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GANDHINAGAR INSTITUTE OF TECHNOLOGY
Dynamics Of Machine (2161901)
Active Learning Assignment
On
Dynamics of Reciprocating Masses
Branch : Mechanical Engineering
Batch : 6 C-3
Prepared by: Guided By:
Suthar Chandresh (140120119229) Prof. Samir Raval
Content Introduction Condition for Complete balancing Primary Balancing of inline Multi-cylinder Engines Secondary Balancing of inline multi-cylinder Engines Balancing of four cylinder inline engines
Introduction Reciprocating parts of any machine is subjected to continuous acceleration and retardation. Inertia acted opposite to the acceleration of part. This inertia force is disturbing or unbalanced dynamic force acting on reciprocating part. Eliminate the unbalanced force by using suitable balancing masses. The balancing of reciprocating masses is divided into :• Balancing reciprocating masses in single cylinder engine• Balancing reciprocating masses in multi cylinder inline engine• Balancing reciprocating masses in V-engine
Balancing reciprocating masses in Multi-cylinder inline engineThe multi-cylinder engine having the axes of all the engine of all the cylinders in the same plane and on the same side of the axis of the crank shaft, are known as inline engine.In the multi-cylinder engines unbalanced force and couples are acting.The multi-cylinder engine have two inner crank and two outer crank.For the inner crank angle = θ˚For the outer crank angle =180+ θ˚
The unbalanced forces due to reciprocating mass of each
Cylinder are ;[Primary force , Fp= mω𝟐r cos θ ] [secondary force= mω𝟐r{cos 2θ𝒏
}
Condition for complete balancing Primary balancing
Primary forces must be balanced.∑mω2r cosθ= 0
Primary couple must be balanced.∑mω2r l cosθ= 0
Secondary balancing Secondary forces must be balanced.∑ mω𝟐r{cos 2θ
𝒏}
Secondary couple must be balanced.∑ mω𝟐rl{cos 2θ
𝒏}
Analytical method for primary balancing For complete primary balancing, the analytical solution is;∑ mr cosθ= 0 ∑mr sinθ= 0∑ mrl cosθ= 0 ∑ mrl sinθ= 0
Analytical method for secondary balancing ∑
mr𝑛
cos 2θ= 0 ∑mr𝑛
sin 2θ= 0
∑mrl𝑛
cos 2θ= 0 ∑mrl𝑛
sin 2θ= 0
EXAMPLE : A four cylinder vertical engine has crank 150 mm long . The planes of rotation of first , second and fourth crank are 400 mm, 200 mm and 200mm respectively from the third crank and their reciprocating mases are 50kg, 60kg and 50 kg respectively. Find the mass of the third reciprocating part and their relative angular position of the cranks in order that the engine may be in complete primary balance.
Sol.:- Given , r1 = r2 = r3 = r4 = 150 mm = 0.15m ; m1 = 50 kg, m2 = 60 kg, m4 = 50 kg ;
In order to give the primary balance of the reciprocating parts of a multi-cylinder engine, the problem may be treated as that of revolving masseswith the reciprocating masses transferred to their respective crank pins.
1 2 3 4
-ve R.P +ve
200 mm 200 mm400mm(a) Position of plane
Plane Mass Radius Cent.
Force/ω𝟐Dist. From
plane 3Couple/ω𝟐
1 50 0.15 7.5 -0.4 -3
2 60 0.15 9 -0.2 -1.8
3( R.P) m3 0.15 0.15m3 0 0
4 50 0.15 7.5 0.2 1.5
a’
b’
o’
-1.81.5
-3
(b). Couple polygon
1
2
3
4
(c). Angular position of crank
By measurement we find the angle between crank 2 and crank 1 is 160˚ in anticlockwise.
θ2 = 160˚
And angle between crank 4 and crank 1 is 26˚ in anticlockwise.
θ4 = 26˚
In order to find the mass of the third cylinder (m3) and its angular position, draw the force
polygon, to some suitable scale.
7.5
9
7.50.15m3 From the fig. , 0.15 m3 = 9 kg-m
m3 = 60 kg.and θ3 = 227 ˚