In the minimum correction approach of decomposing the surface vector of a non-orthogonal grid, the relationship between the vector connecting the owner and the neighbour node $(\vec{E_f})$ and the surface vector $(\vec{S_f})$ is given as _________a) $\vec{S_f} sin⁡\theta.\vec{e}$ b) $\vec{S_f} cos⁡\theta.\vec{e}$ c) $(S_f cos⁡\theta) \vec{e}$ d) \((S_f sin\thet

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$(S_f sin\theta) \vec{e}$

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$\vec{S_f} sin⁡\theta.\vec{e}$

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$\vec{S_f} cos⁡\theta.\vec{e}$

TuteeHUB · Answer

$(S_f cos⁡\theta) \vec{e}$

TuteeHUB · Answer

$(S_f sin\theta) \vec{e}$

1.	In the minimum correction approach of decomposing the surface vector of a non-orthogonal grid, the relationship between the vector connecting the owner and the neighbour node \((\vec{E_f})\) and the surface vector \((\vec{S_f})\) is given as _________a) \(\vec{S_f} sin⁡\theta.\vec{e}\) b) \(\vec{S_f} cos⁡\theta.\vec{e}\) c) \((S_f cos⁡\theta) \vec{e}\) d) \((S_f sin\thet
A.	\(\vec{S_f} sin⁡\theta.\vec{e}\)
B.	\(\vec{S_f} cos⁡\theta.\vec{e}\)
C.	\((S_f cos⁡\theta) \vec{e}\)
D.	\((S_f sin\theta) \vec{e}\)
Answer» D. \((S_f sin\theta) \vec{e}\)

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