Part 1) A ladder rests against a vertical wall. There is no friction between the wall and the ladder. The coefficient of static friction between the ladder and the ground is µ = 0.599 .

Consider the following expressions: A1: f = Fw A2: f = Fw sin θ B1: N = W 2 B2: N = W C1: ℓ Fw sin θ = 2 Fw cos θ C2: ℓ Fw sin θ = ℓ W cos θ C3: ℓ Fw sin θ = 1 2 ℓ W cos θ , where f: force of friction between the ladder and the ground, Fw: normal force on the ladder due to the wall, θ: angle between the ladder and the ground, N: normal force on the ladder due to the ground, W: weight of the ladder, and ℓ: length of the ladder. Identify the set of equations which is correct.

1. A1, B1, C1

2. A2, B1, C2

3. A1, B1, C3

4. A2, B2, C1

5. A2, B1, C3

6. A2, B1, C1

7. A1, B1, C2

8. A1, B2, C1

9. A1, B2, C2

10. A1, B2, C3

Part 2) Determine the smallest angle θ for which the ladder remains stationary. Answer in units of ◦ .

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