What Would Happen if Earth's Core Suddenly Disappeared?

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In summary, if the Earth's core vanished, the planet would experience an increase in radiation levels due to the lack of a magnetic field. The rotation of the Earth would also become unstable and potentially stop. While the Earth's core is crucial, the planet would not collapse without it. However, it is highly unlikely that life would be able to survive without the core. It is not possible for the Earth's core to simply vanish as it is constantly replenished and is an essential part of the planet's structure.
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lputput
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What would happen if the core of the Earth suddenly disappeared? Would the gravitational field it emitted immediately disappear because the mass at the center disappeared. Would the surrounding Earth collapse into where the core used to be because of it being pulled there or would a new center of gravity at another point be generated?
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  • #2
Hi lputput
welcome to PFsince it cannot disappear, any speculation is probably pointless
and not really within the realms of mainstream science that the Physics Forums deals with :smile:regards
Dave
 
  • #3
lputput said:
What would happen if the core of the Earth suddenly disappeared? Would the gravitational field it emitted immediately disappear because the mass at the center disappeared. Would the surrounding Earth collapse into where the core used to be because of it being pulled there or would a new center of gravity at another point be generated?
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TPnYoGnmkHIjPtELxnICwOzaJkmES+l/PkvJBSs0JCXmI9XziMuiNYfAGvrYsmM1HkkPybT4ryBYfKSTErXd66o9GncNy6wrl42t/rL5DTsnNOfmQUz007vzjLJn9FIXMkVPLdXyWP/uFUz4zfuYt/8N/9hnPg/3wlJQkxbGvR9ZW9duUj1wq84H1o4GuVPms8qosSSldE0F/BLHKh09KvicwWXzYkQV9w/qmnVx1ldTJKXz6vo+6PyIfdqP89sOPyZV6QD0uOfEnHwMELhDm6dOyp0h0/+ILpSSsDznB57VQUbfWV/Z2UpUKBYf+ZHm9VErBBxFAplX4vkr5qMlVNV0qeEUy6P08qeNjeu7v0W9jlvtMnNkNi89N8qLCp7v7xQ/kStg/18r58TlJaBLI3wNCY4vHT4uaoK7yyTwPfFb1ZCKdNJJ5I1XVnxBsXfBGnRdDmsEPDxpFrD5jB1HCuF00El5ON3ZEIREnH/Cfvfmc8eTTc2rWyQcIzZI