For most unpowered aircraft, the maximum flight time is variable, limited by available daylight hours, aircraft design (performance), weather conditions, aircraft potential energy, and pilot endurance. Therefore, the range equation can only be calculated exactly for powered aircraft. It will be derived for both propeller and jet aircraft. If the total mass ${\displaystyle W}$  of the aircraft at a particular time ${\displaystyle t}$  is:

The rate of change of aircraft mass with distance ${\displaystyle R}$  is

It follows that the range is obtained from the definite integral below, with ${\displaystyle t_{1}}$  and ${\displaystyle t_{2}}$  the start and finish times respectively and ${\displaystyle W_{1}}$  and ${\displaystyle W_{2}}$  the initial and final aircraft masses

Specific range edit

The term ${\textstyle {\frac {V}{F}}}$ , where ${\displaystyle V}$  is the speed, and ${\displaystyle F}$  is the fuel consumption rate, is called the specific range (= range per unit mass of fuel; S.I. units: m/kg). The specific range can now be determined as though the airplane is in quasi-steady-state flight. Here, a difference between jet and propeller-driven aircraft has to be noticed.

Propeller aircraft edit

With propeller-driven propulsion, the level flight speed at a number of airplane weights from the equilibrium condition ${\displaystyle P_{a}=P_{r}}$  has to be noted. To each flight velocity, there corresponds a particular value of propulsive efficiency ${\displaystyle \eta _{j}}$  and specific fuel consumption ${\displaystyle c_{p}}$ . The successive engine powers can be found:

The corresponding fuel weight flow rates can be computed now:

Thrust power is the speed multiplied by the drag, is obtained from the lift-to-drag ratio:

The range integral, assuming flight at a constant lift to drag ratio, becomes

To obtain an analytic expression for range, it has to be noted that specific range and fuel weight flow rate can be related to the characteristics of the airplane and propulsion system; if these are constant:

Electric aircraft edit

An electric aircraft with battery power only will have the same mass at takeoff and landing. The logarithmic term with weight ratios is replaced by the direct ratio between ${\displaystyle W_{\text{battery}}/W_{\text{total}}}$ 

Jet propulsion edit

The range of jet aircraft can be derived likewise. Now, quasi-steady level flight is assumed. The relationship ${\displaystyle D={\frac {C_{D}}{C_{L}}}W}$  is used. The thrust can now be written as:

Jet engines are characterized by a thrust specific fuel consumption, so that rate of fuel flow is proportional to drag, rather than power.

Using the lift equation,

Inserting this into (1) and assuming only ${\displaystyle W}$  is varying, the range (in kilometers) becomes:

When cruising at a fixed height, a fixed angle of attack and a constant specific fuel consumption, the range becomes:

Cruise/climb (Breguet range equation) edit

For jet aircraft operating in the stratosphere (altitude approximately between 11 and 20 km), the speed of sound is approximately constant, hence flying at a fixed angle of attack and constant Mach number requires the aircraft to climb (as weight decreases due to fuel burn), without changing the value of the local speed of sound. In this case:

Or ${\textstyle R={\frac {aM}{gc_{T}}}{\frac {C_{L}}{C_{D}}}\ln {\frac {W_{1}}{W_{2}}}}$ , also known as the Breguet range equation after the French aviation pioneer, Louis Charles Breguet.

Modified Breguet range equation edit

It is possible to improve the accuracy of the Breguet range equation by recognizing the limitations of the conventionally used relationships for fuel flow:

In the Breguet range equation, it is assumed that the thrust specific fuel consumption is constant as the aircraft weight decreases. This is generally not a good approximation because a significant portion (e.g. 5% to 10%) of the fuel flow does not produce thrust and is instead required for engine "accessories" such as hydraulic pumps, electrical generators, and bleed air powered cabin pressurization systems.

This can be accounted for by extending the assumed fuel flow formula in a simple way where an "adjusted" virtual aircraft gross weight ${\displaystyle {\widehat {W}}}$  is defined by adding a constant additional "accessory" weight ${\displaystyle W_{\text{acc}}}$ .

