Item Description
G3 series helical geared motor,
one. Two types of housing: Aluminum alloy and cast iron Two sorts of frames: foot mounting and flange mounting. They are very goodsearching in physical appearance, ideal for common mounting.
two. Helical gear with the higher10sile alloy content can make the construction a lot more compact, housing smaller sized, performance greater, output torque larger.
3.Hardened going through & nicely finished transmission gear has the advantages : rarely distortion, substantial precision,stable transmission, reduced sound, possible for continuous work under the dreadful conditions.
4.With 6 specification for the diameter of output shaft: Ø18,Ø22,Ø28,Ø32,Ø40,Ø50.
five.Two or a fewstage transmission, large in ratio variety, every single single body size with 14 ratios from 5:1 to 200:1.
6.Making use of high quality bearing prolongs the use daily life.
seven.Higheroverall performance oil seal helps prevent the lubricant from leaki
ng back again to the inner of motor.
eight.3section motor combined the common and completeenclosed aluminum motor, which is great in watertight, easy in heat dissipation, large in working effectiveness.
nine.Modular mix extends the transmission ratio from i=5:1 to 1400:1.
Power kw  Output shaft  Ratio  Major outline and dimensionmount  
A  F  I  J  M  O  O1  P  Q  R  S  T  U  W  X  Y  Y1  
1  2  
0.2  eighteen  5/10/fifteen/twenty/twenty five  267  270  192.five  eleven  16.five  170  four  ten  30  one hundred forty five  35  18  20.5  129  six  161  80  eighty one 
22  thirty/40 50/sixty eighty/one hundred  293  296  197.five  eleven  19  185  four  12  40  148  47  22  24.five  129  6  171.5  89.five  83.5  
28  one hundred/120 160/two hundred  306  309.five  208.five  eleven  23.five  215  4  fifteen  forty five  one hundred seventy  50  28  31  129  8  198.five  one hundred and five.5  88 
US $70 / Piece  
1 Piece (Min. Order) 
###
Shipping Cost:
Estimated freight per unit. 
To be negotiated Freight Cost Calculator 

###
Application:  Motor, Industry 

Hardness:  Hardened 
Gear Position:  Internal Gear 
###
Samples: 
US$ 80/Piece
1 Piece(Min.Order) 

###
Customization: 
Available


###
Power kw  Output shaft  Ratio  Primary outline and dimensionmount  
A  F  I  J  M  O  O1  P  Q  R  S  T  U  W  X  Y  Y1  
1  2  
0.2  18  5/10/15/20/25  267  270  192.5  11  16.5  170  4  10  30  145  35  18  20.5  129  6  161  80  81 
22  30/40 50/60 80/100  293  296  197.5  11  19  185  4  12  40  148  47  22  24.5  129  6  171.5  89.5  83.5  
28  100/120 160/200  306  309.5  208.5  11  23.5  215  4  15  45  170  50  28  31  129  8  198.5  105.5  88 
US $70 / Piece  
1 Piece (Min. Order) 
###
Shipping Cost:
Estimated freight per unit. 
To be negotiated Freight Cost Calculator 

###
Application:  Motor, Industry 

Hardness:  Hardened 
Gear Position:  Internal Gear 
###
Samples: 
US$ 80/Piece
1 Piece(Min.Order) 

