The ant on a rubber rope is a mathematical puzzle with a solution that appears counterintuitive or paradoxical. It is sometimes given as a worm, or inchworm, on a rubber or elastic band, but the principles of the puzzle remain the same.
The details of the puzzle can vary,[1] [2] but a typical form is as follows:
At first consideration it seems that the ant will never reach the end of the rope, but whatever the length of the rope and the speeds, provided that the length and speeds remain steady, the ant will always be able to reach the end given sufficient time - in the form stated above, it would take years. There are two key principles: first, since the rubber rope is stretching both in front of and behind the ant, the proportion of the rope the ant has already walked is conserved, and, second, the proportional speed of the ant is inversely proportional to the length of the rubber rope, so the distance the ant can travel is unbounded like the harmonic series.
For sake of analysis, the following is a formalized version of the puzzle.
The statement of the puzzle from the introduction corresponds to when
c
v
\alpha
Although solving the problem appears to require analytical techniques, it can actually be answered by a combinatorial argument by considering a variation in which the rope stretches suddenly and instantaneously each second rather than stretching continuously. Indeed, the problem is sometimes stated in these terms, and the following argument is a generalisation of one set out by Martin Gardner, originally in Scientific American and later reprinted.
Consider a variation in which the rope stretches suddenly and instantaneously before each second, so that the target-point moves from
x=c
x=c+v
t=0
x=c+v
x=c+2v
t=1
Let
\theta(t)
\theta(0)=0
\alpha
| \alpha | |
| c+v |
c+v
\theta(t)
| \theta(1)= | \alpha |
| c+v |
\alpha
| \alpha | |
| c+2v |
c+2v
| \theta(2)= | \alpha | + |
| c+v |
| \alpha | |
| c+2v |
n\inN
| \theta(n)= | \alpha | + |
| c+v |
| \alpha | + … + | |
| c+2v |
| \alpha | |
| c+nv |
Notice that for any
k\inN
| \alpha | \geqslant | |
| c+kv |
| \alpha | =\left( | |
| kc+kv |
| \alpha | \right)\left( | |
| c+v |
| 1 | |
| k |
\right)
The term
| \left(1+ | 1 | + … + |
| 2 |
| 1 | |
| n |
\right)
N\inN
| 1+ | 1 | + … + |
| 2 |
| 1 | \geqslant | |
| N |
| c+v | |
| \alpha |
\theta(N)\geqslant1
Therefore, given sufficient time, the ant will complete the journey to the target point. This solution could be used to obtain an upper bound for the time required, but does not give an exact answer for the time it will take.
A key observation is that the speed of the ant at a given time
t>0
\alpha
v
t
x=c+vt
t
x=X
| vX | |
| c+vt |
t
y(t)
t
y'(t)
This is a first order linear differential equation, and it can be solved with standard methods. However, to do so requires some moderately advanced calculus. A much simpler approach considers the ant's position as a proportion of the distance from the starting-point to the target-point.
Consider coordinates
\psi
\psi=0
\psi=1
\psi
t\geqslant0
x=X
| \psi= | X |
| c+vt |
\alpha
x
| \alpha | |
| c+vt |
\psi
\psi
t
\phi(t)
\psi
t
\phi'(t)
where
\kappa
Now,
\phi(0)=0
| \kappa=- | \alpha |
| v |
ln{c}
| \phi(t)= | \alpha | ln{\left( |
| v |
| c+vt | |
| c |
\right)}
If the ant reaches the target-point (which is at
\psi=1
t=T
\phi(T)=1
and hence for the length of the rubber band when the ant catches the target point (i.e. the distance travelled by the ant):
(For the simple case of, we can consider the limit
\limvT(v)
T=\tfrac{c}{\alpha}
T
c
v
\alpha
v>0
\alpha>0
For the problem as originally stated,
c=1km
v=1km/s
\alpha=1cm/s
T=(e100000-1)s ≈ 2.8 x 1043429s
Consider the situation from the introduction, which is a rope 1 km long being stretched 1 km/s, along which an ant walking is with a relative speed of 1 cm/s. At any moment, we can imagine putting down two marks on the rope: one at the ant's current position, and another 1 mm closer to the target point. If the ant were to stop for a moment, from its point of view the first mark is stationary, and the second mark is moving away at a constant speed of 1 mm/s or less (depending on the starting time). It is clear that the ant will be able to reach this second mark - for a simple over-estimation of the time it takes, imagine that we "turn off" the force that the rope applies to the ant at the exact moment it reaches the first mark (leaving the ant to continue onward at constant velocity). With respect to the reference frame for the first mark at this moment, the ant is moving at 1 cm/s and the second mark is initially 1 mm away and moving at 1 mm/s, and the ant would still reach the mark in 1/9 s.
What we need to do is think about the ant's position as a fraction of the length of the rope. The above reasoning shows that this fraction is always increasing, but this is not yet enough. (The ant might asymptotically approach some fraction of the rope and never come close to reaching the target point.) What the reasoning also shows is that every 1/9 s, the fraction of the rope that the ant walks along is (at least as large as a number that is) inversely proportional to the current time, since the target point is moving proportionally to time, and the fraction of the rope this 1 mm interval corresponds to is inversely proportional to that.
Quantities that grow at a rate that is inversely proportional to time exhibit logarithmic growth, which grows without bound, however slowly that might be. This means the ant will, eventually, reach the target point.
If the speed at which the rope stretches increases through time, then the ant might not reach the target. For example, imagine one end of the rope is attached to a weight that is in free fall in a uniform gravitational field, with the rope applying no force to the weight (in other words, the target point's position is given by a function of the form
x=c+\tfrac{1}{2}at2
c
a