Which of the following physical quantities has the same dimensions as \( \dfrac{\text{Force} \times \text{Time}}{\text{Mass}} \)?
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Always simplify dimensional expressions step-by-step. Cancel out common units (like mass here) and compare the final dimensional formula with standard quantities like velocity \( (L T^{-1}) \), acceleration \( (L T^{-2}) \), etc.
Step 1: Determine the dimensional formula for Force. \[\text{Force} = \text{mass} \times \text{acceleration} = M \cdot L \cdot T^{-2}\]Step 2: Calculate the expression: (Force × Time) / Mass.\[\frac{\text{Force} \times \text{Time}}{\text{Mass}} = \frac{M \cdot L \cdot T^{-2} \cdot T}{M} = \frac{M \cdot L \cdot T^{-1}}{M} = L \cdot T^{-1}\]Step 3: Identify the resulting dimensional formula. \[L \cdot T^{-1} \quad \text{represents the dimensional formula for Velocity}\]Conclusion: The derived quantity is Velocity.
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