skimming this thread made my dumb brain explode.
That's OK, Lanie. Other than Mathman, who is a real expert at this stuff, I don't think too many people are following this. But the final results should be pretty understandable, even to those who don't get all the derivations.
So we have our equation for the total energy of Evan’s jump :
E = A t^2 + B / t^2 ……….. where A and B are groups of constants. We know that the required energy goes to infinity as the time in the air ( t ) goes to zero or infinity. So we must find the value of t than requires the minimum energy. To find this time, we use what is known as a “derivative”. This is a function that relates how another function changes over time.
So if E = A t^2 + B / t^2 …. then ….. dE/dt = 2 A t – 2 B / t^3 ….. Now we find the value of t that makes dE/dt = 0.
dE/dt = 0 = 2 A t – 2 B / t^3 …. so …. 2 A t = 2 B / t^3 ... A t = B / t^3…. A t^4 = B
t^4 = B / A ……. therefore ………. t = ( B / A ) ^ (1/4)
Plugging in terms for A and B …… t = ( 16 I π^2 N^2 / m g^2 ) ^ (1/4)
This is the time Evan must spend in the air to complete his 5 rotations with a minimum expenditure of energy. Any more or less time, and the energy requirement goes up.
Plugging in the actual values, time ( t ) = 0.8186 seconds. From this, all the other unknowns can be calculated.
Evan’s vertical speed at take off, Vy = ½ g t = 4.015 m/s
Maximum height of jump, h = Vy^2 / 2 g = 0.822 meters
Angular velocity, ω = 2 π N / t = 38.4 radians per second or 366 RPM.
But what we’re really interested is the energy. Recall the equation as a function of time :
E = Et + Er = 1/8 m g^2 t^2 + 2 I π^2 N^2 / t^2 ………… plugging actual values
E = 586.2 J + 586.2 J = 1172.4 J
What is interesting here is that when Evan does his quintuple jump at minimum energy, the energy of his vertical jump (Et) exactly equals the energy of his rotation (Er).
One more point, then I’ll shut up. How much more energy is required for a quintuple than a quadruple? Doing all the math for N = 4, we get an energy requirement of 938.0 J, which is an increase of 25.0 %, which exactly matches the increase in number of jumps. Finally, we get an intuitive result.
