Jet force

Thrust, Lift, Weight, and Drag

The jet force can be divided into components. The "forward" component of this force is generally referred to as thrust. The upward component of jet force is referred to as lift. There are also two other forces that impact motion of aircraft. Drag, which is also referred to as air resistance, is the force that opposes motion. As such, it acts against both components of the jet force (both the thrust and the lift). The fourth and final force is the weight itself, which acts directly downward.

Thrust

To analyze thrust, we take a mathematical perspective.

1. First, an aircraft takes off at some angle with respect to the ground. For a rocket traveling straight "up", this angle would be 90°, or at least close to 90°. For airplanes and most other aircraft, this angle will be much less, generally ranging from 0° to 60°. We shall define this angle as θ.
2. θ is constantly changing as the aircraft moves around. At any given moment, however, the cosine of this angle θ will give us the component of the force that is acting in the forward direction. Multiplying the total force by this cosine of θ would yield the thrust:

T h r u s t = J e t F o r c e ∗ cos ⁡ θ

Because θ ranges from 0° to 90°, and the cosine of any angle in this range is 0 ≤ cosθ≤ 1, the thrust will always be either less than or equal to the jet force- as expected, as the thrust is a component of the jet force.

Lift

Similar to our analysis of thrust, we begin with a mathematical look:

1. We define angle θ the same way we did in step 1 for thrust. Again, this angle θ is different at any given time.
2. For lift, however, we are looking for the vertical component, rather than the forward component. The sine of angle θ will give us the component of the force acting in vertical component. Multiplying the jet force by the sine of θ will yield the lift:

L i f t = J e t F o r c e ∗ sin ⁡ θ

Similar to cosine, the sine of an angle ranging from 0° to 90° will always between at least zero and at most one. As such, the lift will also be less than the jet force. Of jet force, lift, and thrust, we can find any one of these if the other two are given using the distance formula. In this case, that would be:

√ ( J e t F o r c e ) 2 = √ ( T h r u s t 2 + L i f t 2 )

As such, jet force, thrust, and lift are inherently linked.

Drag

Drag, or air resistance, is a force that opposes motion. Since the thrust is a force that provides "forward motion" and, lift one that produces "upward motion", the drag opposes both of these forces. Air resistance is friction between the air itself and the moving object (in this case the aircraft). The calculation of air resistance is far more complicated than that of thrust and lift- it has to do with the material of the aircraft, the speed of the aircraft, and other variable factors. However, rockets and airplanes are built with materials and in shapes that minimize drag force, maximizing the force that moves the aircraft upward/forward.

Weight

Weight is the downward force that the lift must overcome to produce upward movement. On earth, weight is fairly easy to calculate:

W e i g h t = m ∗ g

In this equation, m represents the mass of the object and g is the acceleration that is produced by gravity. On earth, this value is approximately 9.8 m/s squared. When the force for lift is greater than the force of weight, the aircraft accelerates upwards.

Analysis with momentum

To calculate the speed of the vessel due to the jet force itself, analysis of momentum is necessary. Conservation of momentum states the following:

m 1 v 1 + m 2 v 2 = m 1 v 1 f + m 2 v 2 f

In this situation, m1 represents the mass of the gas in the propulsion system, v1 represents the initial speed of this gas, m2 represents the mass of the rocket, and v2 represents the initial velocity of the rocket. On the other end of the equation, v1f represents the final velocity of the gas and v2f represents the final velocity of the rocket. Initially, both the gas in the propulsion system and the rocket are stationary, leading to v1 and v2 equaling 0. As such, the equation can be simplified to the following:

0 = m 1 v 1 f + m 2 v 2 f

After some more simple algebra, we can calculate that v2 (the velocity of the rocket) is the following:

v 2 f = − ( m 1 v 1 ) / m 2

This gives us the velocity of the aircraft right after it takes off. Because we know all forces acting on it from this point on, we can calculate net acceleration using Newton's second law. Given the velocity that the aircraft takes off with and the acceleration at any point, the velocity can also be calculated at any given point.