(^462) A Textbook of Engineering Mechanics
22.6.GRAPHICAL METHOD FOR THE VELOCITY OF PISTON OF A
RECIPROCATING PUMP
Consider the mechanism of a reciprocating pump in which AB be the crank, BC the connecting
rod and C the piston. Now let us locate the position of instantaneous centre O as shown in Fig. 22.9
and as discussed below :
Fig. 22.9. Velocity of piston of a reciprocating pump.
- First of all, select some suitable point A, and draw a circle with radius equal to AB (i.e.
crank length of the mechanism). - Through A, draw a horizontal line meeting the circle at D, which represents the inner dead
centre. Extend this line. - Now draw AB at an angle θ through which the crank has turned at the instant, the velocity
of piston is required to be found out. - Cut off BC equal to the length of the connecting rod.
- Now extend the line AB and through C draw a line at right angles to AC meeting at O,
which represents the instantaneous centre of the connecting rod BC. - Measure the lengths OB and OC and use them in the usual relations of instantaneous
centre as discussed below :
Let ω 1 = Angular velocity of the crank AB in radians/sec.
ω 2 = Angular velocity of connecting rod BC about O, in radians/sec,
r= Radius of the crank AB.
∴ Velocity of B, vB=ω 2 × OB ...(i)
We also know that the velocity of B,
vB=ω 1 × AB ...(ii)
Equating equation, (i) and (ii),
ω 2 × OB=ω 1 × AB or 2 1 AB
OBω×
ω= ...(iii)
Similarly, velocity of piston C,
vC= ω 2 × OC
Now by substituting the value of ω 2 in the above equation,11
CABOC rOC
v
OB OBω× × ω× ×
===vOCB
OB× ...(Q AB = r)Thus by measuring the lengths of OB and OC to the scale, we can find out the velocity of
piston (i.e.vC).