Vacuum solution with static, spherical symmetric spacetime

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zardiac
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Homework Statement


I am trying to derive the line element for this geometry. But I am not sure how to show that ds can't contain any crossterms of [itex]d\theta[/itex] and [itex]d\phi[/itex]


Homework Equations


ds must be invariant under reflections
[itex]\theta \rightarrow \theta'=\pi - \theta[/itex]
and
[itex]\phi \rightarrow \phi' = -\phi[/itex]

The Attempt at a Solution


Well I just put in this in the equation for the line element. assuming t=r=konstant.
[itex]ds^2=Ad\theta^2 + Bd\phi^2 + Cd\theta d\phi[/itex]
and the line element after reflection:
[itex]ds^2=Ad\theta^2 + Bd\phi^2 + Cd\theta d\phi[/itex]
Ah, and for a 2 sphere [itex]A=R^2[/itex] and [itex]B=R^2sin^2\theta[/itex]
How can I show that C=0?
 
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Maybe you need to consider more than just reflections. A cube is invariant under reflections about the center of the cube, but it is not spherically symmetric.