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Module 4 gears
1. Department of Mechanical Engineering
JSS Academy of Technical Education, Bangalore-560060
Kinematics of Machines
(Course Code:17ME42)
Gears
2. Gear terminology
Classification
Law of gearing
Path of contact and Arc of contact
Contact ratio of spur, helical, bevel and worm gears
Interference in involute gears.
Methods of avoiding interference
Back lash
Content
3. • The slipping of a belt or a rope is a common phenomenon in the transmission of
motion or power between two shafts.
• The effect of slip is to reduce the velocity ratio of the Drive / System.
• In precision machine, in which a definite velocity ratio is important (as in watch
mechanism) the only positive drive is by means of Gears or toothed wheels.
Introduction
4. • Belt/Rope Drives - Large center distance of the shafts.
• Chain Drives - Medium center distance of the shafts.
• Gear Drives - Small center distance of the shafts.
Transmission of motion or power between two shafts.
Introduction
5. • Gears or toothed wheels are used to transmit motion or power between two
shafts with exact / definite or constant angular velocity ratio.
Introduction
6. Advantages
1. Transmits exact velocity ratio.
2. Used to transmit large power.
3. High efficiency & reliability.
5. It has compact layout.
Disadvantages
1. The manufacture of gears require special tools and equipment.
2. The error in cutting teeth may cause vibrations and noise during operation.
Introduction
9. Classification of Toothed Wheels / Gears
• Gears have teeth parallel to the axis of the wheel, are called as spur gears.
10. • Helical gears in which the teeth are inclined to the axis used for connecting
parallel shafts.
• The double helical gears are known as herringbone gears.
Helical gears
11. Intersecting Axes
• The two non-parallel or intersecting, but coplanar shafts connected by gears
are called bevel gears and the arrangement is known as bevel gearing.
• The bevel gears, like spur gears, may also have their teeth inclined to the face
of the bevel, in which case they are known as helical bevel gears.
12. • The two non-intersecting and non-parallel i.e. non-coplanar shafts are
connected by gears and are called skew bevel gears or spiral gears or
Skewed Gears
• The arrangement is known as skew bevel gearing or spiral gearing.
19. Spur Gear terminology
Significance of Pressure angle (ϕ) / Angle of Obliquity
• Increasing pressure angle improves the tooth strength.
• Increasing pressure angle result in smaller base circle so
more portion of tooth becomes involute thus can eliminate
interference.
• Increasing pressure angle will improve power transmission
but at the same time will increase gear wear and meshing
noise
• Decreasing the Pressure Angle will require more teeth on the
pinion to avoid undercutting
• Low pressure angle will decrease power transmission
capacity but will improve gear meshing properties like
reduced noise
20. Law of Gearing (Condition for Constant Velocity Ratio of Toothed Wheels)
21. Forms of Teeth
1. Cycloidal Teeth
A cycloid is the curve traced by a point on the
circumference of a circle which rolls without slipping on a
fixed straight line.
Tooth form
Cycloidal Gears
22. Locus of a point on a straight line which rolls without slipping, on the circumference of the circle.
Example: An involute profile is generated by the end of the string/tape being unwound from a cylinder or by
a point on a line as the line rolls on the circumference of a circle without slipping.
2. Involute Teeth
Tooth form
Involute gears in Action
23. Comparison Between Involute and Cycloidal Gears
Involute Cycloidal
Centre distance for a pair of involute
gears can be varied within limits without
changing the velocity ratio.
Requires exact centre distance to be
maintained
Pressure angle, from the start of the
engagement of teeth to the end of the
engagement, remains constant.
Pressure angle is maximum at the
beginning of engagement, reduces to
zero at pitch point, starts decreasing
and again becomes maximum at the
end of engagement.
Interference exists Interference does not occur at all
Strength of the teeth is Low
Teeth have wider flanks, therefore the
cycloidal gears are stronger
25. O1P = Pitch circle radius of pinion = r1 = Driver
O2P = Pitch circle radius of Gear = r2 = follower
O1C = Base circle radius of pinion = rb1
O2D = Base circle radius of gear = rb2
O1B = Addendum circle radius of pinion= ra1
O2A = Addendum circle radius of gear = ra2
AP = Path of approach
PB = Path of recess
Consider a pinion driving the wheel as shown in Fig. When the pinion rotates in clockwise
direction, the contact between a pair of involute teeth begins at A (on the flank near the base circle
of pinion or the outer end of the tooth face on the wheel) and ends at B.
CD is the common normal at the point of contacts and is common tangent to the base circles.
The point A is the intersection of the addendum circle of gear and the common tangent.
The point B is the intersection of the addendum circle of pinion and common tangent.
26.
27.
28.
29. Interference in Involute Gears
When addendum of gear 1 meet with the base circle
of another gear 2, due to this strength of the gear
reduces.
If the portion of the gear exists below the base circle,
then it results in interference & leads to undercutting
of the tooth.
Mating of two non-conjugate profiles results in a phenomena called
interference.
30. Interference in Involute Gears
• The power transmission through a pair of teeth
is along the path of contact, CD.
• This path is the common tangent to the two base
circles and passes through pitch point, P.
• For this path not to deviate, the portions of the
tooth profiles in contact must be involute.
• If not, the two surfaces (profiles) would not touch
tangentially and the power transmission may not
be proper.
• Mating of two non-conjugate profiles results in a
phenomena called interference.
• Teeth in contact will not slide but mate roughly
causing a bend in the teeth or dig out the non
involute flank.
31. Methods to avoid Interference
1. Height of the teeth may be reduced.
2. Under-cut of the radial flank of the pinion.
3. Centre distance may be increased, but It leads to increase in pressure angle.
4. By tooth correction / Modification:
The pressure angle, centre distance and base circles remain unchanged, but
tooth thickness of gear will be greater than the pinion tooth thickness.
5. Increasing the number of teeth on the pinion.
32. Minimum No. of teeth to avoid Interference
Consider a pinion driving Gear as shown in Fig.
• CD is the common tangent to base circle. The points C & D are called Interference points.
• If the path of contact does not extend beyond either of these points, interference is avoided.
34. Max. addendum circle radius of gear to avoid interference is
From right angle triangle O2CD
35.
36.
37.
38. Backlash
Circumferential clearance – Backlash is the distance
between mating teeth measured along the pitch circle
circumference.
• In practical aspect gears must have some backlash due to
tolerances, thermal expansion, wear, etc.
• One must minimize backlash for smooth operation.
Example: robot joints which must be driven both directions.
Changing direction, nothing happens until the backlash is
overcome, and then impact – bad for dynamics.