| 1. | This result means that linear momentum for the system is conserved.
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| 2. | The equivalent of linear momentum in rotational motion is angular momentum.
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| 3. | In special relativity theory, the expression for linear momentum is modified.
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| 4. | Observers in different frames would find different values of linear momentum of a system.
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| 5. | Where \ vec p denotes the linear momentum.
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| 6. | Which is the conservation of linear momentum.
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| 7. | Linear momentum depends on frame of reference.
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| 8. | The Navier� Stokes equations form a vector continuity equation describing the conservation of linear momentum.
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| 9. | But how then is linear momentum conserved?
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| 10. | A moving vortex carries with it some angular and linear momentum, energy, and mass.
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