TITLE.PM5

(Ann) #1

616 ENGINEERING THERMODYNAMICS


dharm
\M-therm\Th13-1.pm5


Solution. Bore of the engine, D = 250 mm = 0.25 m
Stroke of the engine, L = 375 mm = 0.375 m
Clearance volume, Vc = 0.00263 m^3
Initial pressure, p 1 = 1 bar
Initial temperature, T 1 = 50 + 273 = 323 K
p (bar)

25 3

4

1

Adiabatics
2

1

V V(m )^3
VC S

Fig. 13.6
Maximum pressure, p 3 = 25 bar
Swept volume, Vs = π/4 D^2 L = π/4 × 0.25^2 × 0.375 = 0.0184 m^3

Compression ratio, r =
VV
V

sc
c

+ =0 0184 0 00263+
0 00263

..

. = 8.
(i)Air standard efficiency :
The air standard efficiency of Otto cycle is given by
ηOtto = 1 –
1
()rγ−^1 = 1 –


1
() 8 14 1. −
= 1 –
1
() 804.
= 1 – 0.435 = 0.565 or 56.5%. (Ans.)
(ii)Mean effective pressure, pm :
For adiabatic (or isentropic) process 1-2
p 1 V 1 γ = p 2 V 2 γ

or p 2 = p 1
V
V


1
2

F
HG

I
KJ

γ
= 1 × (r)1.4 = 1 × (8)1.4 = 18.38 bar

∴ Pressure ratio, rp =
p
p

3
2

25
18.38

= = 1.36
The mean effective pressure is given by

pm =

pr r r
r

1 p

(^111) 14 1
11
18 8 1 361
4181
[( )( )]
()()
[{( ) } ( )]
()()
γ.
γ
− −− −
−−
= ×−−
−−






  1. ... [Eqn. (13.6)]



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