+X0I9X/Z60YEtcc5KAvl7QEK6NDycxxlVgpAfTmTzKTmUzyckUc3nS6IUz6fKfOHrw8Nx9J/ThXxek0NaPo/fk+FzynOeg8Vn0cFnBvkwM2ON+JDPu118un/4nORO+ZV7Xp/2ogMyvdkEHzS5sn04Cv+Ci06muOj6E5yRR+WNkvWX8uQv2Wd0Ux0fbg/4cHfbwqe7+3Oy46dAy8QnzTE90hSftyviQxqcVlovo9+YoECL7eLT3U1yfiaoCT5HWmimlQvkU84VRl4BnxmlfXw+J/W7WFUUnyB1l/J5unKUVQw8ROk+vR0xuRmOPQzAn09P7uNuBh8A5GOATvk0Be1v0jLPkRbigc/aHg1JM1EcJAYE7sLzH2T/6vk5m88Poz/3NkF+fDpIXxD4xEzMaexxiejduzSvcd+8lPD0D1vn0/1i7uax5oM7OmxZigl6g4OzonXzoQ7Hp/vTyePNh6OATC6zyN2NJh75BV8H4vODt4le3vRJQweDDxnnlqyKDvY5R++Yr94hn56MTx0jIHwW3ixW6hZ3o884dl3nEHy6PySePXc5nw0+IHwuKiZNO3ft7Sl3o99winf0flA+c2+Rj9TsyS4Bj7S06ExRPrdMy0Kbb55diN7luPpBLQHmI6Wam28oaFl9VU+1OEuK8lmgfEzz0S3cuC5xrKa6APPBPKJshaMhufyXanwqWa/VJE/zG+kQjU9D9putH/LOzlf4VMrtjxS//Gog+YjFvJYfLqYFNT8Mf0oQslXyG4VSHk8OSlleV7MlXk9JjvwG/JTkm9+o8pksH568lVGUtvqHlI+XZPz45CgfUfISweaT1nWjeJvHkoWuF3W+IIhJfRiPZhR4fpDyEQw+JAlyPO/Mj+n68HA6wQ8P8175MZvP3swMd8GOKSKvHpmX2hJf/FNZfvf7f/CSr//t7zzlxtf/+vWN3xdTnoLGxOaTSmdv83F45Gy6pBtCdrWYljA/rydVar+r+Xmpml/V46KsJpNpPFznx4fjFpdMR0i6UDvK5mB8Wi5WtFjBMOIVPvB8YpLyAf3geeCymhzU6+sXglXfKefnRczP68mkZ32H8olE77r4RF55pg9b4vMf/2zL7278vZd8/e9/6yk3fvH1L27cGE54SrbKJyvIbj6D8P2io35h1QfVuFxX31nFd3oMibb4RO4udk1W+dy6ZHoaoIPYnxefnnrb9qeOD3xRTKcd+oNvE7UkXxAd9UGrvpOW02k/+1zLpzPxzUHyPweKL9qyf9XxCUl5vqTqtx36k9X51dVVXRcc9WUeN7YEn9D0VX/9uW8uOflEIm3dvz7q88LThvhLShnAxwA+t424ahi4PxkhCfsTBrE/YbichI8nsBEmBft6pT8B6zuSb3+CxacTdvjJCz49LYfjQ7xrGDfdRxAPwAdbWKRsVgMNyWpaFkwS9q2Eqv0t1amRWbuRpdrfQheoX38L8lmHp77Ecd41nUPy+fKA+cOzYH9iTcSn1TanSk+U9eXq38tvFCp/cX7Ppz+KHnmnZZ0l7m5jOr58+rzyz97pQ18+uzuYn7/s3wH0tkW8TPncMT0OozTPJxwmv2XweeGzuvz5BKG+Q+uD8NTmIg5YjfoY5sZ8POpfIz71Hd/6RSDqg5RPNGEudXUtvrlw4cJX7eXz4iM/POHwdz4F5ibry2+fz8IjmoLemzQnJ807Dfh4928w+Lwgz3O+LRx+9dPdGD1nebR8pHNkZ7ySQMTO8Pu+ayzyoNz/U88n83ENn49hcfmftvQ5p3LS6v858nO6sIuaS9XmZ4677+8J2f1jDPu8TNz9LZ+yWshcfGZ9lpfN56jPeWuEzLnPFkyaX93yViG7/1Bxtc/bfOZ+W+Hz4oePCLnZoJV1ec2nutM7S6dqHvkJjPr2eQ5TrV6E2P2ZlE/P8vPP/0g+/hDlU0KURnh6FJ/+sSGSwf7eIx8ZafX31py/4Mw3XicMvPjQ05U4HmuOCln2X1oWH5+BE8gnFoAzqOy5G4sc55GD9uvvBRO949//7JKbDYrLmUDM4RiYZ51dXjS9UhwvN737w1vpn0c+PsdQyTju7leP/oScdT6lTiY9+LTr/E6DI2Dl8ylHbX5Y55veEZ9Tf/LJbQAfLgjm2Tp+ypgb9db59MR8Tshd/4TOkXoahBkTInNqnScf5vnTA/Dh/KzzlDXE5elRe4comCOr38G8+Nhz1Q/NZ5n4+M7w++j53CMPLlDoAquz0J58mOffWz+f+6Ufno0nNLUajPPd7PkArfFp9Xx3ePkTv3l/G0GaD0D51A1HmmTfh9aW+QkNz7/3fsll1gLDJyQxXMRJxcOBjtBLm2pHY7c4P8G3L7Oj44nlHAYED51vM1rDZ8nTga7M/3GW9lqbv9FgBFAvCdZ8G4E119g0L7D7fJnzkVqab9NgxtbY99T6kKOtXDhFmqjf4ulIbFYU7zE/qun5SOFwzn+AFHlNr+QZCMryCrGDVBypfoeRB7JTrAedrwW22X88Ek5H6gtEaFoV9BFrLVAXpjneMFqB7PmH7uH8zc8fy/iPJqF1wSAknl2SZg74Q0BNzs9scr5fONwID+ad+468LlgrmCZj3evAnL96zxqPfYD5kLi4/C8Q2dgdp3n5o0+MuUVjz57fY/Apz+91PWlT80Ubaw+dAB2DyDQoe3tZPBSIxac8/9l5r2cz82nDPQ1tD80b4o2EQVMfUKB5BqCZSRafB6z5zw3nG4PfM97wdp6TrzPK84BtXpbIjNsLZkyTdRLVmj/f4nxsHD8x3fBClekdjCwCtnlZItbmgZaWJk1mU5B9f0HGdby/4fzwJmYbd2zZeZ+gWR+UmjzQzKLJvfHombKKPLX3F/jN5+9ZHmkCzzQJUt6nVpz3g2AR9atXngctLT6xJu93CIdP3SS7PrMkLNnYgl+bCe5NlsLAU5wlRd0e07zv048IIQbN0b922hOv+0FgZcFDPxlrqD1DoD042DhIk59dIgj23XE0rvBpcynf3zRb06TAul+mZ/kUIbtN3A6ygZfWAB4S3LuGsRYGgJaYcambD72Ax31/U/39RDhx69QI2Wrmzr2xJxCXIp7ApMVYgoD+sOQz/7DM5znd4Z84i2A191shnZ4T4AufbTDu2cLzPbHxvKvr7Q8kaZyX5DP/xxYIMWifnXsEXeV+NIpm+eYyeHpbfkPqHDIFeDBs7/ccxRMMwSUWUxr20tt9mu4uKft+PTpF68SJK/SKveboQNgFccXaMbhDF+OwcaVhK3Tlfk/X2sH7GU+Ewyc2d74jn5CNsbEm6dCbrbjjcQczjTPuNVSgCLpAdfefjj3GDqlekJauQS3faxVUz8clIgA608BAl13oTG2HZS/ZP9/MVWh12kPnYa8EMa6oE0y2kkaArCSHEmvD/ctUe4IalTKEHlppBCiycIbGGDVtBq3zOTtFtYc0Ne05GELv+bzWAJBVZz70/e8b35fxBKqg4y/SANUgf0JWHczdJ9Uynw2Cfg/VHt8pnwETLBgSsu2vQFYdzO0CtcgH9rsM9XvI0+OjPSh0iZEzvmcx6BZW28fREp8tDCqo33OMFpclQhr9oO2LfgqEWxiYDucCa4nPFtnJcLnn6PcEPKpgCfpBhLz08RQXzkAU764zt8Jny873HBe/p1bkc3id90sfBbo3UlsnbJrP2ElSzvdcPp54cDTTVapB3tOgCd5qv7lfDcKa5DM2RciOrT1X08fM9DhlnhohrzUGTvSO4gpSm+TzmIzmwLRfCXy+p5FgPghHvHg1I66PZvAij7FW+Azto9OjZLAHKvD5ngYihKgROvOgk00oem0tAwpUybM25jMEhmccHIMYbuvzxyTk8hZB1gh1hR4wzVBkgYyCKlTyiA357H5PRkB5Yrirk8vacceDIq7QRfaAaYasOHWt7CT68xk6DWYZ6ORi+AuvTgQ9WdikCPIK2ulrL1mLLHoP3ehyHsiPz34vIbEcaNsOpXMcfUIvkaR5jFjJvYX6iCPyLe12P+3LZ2yIPCGvIVKn3SsQbl2tvbXrmIs40U/t0DpjK9umk1ZOn/fgszE1BZqzFgN/x15ZpH/gmLqE3iLIE9QMndmunX8c6fzWGkVzncXn+tY0wR0LzI6iXKGxaP9EcEukhxBBFq1Vhv6QC1GUEPCD1sj5DQefsaGhobNbhMxu5hCN7e+Qy/PpHyUdKiLNC+Fuvx6NOhba+jZsTMoVsjtNtk7a8pi+c3ycKo4yPk5Vhzwd+JFsWmyRBgauWoi2tzFytc11pHMBAHEZ0CNSkQwKoOG4kbU160tXB45bnqdVEWCVrVwtI9i+CEuNKlJ04RrGYgzJjdtvBn/nIBdIHj8RpJWVipZsv3x5rxMYRUGDRvocXMZ3qMTsdbXyY/J3GokgaZpw+eFDm9E1lG/xb6NVqRB8eHle0LSfhuo4RZbl/v5+4i/wjrT8o3N2mhVJDk2gMNHQ79TdbvtTE3oDq8iSyt2s7+W9vJf38l7ey3t5L0cu/w8M06eZJAlb9gAAAABJRU5ErkJggg==

