Question: For the vector whose polar components are (Vr = 1, Vθ = 0), compute in polars all components of the second covariant derivative Vα;μ;ν. To

For the vector whose polar components are (Vr = 1, Vθ = 0), compute in polars all components of the second covariant derivative Vα;μ;ν. To find the second derivative, treat the first derivative Vα;μ as any tensor: Eq. (5.66).)


For the vector whose polar components are (Vr = 1,
VBB“, = B

VBB, = B"vs + B" r"ap B" ar", vB.

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