**Chapter 8**

**Prop Aircraft Basic Performance**

The basics:

In turbojet aircraft the engine produces thrust directly.

In prop aircraft, the powerplant does not produce thrust directly.

The engine produces power which turns the prop.

The prop is what produces the thrust.

## So What about The Fuel Question

Fuel consumption is related to power not thrust.

So power becomes the determining factor in endurance and range.

## Review of Terms

A force may be considered to be pressure, tension, or weight and is usually expressed in pounds.

Work is when you use a force to move something

so force x dis = work

## Horse Power

For example you have an airplane which needs to be pulled up to the gas pumps 100 feet away, lets say on level ground and the plane weighs 2200 lbs..

If you attached a scale to the plane and found it took 55 lbs. of force once you got it rolling, 55 x 100 would result in 5500 ft-lbs. of work was done to get the plane to the gas pumps.

## Horse Power

The amount of work has nothing to do with time. It could take all week or a hour and still only 5500ft-lbs. of work is done.

However Power is defined as a time rate of work.

If you pulled the plane to the gas pumps in 1 second, you would be exerting 5500 ft-lb./sec.

## Horse Power

Lets say it took 10 sec to do the job. The power would be work/time or 5500/10 = 550 ft-lb/sec.

The most common measure of power is horsepower which happens to be a power of 550 ft-lbs/sec.

So in the example, you would have to exert 1 hp for 10 sec to do the job.

## Power Required Curve

The Thrust required curve or drag curve must be converted into power required using this formula:

Induced drag varies inversely as V squared

Induced power varies inversely of the V ratio

Parasite drag varies directly as V squared

Ppower varies directly as the V ratio is cubed

## Power Required Curve

Total power required is Ipower + Ppower

The power required curve is flatter in the low speed region than the T required but steeper in the high speed region.

The intersection of the Ppower and Ipower curves is the L/Dmax

However the min power required is usually in a different place with the L/D max point being tangent to a line from the point of origin.

## Principles of Propulsion

The principles of propulsion are about the same when talking about them in the last chapter.

Newtons 2nd law F=ma

Newtons 3rd law action reaction

## Principles of Propulsion

Propeller aircraft process large quantities of air with only a small acceleration of the air when compared to turbojets.

This makes them more efficient than turbojets.

## Power Available

There are 4 types of horsepower:

- BHP is the horsepower measured at the crankshaft or turbine shaft named after the prony brake.

Now they use a dynamometer or dyno.

## Power Available

More BHP is required than THP by the plane at any speed because of the loss in efficiency by the prop.

Note on the curve at max speed, where the top of the curves meet at about 165 kts, if you divide 220 by 250 you get a prop efficiency of 88%.

## Power Available

- Shaft horsepower is measured at the prop shaft.

Some engines have reduction gearing to slow the prop relative to the engine

There is a resultant loss resulting in shaft horsepower.

## Power Available

- Thrust horsepower is the useable horsepower developed by the prop.

It is less than SHP because the prop is not 100% efficient.

There is a difference between thrust and thrust horsepower

You must use a formula to convert thrust horsepower to thrust.

The formula for doing this is:

## Power Available

- Equivalent shaft horsepower is the shaft horsepower of a turboprop + the thrust output of the exhaust section of the gas turbine

Converted into thrust horsepower units of course.

## Types of Props

- Fixed pitch no movement
- Adjustable pitch manually done on the ground
- Controllable pitch usually either high or low
- Constant speed prop governor 92% efficient

## Power Available vs Velocity

Brake horsepower and shaft horsepower do not vary greatly with changes in velocity for normal installations.

Some plane manufactures us the extra velocity to ram charge the intake and thus make a poor mans turbo.

## Power Available vs Velocity

Thrust horsepower does vary with velocity.

This is because prop efficiency varies with velocity.

## Variations with Power and Altitude

3 types of powerplants must be considered:

- turboprops

As a rule, as altitude is increased the temp drop is not enough to offset the loss in density and power is decreased.

A corresponding fuel flow reduction is experienced as well.

## Variations with Power and Altitude

- super or turbocharged piston engines

These engines are sometimes called altitude engines or critical altitude engines.

The brake specific fuel consumption is the fuel flow related to the brake horsepower of the engine.

It is generally lowest in the 40 to 60% power range and can be found by using the equation:

## Variations with Power and Altitude

- unsupercharged piston engines

These engines loose power as they go up in altitude because of the less dense air.

A decrease in horsepower of 50% or more may be possible at altitudes of 18 to 19,000 feet.

## Straight and Level

For straight and level, max velocity will occur at the intersection of the full power-available curve and the power required curve

## Climb Performance

The different climb vectors all still apply as previously covered in jet performance

Vx or max climb angle is achieved when excess thrust is at a max.

In order to pin down an airspeed, one must calculate the sine of the corresponding climb angle then plot it against the velocity.

## Climb Performance

Dole points out that the example shows max climb at stall for the prop whereas the jet is at L/Dmax

Vy or max rate of climb occurs at the velocity where max excess power occurs.

In other words the greatest difference between horsepower available and horsepower required.

## Endurance

Remember to obtain max endurance the min fuel flow is required to stay airborne the max amount of time.

Minimum power required should be the point of minimum fuel flow, this is not L/Dmax but at the point where ________ is at a max.

## Specific Range

Remember to obtain max distance, the specific range must be at a max the equation is:

The tangent line drawn to the curve should indicate the max specific range velocity.

For a prop aircraft this is L/Dmax

## 2 things occur at L/Dmax for a prop plane:

- Max glide ratio
- Max range

## Wind

Wind effects specific range the same way as discussed earlier in the jet performance chapter.

## Total Range

Total range is the same as for the Jet performance

Find the average specific range and multiply it by the fuel burned.

pg94 Dole