Explanation of the Coin Rotation Paradox
A
moving coin completes one full revolution after only going half the
way around the stationary coin.
Start
with two identical coins
touching
each other on a table, and
oriented the same way.
Keep
one
coin stationary (the
eagle)
and
rotate the
other coin
(the
head) around
the
eagle coin,
keeping a point of contact with no slippage. As the
head coin
reaches the opposite side, the two coins
will again be oriented
the same way;
The
head coin
has made one full
revolution,
while
it has only gone half the way around the eagle coin.
Explanation:
This
apparent paradox is a useful example for explaining simple
relativity.
Movement
(in our case rotation) has meaning only when defined with respect to
a system of reference.
We
spontaneously tend to choose ourselves, the room, the table, our
eyes, or the stationary coin, as the system of reference. This is
case a), below. However, this is only one of the possible choices:
a)
If
the system of reference chosen is the eagle
coin, then the head
coin rotates a complete turn, from facing the eagle to facing away
from the eagle.
b)
If
the system of reference chosen is the head
coin, then the eagle coin rotates a complete revolution,
from the left of
the head coin,
to its
right, while
it has only gone half
the way around the head
coin.
This
can be better verified if you place the coins in a small table and
rotate the head coin, while you are moving around the table one
complete turn, synchronously with the head coin.
c)
Finally,
if the system of reference chosen is the contact point, then both
coins rotate half a turn, both ending upside-down. In this case, if
you keep rotating in synch with the contact point, then you will end
on the other side of the table.
What
remains constant, in all cases, is the apparent movement of the
contact point: it moves along both coins along the top half of the
edge of both coins (i.e. half the circumference of each coin).
If
you continued the rotation for an additional equal amount, the
contact point would reach the original position, having traveled one
full circumference in both coins. At that point both coins would be
in the original relative position.
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