TITLE.PM5

(Ann) #1

GAS POWER CYCLES 635


dharm
\M-therm\Th13-3.pm5


Solution. Refer Fig. 13.17.

p (bar)

2 3

Vs

Vs

8
100
Adiabatics

4

1 1 (27°C)

Vc

V(m )^3

Fig. 13.17
Cylinder diameter, D = 200 mm or 0.2 m
Stroke length, L = 300 mm or 0.3 m
Initial pressure, p 1 = 1.0 bar
Initial temperature, T 1 = 27 + 273 = 300 K

Cut-off =
8
100
Vs = 0.08 Vs
(i)Pressures and temperatures at salient points :
Now, stroke volume, Vs = π/4 D^2 L = π/4 × 0.2^2 × 0.3 = 0.00942 m^3

V 1 = Vs + Vc = Vs +
V
r

s
− 1

Q V V
c r
= s

L
N
M

O
Q
1 P

= Vs 1
1
11

+

F
HG

I
KJ

=
r −

r
r
× Vs

i.e., V 1 =
15
15 1


15
− 14
×=Vs × 0.00942 = 0.0101 m^3. (Ans.)

Mass of the air in the cylinder can be calculated by using the gas equation,
p 1 V 1 = mRT 1

m =
pV
RT

11
1

1 10^5 0 0101
287 300
= ××
×

.
= 0.0117 kg/cycle
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