kg} \), \( \mu = 0.30 \), \( g = 9.8 \, \text{m/s}^2 \). Constant velocity, so applied force \( F = f \).

Step2: Calculate \( F \)

\( F = \mu mg = 0.30 \times 15 \times 9.8 \)
\( F = 0.30 \times 147 = 44.1 \approx 44 \, \text{N} \) (2 sig digs)

Step1: \( F = f = \mu N \), \( N = mg \), so \( F = \mu mg \)

Solve for \( m \): \( m = \frac{F}{\mu g} \)

Step2: Substitute values (\( F = 775 \, \text{N} \), \( \mu = 0.31 \), \( g = 9.8 \, \text{m/s}^2 \))

\( m = \frac{775}{0.31 \times 9.8} = \frac{775}{3.038} \approx 255 \approx 260 \, \text{kg} \) (2 sig digs)

Answer:

\( \boldsymbol{\mu = 0.26} \)

Problem 2: