Problem Statement
A block of mass m₁ lies on a horizontal surface (coefficient of kinetic friction μk) and is connected by a string over a pulley to a hanging mass m₂. Find the acceleration and tension.
Given
m₁ on surface, μk friction. m₂ hanging. Massless string/pulley.
Concepts & Formulas
m₂g − T = m₂a (hanging). T − μk·m₁g = m₁a (sliding).
Step-by-Step Solution
Step 1: Add: m₂g − μk·m₁g = (m₁+m₂)a.
Step 2: a = g(m₂ − μk·m₁)/(m₁+m₂).
Step 3: T = m₂(g−a) = m₁m₂g(1+μk)/(m₁+m₂).
Worked Calculation
a = g(m₂−μk·m₁)/(m₁+m₂). T = m₁m₂g(1+μk)/(m₁+m₂).
Boxed Answer
a = g(m₂ − μk·m₁)/(m₁+m₂); T = m₁m₂g(1+μk)/(m₁+m₂)
Physical Interpretation
If μk·m₁ ≥ m₂ the system stays at rest — the hanging mass cannot overcome table friction. The system accelerates only when the hanging weight exceeds friction.
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