The immediate incentive for this investigation is the upcoming (Oct 2012) attempt
by the Red Bull team to drop a parachutist from a balloon at high altitude.
This should easily set a new speed record for a falling human (not in a vehicle)
and there is considerable speculation as to whether the skydiver can go supersonic
during the descent.
I plan to update this page over the next few weeks to make it more readable,
but I wanted to have my predictions out there *before*, rather than
after the experimental investigation.

The charts are in SVG format and can be displayed with Firefox, Chrome, Safari, Opera, or Edge browsers. They do not show up on IE8 or earlier.

As a background for investigating this possibility, I have prepared some charts illustrating the descent of familiar falling objects of various sizes and density. To keep things simple, I have made these calculations for smooth spheres. The calculation of a falling sphere is straightforward, but the non-linearity of the aerodynamic drag force and the variable density of the atmosphere make an analytical solution impossible; numerical methods must be used. I have a separate page describing the computational model used and I invite comments from folks who know more than I do about the drag force on a sykdiver fitted out with a flight suit for an air temperature of -60F.

I have chosen five spheres for the calculation: a ping-pong ball, a BB, a baseball, a bowling ball, and a sphere with the same mass and density as the skydiver with all of his flight gear for the descent. All five begin at a specified altitude with zero velocity and the differential equations of flight are solved numerically until the altitude reaches zero. In addition, it is easy to compute the trajectory of a body falling in vacuum from the same initial altitude and it is useful to see just how much difference this makes.

To begin, the calculations are made from a relatively low altitude of 100 meters, something like a 15-20 story building. The legend is red for baseball; orange for ping-pong; yellow for BB; blue for bowling ball; green for human; black for any ball falling in vacuum. I will get the legend on the figures real soon now.

Looking at the time history of altitude chart, the ping-pong ball requires 12.5 seconds to fall 100 meters; the BB needs 6 seconds; the baseball 5.2 seconds; the other larger and heavier objects require 5 seconds. This is very close to the vacuum value of sqrt(200/9.8) or 4.886 seconds.>/p>

Looking at chart of the time history of velocity, we see that the ping-pong
ball and the BB accelerate to a limiting value and then maintain this velocity
until they strike the ground.
This is often referred to as the **terminal velocity** of the object.
The velocity of the baseball (in red) will soon reach a limiting value, but to
do this will require an initial height of more than 100 meters.

Sometimes it is instructive to plot altitude vs. velocity. With an initial altitude of 100 meters, the heavier objects are still accelerating (the trajectories are curved) when the altitude goes to zero. One may also plot the Mach number at each altitude. Remember, the speed of sound varies with altitude, so we must compute the velocity of sound along with the velocity of the object to make this calculation.

Most of the objects we ordinarily deal with fall with essentially the same trajectory. The exceptions are small, lightweight objects such as feathers, ballons, sheets of paper, etc. Almost all of our experience with falling objects lies in this range of 100 meters or less, usually much less.

If we repeat these calculations with a higher altitude, some differences do appear. Let's use an initial altitude of 1000 meters, slightly more that the very tallest buildings.

The heaviest and densest objects now need a little more than three times the time to fall ten times the distance (sqrt(10)=3.16). The ping-pong ball takes xxx seconds to fall 1000 meters, compared to yyy for 100 meters.

Now, starting from 10000 meters, or 10 km.
This is approximately the height of a cruising jet transport.
Now, we can notice a difference in the plots.
The curves of velocity versus time now accelerate to a peak value and then slowly
decrease.
If you look carefully at the curves for lower altitudes, they also show this
property, but the effect is small.
This is why I avoid the term *terminal velocity* in these studies.

From this height, the human does not reach supersonic speeds. It appears that we need a much higher initial altitude.

Now, from 100 km, the height chosen for the 'edge of space' by the X-Prize committee. From this height, all of the balls and the human easily achieve supersonic speeds.

Now we can see that it is easy to go supersonic in free-fall, provided that you start with a sufficiently high initial altitude. And we can see that 10 kilometers is not high enough, but 100 kilometers is more than enough. As they say, we should 'cut to the chase' and see if the 36 kilometers chosen by the Red Bull team will be high enough to get this velocity. If not, then it is going to be very difficult to get much higher with balloon technology as the atmosphere is getting very thin and the upward bouyant force is getting small.

Repeating the calculations with an initial altitude of 36 kilometers.

It looks as if Felix should go supersonic at about 30km, which is about 40 seconds into the descent, ten seconds later hitting a maximum Mach number of 1.28 at 24km altitude, returning to subsonic speed at 17km at 85 seconds into the flight. These calculations show a total flight time of 150 seconds, but this does not model the final phase of the descent where the parachute is deployed.