Problem Statement
Find the angular momentum of a particle of mass m moving along a circular path of radius R with speed v, about the center of the circle.
Given
m, v, R. Uniform circular motion.
Concepts & Formulas
L = m·v·R (for circular motion, r ⊥ v at all times, so sinθ = 1).
Step-by-Step Solution
Step 1: L = |r × p| = m|r × v|.
Step 2: r = R, v perpendicular to r → L = mRv.
Step 3: Direction: perpendicular to the plane of the circle (by right-hand rule).
Worked Calculation
L = mRv.
Boxed Answer
L = mRv
Physical Interpretation
Angular momentum is conserved if no torque acts. For uniform circular motion on a smooth track, L = mRv remains constant throughout.
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