MCQOPTIONS
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MCQOPTIONS
| 1. |
Let,t → Instantaneous time\( \vec{v} \) → Velocity in x-direction\( \vec{x} \) → Instantaneous position\( \vec{x_0} \)→ Initial positionThe relationship between Eulerian and Lagrangian approaches for velocity in x direction is given by _______ |
| A. | \( \vec{v}(t, \vec{x}(\vec{x_0}, t)) = \frac{\partial \vec{x} (\vec{x_0}, t)}{\partial t} \) |
| B. | \( \vec{v}(t, \vec{x}(\vec{x_0}, t)) = \frac{\partial \vec{x_0} (\vec{x}, t)}{\partial t} \) |
| C. | \( \vec{v}(t, \vec{x_0}(\vec{x}, t)) = \frac{\partial \vec{x} (\vec{x_0}, t)}{\partial t} \) |
| D. | \( \vec{v}(t, \vec{x_0}(\vec{x}, t)) = \frac{\partial \vec{x_0} (\vec{x}, t)}{\partial t} \) |
| Answer» B. \( \vec{v}(t, \vec{x}(\vec{x_0}, t)) = \frac{\partial \vec{x_0} (\vec{x}, t)}{\partial t} \) | |