Problem Statement
A particle moves under a central force with angular momentum L and mass m. Find the areal velocity dA/dt.
Given Information
- Angular momentum L = const
- Mass m
- Central force
Physical Concepts & Formulas
$$\frac{dA}{dt}=\frac{L}{2m}$$
Step-by-Step Solution
Step 1: Area swept in dt: dA = ½|r × dr| = ½|r × v|dt.
Step 2: |r × v| = L/m.
Step 3: dA/dt = L/(2m).
Worked Calculation
dA/dt = L/(2m)
Answer
$$\boxed{\frac{dA}{dt}=\frac{L}{2m}}$$
Physical Interpretation
This is Kepler’s second law: equal areas in equal times. It follows purely from angular momentum conservation, valid for any central force, not just gravity.
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