At what projection angle will the range of a projectile equal to 2 times its maximum height?

Answer 1

75.96... degrees from the horizontal.

Let the projectile be launched with speed v at an angle θ degrees above the horizontal. Then its vertical speed component is v sin θ, and its horizontal component is v cos θ.

The time of flight is t = 2 v sin θ / g, so that the range R is given by

R = v t cos θ = 2 v^2 sin θ cos θ / g.

The maximum height is given by H = (v sin θ)^2 / (2 g).

(You may think of this is as merely an application of the standard result that, dropping from rest in the second half of the flight, the downward speed u = v sin θ must be related to the downward acceleration a and distance d travelled by u^2 = 2ad. In this context, where a = g and d = H, that is equivalent to the conservation of kinetic plus potential energy, of course.)

If R = H, then v^2 sin^2 θ / (2 g) = 2 v^2 sin θ cos θ / g.

Therefore sin θ / cos θ = tan θ = 4.

Thus θ = arctan (4) = 75.96... degrees.

Live long and prosper.

EDIT : Note that the following answer contains a small error --- the formula presented for the maximum height H lacks the divisor 2 that it should properly have. Only with its incusion could one obtain the general result that

tan θ = 4H/R.