Calculate Mass of Core in M87 Galaxy w/ Hubble Telescope

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Astronomers have identified a massive core in the M87 galaxy, potentially a black hole, using the Hubble Space Telescope. They measured gas clouds orbiting the core at a speed of 758 km/s from a distance of 5.58 x 10^17 m. To calculate the mass of the core, the correct formula is M = v²R/G. Participants in the discussion clarified the calculation method, emphasizing the simplicity of the process. The conversation highlights the importance of accurate formulas in astrophysical calculations.
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Astronomers using the Hubble Space Telescope have recently deduced the presence of an extremely massive core in the distant galaxy M87, so dense that it could well be a black hole (from which no light escapes). They measured the speed of gas clouds orbiting the core to be 758 km/s at a distance 5.58 x 1017 m from the core. Calculate the mass of the core.

I'm at a complete loss as to how to calculate the mass because I have no radius to work with. What alternative is there to m = gr^2 / G?
 
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Your formula is incorrect,it should read:
M=\frac{v^{2}R}{G}

Plug in the numbers and that's it.

Daniel.
 
Wow, that easy, huh? Haha, thanks for your help!
 
Thread 'Variable mass system : water sprayed into a moving container'

Thread 'Variable mass system : water sprayed into a moving container'

Starting with the mass considerations #m(t)# is mass of water #M_{c}# mass of container and #M(t)# mass of total system $$M(t) = M_{C} + m(t)$$ $$\Rightarrow \frac{dM(t)}{dt} = \frac{dm(t)}{dt}$$ $$P_i = Mv + u \, dm$$ $$P_f = (M + dm)(v + dv)$$ $$\Delta P = M \, dv + (v - u) \, dm$$ $$F = \frac{dP}{dt} = M \frac{dv}{dt} + (v - u) \frac{dm}{dt}$$ $$F = u \frac{dm}{dt} = \rho A u^2$$ from conservation of momentum , the cannon recoils with the same force which it applies. $$\quad \frac{dm}{dt}...
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