<< Chapter < Page Chapter >> Page >
The photo shows gases releasing from a power plant.
The heat exhausted from a nuclear power plant goes to the cooling towers, where it is released into the atmosphere.

Heat engines operate by carrying a working substance through a cycle. In a steam power plant, the working substance is water, which starts as a liquid, becomes vaporized, is then used to drive a turbine, and is finally condensed back into the liquid state. As is the case for all working substances in cyclic processes, once the water returns to its initial state, it repeats the same sequence.

For now, we assume that the cycles of heat engines are reversible, so there is no energy loss to friction or other irreversible effects. Suppose that the engine of [link] goes through one complete cycle and that Q h , Q c , and W represent the heats exchanged and the work done for that cycle. Since the initial and final states of the system are the same, Δ E int = 0 for the cycle. We therefore have from the first law of thermodynamics,

W = Q Δ E int = ( Q h Q c ) 0 ,

so that

W = Q h Q c .

The most important measure of a heat engine is its efficiency ( e )    , which is simply “what we get out” divided by “what we put in” during each cycle, as defined by e = W out / Q in .

With a heat engine working between two heat reservoirs, we get out W and put in Q h , so the efficiency of the engine is

e = W Q h = 1 Q c Q h .

Here, we used [link] , W = Q h Q c , in the final step of this expression for the efficiency.

A lawn mower

A lawn mower is rated to have an efficiency of 25.0 % and an average power of 3.00 kW. What are (a) the average work and (b) the minimum heat discharge into the air by the lawn mower in one minute of use?

Strategy

From the average power—that is, the rate of work production—we can figure out the work done in the given elapsed time. Then, from the efficiency given, we can figure out the minimum heat discharge Q c = Q h ( 1 e ) with Q h = Q c + W .

Solution

  1. The average work delivered by the lawn mower is
    W = P Δ t = 3.00 × 10 3 × 60 × 1.00 J = 180 kJ .
  2. The minimum heat discharged into the air is given by
    Q c = Q h ( 1 e ) = ( Q c + W ) ( 1 e ) ,

    which leads to
    Q c = W ( 1 / e 1 ) = 180 × ( 1 / 0.25 1 ) kJ = 540 kJ .

Significance

As the efficiency rises, the minimum heat discharged falls. This helps our environment and atmosphere by not having as much waste heat expelled.

Got questions? Get instant answers now!

Summary

  • The work done by a heat engine is the difference between the heat absorbed from the hot reservoir and the heat discharged to the cold reservoir, that is, W = Q h Q c .
  • The ratio of the work done by the engine and the heat absorbed from the hot reservoir provides the efficiency of the engine, that is, e = W / Q h = 1 Q c / Q h .

Conceptual questions

Explain in practical terms why efficiency is defined as W / Q h .

Got questions? Get instant answers now!

Problems

An engine is found to have an efficiency of 0.40. If it does 200 J of work per cycle, what are the corresponding quantities of heat absorbed and rejected?

Got questions? Get instant answers now!

In performing 100.0 J of work, an engine rejects 50.0 J of heat. What is the efficiency of the engine?

0.667

Got questions? Get instant answers now!

An engine with an efficiency of 0.30 absorbs 500 J of heat per cycle. (a) How much work does it perform per cycle? (b) How much heat does it reject per cycle?

Got questions? Get instant answers now!

It is found that an engine rejects 100.0 J while absorbing 125.0 J each cycle of operation. (a) What is the efficiency of the engine? (b) How much work does it perform per cycle?

a. 0.556; b. 125.0 J

Got questions? Get instant answers now!

The temperature of the cold reservoir of the engine is 300 K. It has an efficiency of 0.30 and absorbs 500 J of heat per cycle. (a) How much work does it perform per cycle? (b) How much heat does it reject per cycle?

Got questions? Get instant answers now!

The Kelvin temperature of the hot reservoir of an engine is twice that of the cold reservoir, and work done by the engine per cycle is 50 J. Calculate (a) the efficiency of the engine, (b) the heat absorbed per cycle, and (c) the heat rejected per cycle.

a. 0.50; b. 100 J; c. 50 J

Got questions? Get instant answers now!

A coal power plant consumes 100,000 kg of coal per hour and produces 500 MW of power. If the heat of combustion of coal is 30 MJ/kg, what is the efficiency of the power plant?

Got questions? Get instant answers now!
Practice Key Terms 4

Get Jobilize Job Search Mobile App in your pocket Now!

Get it on Google Play Download on the App Store Now




Source:  OpenStax, University physics volume 2. OpenStax CNX. Oct 06, 2016 Download for free at http://cnx.org/content/col12074/1.3
Google Play and the Google Play logo are trademarks of Google Inc.

Notification Switch

Would you like to follow the 'University physics volume 2' conversation and receive update notifications?

Ask