Here, the thrust specific fuel consumption has been adjusted down and the virtual aircraft weight has been adjusted up to maintain the proper fuel flow while making the adjusted thrust specific fuel consumption truly constant (not a function of virtual weight).

Then, the modified Breguet range equation becomes

The above equation combines the energy characteristics of the fuel with the efficiency of the jet engine. It is often useful to separate these terms. Doing so completes the nondimensionalization of the range equation into fundamental design disciplines of aeronautics.

• ${\displaystyle Z_{f}}$  is the geopotential energy height of the fuel (km)
• ${\displaystyle {\frac {aM}{Z_{f}g{\widehat {c}}_{T}}}}$  is the overall propulsive efficiency (nondimensional) ${\displaystyle \eta _{\text{eng}}}$ 
• ${\displaystyle {\frac {C_{L}}{C_{D}}}}$  is the aerodynamic efficiency (non-dimensional) ${\displaystyle \eta _{\text{aero}}}$ 
• ${\displaystyle \ln {\frac {{\widehat {W}}_{1}}{{\widehat {W}}_{2}}}}$  is the structural efficiency (non-dimensional) ${\displaystyle \eta _{\text{struc}}}$ 

giving the final form of the theoretical range equation (not including operational factors such as wind and routing)

The geopotential energy height of the fuel is an intensive property. A physical interpretation is a height that a quantity of fuel could lift itself in the Earth's gravity field (assumed constant) by converting its chemical energy into potential energy. ${\displaystyle Z_{f}}$  for kerosene jet fuel is 2,376 nautical miles (4,400 km) or about 69% of the Earth's radius.

There are two useful alternative ways to express the structural efficiency

As an example, with an overall engine efficiency of 40%, a lift-to-drag ratio of 18:1, and a structural efficiency of 50%, the cruise range would be

Operational Considerations edit

The range equation may be further extended to consider operational factors by including an operational efficiency ("ops" for flight operations)

The operational efficiency ${\displaystyle \eta _{ops}}$  may be expressed as the product of individual operational efficiency terms. For example, average wind may be accounted for using the relationship between average GroundSpeed (GS), True AirSpeed (TAS, assumed constant), and average HeadWind (HW) component.

Routing efficiency may be defined as the great-circle distance divided by the actual route distance

Off-nominal temperatures may be accounted for with a temperature efficiency factor ${\displaystyle \eta _{\text{temp}}}$  (e.g. 99% at 10 deg C above International Standard Atmosphere (ISA) temperature).

All of the operational efficiency factors may be collected into a single term

While the peak value of a specific range would provide maximum range operation, long-range cruise operation is generally recommended at a slightly higher airspeed. Most long-range cruise operations are conducted at the flight condition that provides 99 percent of the absolute maximum specific range. The advantage of such operation is that one percent of the range is traded for three to five percent higher cruise speed.^[3]

• Flight length
• Flight distance record
• Endurance (aeronautics)
• Specific energy
• Geopotential height
• Energy conversion efficiency
• Jet engine performance
• Lift-to-drag ratio
• Fuel fraction, Mass ratio
• Newton's laws of motion

• Anderson, David W. & Scott Eberhardt (2010). Understanding Flight, Second Edition. McGraw-Hill. ISBN 978-0-07-162697-2 (eBook) ISBN 9780071626965 (print)
• Marchman, James, III (2021). Aerodynamics and Aircraft Performance. Blacksburg: VA: University Libraries at Virginia Tech. CC BY 4.0.
• Martinez, Isidoro. Aircraft propulsion. "Range and endurance: Breguet's equation", page 25.
• Ruijgrok, G. J. J. Elements of Airplane Performance. Delft University Press. ^{[page needed]} ISBN 9789065622044.
• "Prof. Z. S. Spakovszky". Thermodynamics and Propulsion, "Chapter 13.3 Aircraft Range: the Breguet Range Equation". MIT turbines, 2002