Does Pi Change in Curved Space Geometry?

AI Thread Summary
In curved space geometry, the value of pi does not change; it is a constant defined in Euclidean terms. The confusion arises from the fact that measurements and formulas in spherical geometry differ from those in flat geometry. For example, the angles of triangles in curved space do not sum to pi, indicating that the geometry itself alters the relationships between measurements. Therefore, while pi remains constant, the equations and relationships in curved geometry must be adapted accordingly. Understanding these distinctions is crucial for accurate calculations in non-Euclidean contexts.
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If i have a volleyball and draw a circle around the centre, then draw a line between the top of the ball and the centre and measure the two line I find that the ratio circumference of the circle to diameter of the circles is 4, thus implying that in this case pi is 4, however if I drew a circle of a different size I would get a different ratio.

Could anyone tell me if the value of pi changes in curved space, or if it is the equations that need to be updated?

Thanks in advance for your help.
 
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pi does not change. it is not defined as a ratio of anything in spherical geometry (a priori, at least). the formulae of things in spherical geometry all change: the angles of triangles no longer add to pi either.
 
Thanks for your help Matt, that clears up some confusion
 
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