Analytical velocity hodograph of projectile motion under polynomial drag

Abstract: Velocity hodographs are of importance in weather analysis. A historically important case is the hodograph in the Kepler problem. Here, we explore the analytical solutions for the velocity hodograph for the projectile trajectories under a polynomial, in velocity, hydrodynamic dissipation. General solutions in terms of hypergeometric functions are found for odd powers in monomial terms. The even powers have analytical hodographs but we do not find a general expression for them. For completeness we include the co… Show more

“…In [6][7][8][9][15][16][17][18][19][20][21][22][23][24][25][26][27][28][29][30][31][32][33][34] it is obtained, by means of approximate procedures or through computational tools, the trajectory of the particle, the time of flight, the maximum height, the range, the curve of safety or the path length. On the other hand, in the last two decades, the interest in the projectile motion with a retarding force proportional to the velocity has increased because it is a good scenario to apply the Lambert W function since it is necessary to solve transcendental equations in this problem.…”

Some remarks on projectile motion with a linear resistance force

“…In [6][7][8][9][15][16][17][18][19][20][21][22][23][24][25][26][27][28][29][30][31][32][33][34] it is obtained, by means of approximate procedures or through computational tools, the trajectory of the particle, the time of flight, the maximum height, the range, the curve of safety or the path length. On the other hand, in the last two decades, the interest in the projectile motion with a retarding force proportional to the velocity has increased because it is a good scenario to apply the Lambert W function since it is necessary to solve transcendental equations in this problem.…”

Some remarks on projectile motion with a linear resistance force