I know the title sounds ridiculous, but when I took calculus in college we had a problem like this. The result seemed unreal to me, but I can't figure out the reason why it doesn't work.
This was the gist of the question:
Suppose there is a ladder leaning against a wall, as shown in the figure below. The ladder is $2$ meters long. The ladder is on a conveyor belt moving away from the wall at a constant speed of $1$ meter per second.
How fast will the end of the ladder against the wall be moving downward once it hits the ground?
So here's how we solved this: Let $h$ be the distance from the ground to the top of the ladder, and $w$ be the distance from the wall to the other end of the ladder, and let $l$ be the length of the ladder.
By the Pythagorean theorem,
$$h^2+w^2=l^2$$
Take the derivative of both sides of the equation with respect to time, and note that the length of the ladder is constant:
$$2h\frac{dh}{dt}+2w\frac{dw}{dt}=2l\frac{dl}{dt}=0$$
Solving for $\frac{dh}{dt}$ gives us:
$$\frac{dh}{dt}=-\frac{w}{h}\frac{dw}{dt}$$
Suppose at time $t=0$ the ladder is vertical. Then $w=t$ and $h=\sqrt{l^2-w^2}=\sqrt{4-t^2}$. Take the limit of $\frac{dh}{dt}$ as $t\to 2$:
$$\lim_{t\to2^-}\frac{dh}{dt}=\lim_{t\to2^-}-\frac{w}{h}\frac{dw}{dt}=\lim_{t\to2^-}-\frac{t}{\sqrt{4-t^2}}\left(1\frac{\text{m}}{\text{s}}\right)=\infty$$
The equations are saying that the top of ladder is approaching infinite speed as it falls towards the ground!
This doesn't seem like a physically possible result, but what part of this setup is not phyiscally possible?
