Problem Statement
A solid sphere of mass m and radius R rolls without slipping down an incline of angle θ. Find the acceleration of the center of mass.
Given Information
- Mass m, radius R
- Angle θ
- No slipping
Physical Concepts & Formulas
$$ma=mg\sin\theta-f,\quad I_{cm}\alpha=fR,\quad a=R\alpha$$
Step-by-Step Solution
Step 1: Newton’s 2nd law: ma = mg sinθ − f (friction up slope).
Step 2: Rotational: (2/5)mR²·(a/R) = fR → f = (2/5)ma.
Step 3: Substitute: ma = mg sinθ − (2/5)ma → a(1+2/5) = g sinθ → a = 5g sinθ/7.
Worked Calculation
a = 5g sinθ/7
Answer
$$\boxed{a=\frac{5g\sin\theta}{7}}$$
Physical Interpretation
Rolling friction uses some force to create rotation, reducing acceleration vs sliding (g sinθ). Hollow spheres (smaller I fraction) roll even slower; disks accelerate at 2g sinθ/3.
Leave a Reply