Like Fluoride or Oxygen.

  • @[email protected]
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    11 year ago

    Does the change in gravity gradient across your body kill you right now? No? You are currently orbiting the supermassive black hole in the center of the milky way.

    It was implied by “accretion disc” and by the fact that we’re talking about gravitational gradients at all that we’re talking about a close orbit. Gravitational strength gets smaller with distance according to the inverse square law, so by the time you’re a few light years out from the galactic core the gravitational gradient is already extremely insignificant.

    • @[email protected]
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      1 year ago

      Accretion discs can be large enough that I am pretty sure a human body wouldn’t be torn apart at that distance (at least the outer bits) by the difference in gravity across it’s length. In the linked article about the supermassive black hole at the center of the Milky Way, we’re talking 1000 astronomic units, so 1.5 * 10^14 meters.

      The current value of this black hole’s mass is estimated at ca. 4.154±0.014 million solar masses.

      So let’s calculate the equivalent distance from the sun in terms of gravitational force on an object at the outer edge of the accretion disk:

      F_sun = C * (R_equivalent)^-2 * m_object

      F_black_hole = C * 4.15*10^6 * (R_accretion_disk)^-2 * m_object

      where C equals the gravity constant times the mass of our sun.

      ==> C * (R_equivalent)^-2 * m_object = C * 4.15*10^6 * (R_accretion_disk)^-2 * m_object

      divide by C and m_object:

      <=> (R_equivalent)^-2 = 4.15*10^6 * (R_accretion_disk)^-2

      invert:

      <=> R_equivalent^2 = (1/4.15) * 10^-6 * (R_accretion_disk)^2

      ==> R_equivalent^2 ~= 0.241 * 10^-6 * (R_accretion_disk)^2

      square root (only the positive solution makes sense here):

      ==> R_equivalent ~= 0.491 * 10^-3 * R_accretion_disk

      with R_accretion_disk = 1000 astronomic units = 10^3 AU

      <=> R_equivalent ~= 0.491 * 10^-3 * 10^3 AU

      <=> R_equivalent ~= 0.491 AU

      Unless I have a mistake in my math, I sincerely hope you will agree that the gravitational field (tidal forces) of the sun is very much survivable at a distance of 0.491 astronomical units - especially since the planet Mercury approaches the sun to about 0.307 AUs in its perihelion.