Terminal velocity
Terminal velocity is the maximum velocity attainable by an object as it falls through a fluid. It occurs when the sum of the drag force and the buoyancy is equal to the downward force of gravity acting on the object. Since the net force on the object is zero, the object has zero acceleration.
In fluid dynamics, an object is moving at its terminal velocity if its speed is constant due to the restraining force exerted by the fluid through which it is moving.
As the speed of an object increases, so does the drag force acting on it, which also depends on the substance it is passing through. At some speed, the drag or force of resistance will equal the gravitational pull on the object. At this point the object ceases to accelerate and continues falling at a constant speed called the terminal velocity. An object moving downward faster than the terminal velocity will slow down until it reaches the terminal velocity. Drag depends on the projected area, here, the object's cross-section or silhouette in a horizontal plane. An object with a large projected area relative to its mass, such as a parachute, has a lower terminal velocity than one with a small projected area relative to its mass, such as a bullet. In general, for the same shape and material, the terminal velocity of an object increases with size. This is because the downward force is proportional to the cube of the linear dimension, but the air resistance is approximately proportional to the cross-section area which increases only as the square of the linear dimension. For very small objects such as dust and mist, the terminal velocity is easily overcome by convection currents which prevent them from reaching the ground and hence they stay suspended in the air for indefinite periods. Air pollution and fog are examples of this.
Examples
Based on wind resistance, for example, the terminal speed of a skydiver in a belly-to-earth free fall position is about. This speed is the asymptotic limiting value of the speed, and the forces acting on the body balance each other more and more closely as the terminal speed is approached. In this example, a speed of 50% of terminal speed is reached after only about 3 seconds, while it takes 8 seconds to reach 90%, 15 seconds to reach 99% and so on.Higher speeds can be attained if the skydiver pulls in his or her limbs. In this case, the terminal speed increases to about 320 km/h, which is almost the terminal speed of the peregrine falcon diving down on its prey. The same terminal speed is reached for a typical.30-06 bullet dropping downwards—when it is returning to the ground having been fired upwards, or dropped from a tower—according to a 1920 U.S. Army Ordnance study.
Competition speed skydivers fly in a head-down position and can reach speeds of ; the current record is held by Felix Baumgartner who jumped from a height of and reached, though he achieved this speed at high altitude, where extremely thin air presents less drag force.
The biologist J. B. S. Haldane wrote,
Physics
Using mathematical terms, terminal speed—without considering buoyancy effects—is given bywhere
- represents terminal velocity,
- is the mass of the falling object,
- is the acceleration due to gravity,
- is the drag coefficient,
- is the density of the fluid through which the object is falling, and
- is the projected area of the object.
Buoyancy effects, due to the upward force on the object by the surrounding fluid, can be taken into account using Archimedes' principle: the mass has to be reduced by the displaced fluid mass, with the volume of the object. So instead of use the reduced mass in this and subsequent formulas.
The terminal speed of an object changes due to the properties of the fluid, the mass of the object and its projected cross-sectional surface area.
Air density increases with decreasing altitude, at about 1% per . For objects falling through the atmosphere, for every of fall, the terminal speed decreases 1%. After reaching the local terminal velocity, while continuing the fall, speed decreases to change with the local terminal speed.
Derivation for terminal velocity
Using mathematical terms, defining down to be positive, the net force acting on an object falling near the surface of Earth is :with v the velocity of the object as a function of time t.
At equilibrium, the net force is zero and the velocity becomes the terminal velocity :
Solving for Vt yields
| Derivation of the solution for the velocity v as a function of time t |
The drag equation is—assuming ρ, g and Cd to be constants: Although this is a Riccati equation that can be solved by reduction to a second-order linear differential equation, it is easier to separate variables. A more practical form of this equation can be obtained by making the substitution. Dividing both sides by m gives The equation can be re-arranged into Taking the integral of both sides yields After integration, this becomes or in a simpler form with arctanh the inverse hyperbolic tangent function. Alternatively, with tanh the hyperbolic tangent function. Assuming that g is positive, and substituting α back in, the speed v becomes As time tends to infinity, the hyperbolic tangent tends to 1, resulting in the terminal speed Terminal speed in a creeping flowFor very slow motion of the fluid, the inertia forces of the fluid are negligible in comparison to other forces. Such flows are called creeping flows and the condition to be satisfied for the flows to be creeping flows is the Reynolds number,. The equation of motion for creeping flow is given bywhere
where the Reynolds number,. The expression for the drag force given by equation is called Stokes' law. When the value of is substituted in the equation, we obtain the expression for terminal speed of a spherical object moving under creeping flow conditions: where is the density of the object. ApplicationsThe creeping flow results can be applied in order to study the settling of sediments near the ocean bottom and the fall of moisture drops in the atmosphere. The principle is also applied in the falling sphere viscometer, an experimental device used to measure the viscosity of highly viscous fluids, for example oil, paraffin, tar etc.Terminal velocity in the presence of buoyancy forceWhen the buoyancy effects are taken into account, an object falling through a fluid under its own weight can reach a terminal velocity if the net force acting on the object becomes zero. When the terminal velocity is reached the weight of the object is exactly balanced by the upward buoyancy force and drag force. That iswhere
where
In equation, it is assumed that the object is denser than the fluid. If not, the sign of the drag force should be made negative since the object will be moving upwards, against gravity. Examples are bubbles formed at the bottom of a champagne glass and helium balloons. The terminal velocity in such cases will have a negative value, corresponding to the rate of rising up. |