Safety is extremely important on the
trapeze. Even though the net is remarkably stretchy, and
you could fall from right at the very top of your swing
and not hurt yourself if you land on your back, it is most
likely that (unless the fall is planned) you will fall awkwardly.
Even a fall into the net will do considerable damage if
you land on your head.
Professional trapeze artists do not use
safety lines. This is not because they do not fall, but
rather that they are practised at falling cleanly on their
back. For example, in Cirque Du Soleil, I saw a performer
just miss his double somersault with a half twist catch.
He shot down into the net, but he tucked his head in at
the last minute and landed on his back, so he was not hurt.
The other reason is insurance. Professional trapeze artists
are either flying at their own risk, or are covered by the
company they work for. In trapeze schools, this freedom
cannot be extended to beginners, since the premiums would
be much too high. Insuring the trapeze is very expensive
as it is! The flying trapeze school at the YMCA in Denver
has had to close recently after 70 years of operation, after
a man fell and broke his hip. There was some dispute regarding
liability, and it was forced to close.
There is another non-safety reason why
professionals prefer not to wear lines. The belt, which
the lines attach to, needs to be tight, and can be restrictive
in some tricks. Many people feel it is possible to achieve
more height in the advanced swing without lines.
How do they work?
The
operation of the safety lines is best demonstrated with
a diagram. Basically, an operator stands on the ground next
to the trapeze. The lines are clipped to the belt at the
board, and allow the flyer to swing with them, and even
be caught (they travel along the trapeze with the flyer).
The lines leave the flyer's belt on each side, are looped
over two pulleys at the top of the trapeze, and recombine
as one, thicker rope, which the operator holds. During normal
operation, the operator pulls the rope to take up excess
slack. In the event of a mistake, during which the flyer
falls, the operator pulls hard on the rope to exert a force
upwards on the flyer, slowing his descent. It should be
stressed that there is no mechanical advantage in the lines,
that is to say that any force exerted on one end of the
lines will be transmitted to the other end.
Since there is never much slack in the rope, as soon as
the flyer falls, the lines exert an upward force on him.
Therefore if the operator pulls on the ropes with a force
equal to the flyer's weight (taking into account the cos
a), he will hang in mid-air. In other words, the flyer never
builds up speed during the fall, requiring no larger impulse
to stop him. There are three cases to consider; firstly
when there are no safety lines, secondly when the flyer
is lighter than the operator, and thirdly when the flyer
is heavier than the operator.
Case 1: Let us assume
that the flyer falls from the extreme height of his swing
(about 5m). a is approximately 0.3c, so cos a = 0.95. Let
us assume that in this case he weighs 70kg. Ignoring air
resistance:
No upward force, so acceleration
is due to gravity (g) and is 9.8ms-1
v^2 = u^2 + 2as
We will assume starting
velocity (u) = 0 so v^2 = 2as
v^2 = 2 x 9.8 x 5 = 98
v = 9.9ms-1
Notice this was independent of the man's
mass.
Case
2: Using same assumptions from case 1, except flyer
has a mass of only 50kg (child) and the operator has a mass
of 70kg.
In this case, the child can exert a maximum
force on the safety lines of 500N.
T (cos a) = 500N
T = 526N
Since the operator weighs
700N this will not be enough to lift his from the ground,
so he can support the child (and even provide enough force
to lift her up…should he want to) and let her down
at any speed he wants to (ideally very slowly).
Case 3: Again, using
the same assumptions as in case 1, with the flyer having
a mass of 90kg, and the operator with a mass of 70kg.
F=ma (taking downwards
as positive)
90g - 70g(cos a) (all operator's
weight hanging on lines) = 90 x a
a = 2.56ms-2
v^2 = u^2 + 2as
We will assume starting
velocity (u) = 0 so v^2 = 2as
v^2 = 2 x 2.56 x 5 = 21.8
v = 5.1ms-1
Although this is a reduction of about
half, this still seems rather a large value to me, especially
given that people over 90kg will fall faster (up to max
of 9.9ms-1). What must be remembered however, is that the
net is extremely bouncy, and will absorb most of the impact,
greatly reducing the risk of injury. This works since it
stretches, and exerts the force over a long period. Since
the impulse needed to stop the descent is the same, and
is given by I = Ft, you can either have a large force over
a short time, or a smaller force over a long period. The
net adopts the second option, reducing the force on the
falling flyer to a minimum. Even if you would not want to
fall to the ground at 5m/s, this would be a very acceptable
speed for falling into the net.
If we briefly look at the forces on the
operator, we see that the force upwards is greater than
their weight, therefore there must be an upwards acceleration.
In fact it is quite normal to see the operator pulled up
off the ground by the force of the other person falling
on the other end. The operator then lets the rope slip through
his hands occasionally so he is not pulled too high.
The
operation of the safety lines is best demonstrated with
a diagram. Basically, an operator stands on the ground next
to the trapeze. The lines are clipped to the belt at the
board, and allow the flyer to swing with them, and even
be caught (they travel along the trapeze with the flyer).
The lines leave the flyer's belt on each side, are looped
over two pulleys at the top of the trapeze, and recombine
as one, thicker rope, which the operator holds. During normal
operation, the operator pulls the rope to take up excess
slack. In the event of a mistake, during which the flyer
falls, the operator pulls hard on the rope to exert a force
upwards on the flyer, slowing his descent. It should be
stressed that there is no mechanical advantage in the lines,
that is to say that any force exerted on one end of the
lines will be transmitted to the other end. 
Case
2: Using same assumptions from case 1, except flyer
has a mass of only 50kg (child) and the operator has a mass
of 70kg.