You could make a fortune! Quiz Question -- Why?
 
  • #4
davenn said:
Hi lputput
welcome to PFsince it cannot disappear, any speculation is probably pointless
and not really within the realms of mainstream science that the Physics Forums deals with :smile:regards
Dave

Dave, Shhhh. WE could make a fortune! You in?
 
  • Like
Likes davenn
  • #5
hahahaha

selling snake oil on 1st April ... yup that's classic :wink:
 
  • #6
If a void just happened to appear in place of our core, then I'd imagine that the mantle and crust would collapse inward causing intense friction.
I guess the changes in gravitation field would have an effect on our atmosphere, and the orbit of the moon. Loss of the inner core would likely cause a serious change in the magnetic field that currently protects us from the Sun. Shape of Earths orbit also would probably change.

Odd question.
 
  • #7
In my opinion..
If the inner layer that's left is still Rock and doesn't collapse inward...
You are removing a lot of mass from the earth.
Gravity will thus be less and because of that..
The atmosphere will be less dense.
Air pressure will be less. we might have trouble breathing.

Please leave the core where it is.
 
  • #8
lputput said:
What would happen if the core of the Earth suddenly disappeared? Would the gravitational field it emitted immediately disappear because the mass at the center disappeared. Would the surrounding Earth collapse into where the core used to be because of it being pulled there or would a new center of gravity at another point be generated?
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
A seemingly innocently posed question. But still it it has a vague-i-ness - that should be clarified.

The Earth has several cores and fortunately, even though scientists really like to use words of Latin, Greek, and any old language they can find to name things, in this instance they just have called them simple descriptive names such as inner core, and outer core, as seen here.
http://www.kids-earth-science.com/Earth's-core.html

Not shown, though, ( that site should be updated to reflect current scientific wisdom ), is an inner-inner core inside of the inner core, as conjectured from recent studies.

Being a planet with 3 cores, much like a computer with a 2 core, 4 core, or more core CPU, if that analogy can be correctly applied and workable, it could be that if one Earth core is lost, the other 2 cores may be able to take over from the missing core, working harder at what they do do to make up for the necessary tasks to continue the Earth as a functioning unit. How that would turn out for the Earth is a dauntless task with the necessary physics hardly understood, if it ever can be understood.

Then again, perhaps a core-breach is what is being referred to, but realistically that is a whole different can of soup, a subject of which I know absolutely nothing.
 
  • #9
lputput said:
What would happen if the core of the Earth suddenly disappeared?

Mass can't just disappear; that violates conservation of energy. So your question doesn't have an answer, because it assumes a scenario that can't happen.
 

Related to What Would Happen if Earth's Core Suddenly Disappeared?

1. What would happen if the Earth's core vanished?

If the Earth's core vanished, the planet would no longer have a magnetic field to protect it from solar winds. This would lead to a drastic increase in radiation levels on the surface, making it uninhabitable for most forms of life.

2. How would the disappearance of the Earth's core affect the planet's rotation?

The Earth's rotation is largely influenced by the mass and distribution of its inner core. If the core vanished, the planet's rotation would become unstable and could potentially slow down or even stop completely.

3. Would the Earth's surface collapse without its core?

While the Earth's core is a crucial part of its structure, the planet would not collapse if it were to vanish. The outer layers of the Earth, such as the crust and mantle, would still remain intact.

4. Could we survive on Earth if the core disappeared?

It is highly unlikely that humans or most other forms of life would be able to survive on Earth without its core. The extreme conditions caused by the disappearance of the core would make it nearly impossible for life to thrive.

5. Is it possible for the Earth's core to actually vanish?

No, it is not possible for the Earth's core to simply vanish. The core is made up of solid and liquid iron-nickel alloy and is constantly being replenished through the process of convection. It is an essential part of the planet's structure and cannot simply disappear.

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