###
Customization: 
Available


###
Power kw  Output shaft  Ratio  Primary outline and dimensionmount  
A  F  I  J  M  O  O1  P  Q  R  S  T  U  W  X  Y  Y1  
1  2  
0.2  18  5/10/15/20/25  267  270  192.5  11  16.5  170  4  10  30  145  35  18  20.5  129  6  161  80  81 
22  30/40 50/60 80/100  293  296  197.5  11  19  185  4  12  40  148  47  22  24.5  129  6  171.5  89.5  83.5  
28  100/120 160/200  306  309.5  208.5  11  23.5  215  4  15  45  170  50  28  31  129  8  198.5  105.5  88 
Spiral Gears for RightAngle RightHand Drives
Spiral gears are used in mechanical systems to transmit torque. The bevel gear is a particular type of spiral gear. It is made up of two gears that mesh with one another. Both gears are connected by a bearing. The two gears must be in mesh alignment so that the negative thrust will push them together. If axial play occurs in the bearing, the mesh will have no backlash. Moreover, the design of the spiral gear is based on geometrical tooth forms.
Equations for spiral gear
The theory of divergence requires that the pitch cone radii of the pinion and gear be skewed in different directions. This is done by increasing the slope of the convex surface of the gear’s tooth and decreasing the slope of the concave surface of the pinion’s tooth. The pinion is a ringshaped wheel with a central bore and a plurality of transverse axes that are offset from the axis of the spiral teeth.
Spiral bevel gears have a helical tooth flank. The spiral is consistent with the cutter curve. The spiral angle b is equal to the pitch cone’s genatrix element. The mean spiral angle bm is the angle between the genatrix element and the tooth flank. The equations in Table 2 are specific for the Spread Blade and Single Side gears from Gleason.
The tooth flank equation of a logarithmic spiral bevel gear is derived using the formation mechanism of the tooth flanks. The tangential contact force and the normal pressure angle of the logarithmic spiral bevel gear were found to be about twenty degrees and 35 degrees respectively. These two types of motion equations were used to solve the problems that arise in determining the transmission stationary. While the theory of logarithmic spiral bevel gear meshing is still in its infancy, it does provide a good starting point for understanding how it works.
This geometry has many different solutions. However, the main two are defined by the root angle of the gear and pinion and the diameter of the spiral gear. The latter is a difficult one to constrain. A 3D sketch of a bevel gear tooth is used as a reference. The radii of the tooth space profile are defined by end point constraints placed on the bottom corners of the tooth space. Then, the radii of the gear tooth are determined by the angle.
The cone distance Am of a spiral gear is also known as the tooth geometry. The cone distance should correlate with the various sections of the cutter path. The cone distance range Am must be able to correlate with the pressure angle of the flanks. The base radii of a bevel gear need not be defined, but this geometry should be considered if the bevel gear does not have a hypoid offset. When developing the tooth geometry of a spiral bevel gear, the first step is to convert the terminology to pinion instead of gear.
The normal system is more convenient for manufacturing helical gears. In addition, the helical gears must be the same helix angle. The opposite hand helical gears must mesh with each other. Likewise, the profileshifted screw gears need more complex meshing. This gear pair can be manufactured in a similar way to a spur gear. Further, the calculations for the meshing of helical gears are presented in Table 71.
Design of spiral bevel gears
A proposed design of spiral bevel gears utilizes a functiontoform mapping method to determine the tooth surface geometry. This solid model is then tested with a surface deviation method to determine whether it is accurate. Compared to other rightangle gear types, spiral bevel gears are more efficient and compact. CZPT Gear Company gears comply with AGMA standards. A higher quality spiral bevel gear set achieves 99% efficiency.
A geometric meshing pair based on geometric elements is proposed and analyzed for spiral bevel gears. This approach can provide high contact strength and is insensitive to shaft angle misalignment. Geometric elements of spiral bevel gears are modeled and discussed. Contact patterns are investigated, as well as the effect of misalignment on the load capacity. In addition, a prototype of the design is fabricated and rolling tests are conducted to verify its accuracy.
The three basic elements of a spiral bevel gear are the piniongear pair, the input and output shafts, and the auxiliary flank. The input and output shafts are in torsion, the piniongear pair is in torsional rigidity, and the system elasticity is small. These factors make spiral bevel gears ideal for meshing impact. To improve meshing impact, a mathematical model is developed using the tool parameters and initial machine settings.
In recent years, several advances in manufacturing technology have been made to produce highperformance spiral bevel gears. Researchers such as Ding et al. optimized the machine settings and cutter blade profiles to eliminate tooth edge contact, and the result was an accurate and large spiral bevel gear. In fact, this process is still used today for the manufacturing of spiral bevel gears. If you are interested in this technology, you should read on!
The design of spiral bevel gears is complex and intricate, requiring the skills of expert machinists. Spiral bevel gears are the state of the art for transferring power from one system to another. Although spiral bevel gears were once difficult to manufacture, they are now common and widely used in many applications. In fact, spiral bevel gears are the gold standard for rightangle power transfer.While conventional bevel gear machinery can be used to manufacture spiral bevel gears, it is very complex to produce double bevel gears. The double spiral bevel gearset is not machinable with traditional bevel gear machinery. Consequently, novel manufacturing methods have been developed. An additive manufacturing method was used to create a prototype for a double spiral bevel gearset, and the manufacture of a multiaxis CNC machine center will follow.
Spiral bevel gears are critical components of helicopters and aerospace power plants. Their durability, endurance, and meshing performance are crucial for safety. Many researchers have turned to spiral bevel gears to address these issues. One challenge is to reduce noise, improve the transmission efficiency, and increase their endurance. For this reason, spiral bevel gears can be smaller in diameter than straight bevel gears. If you are interested in spiral bevel gears, check out this article.
Limitations to geometrically obtained tooth forms
The geometrically obtained tooth forms of a spiral gear can be calculated from a nonlinear programming problem. The tooth approach Z is the linear displacement error along the contact normal. It can be calculated using the formula given in Eq. (23) with a few additional parameters. However, the result is not accurate for small loads because the signaltonoise ratio of the strain signal is small.
Geometrically obtained tooth forms can lead to line and point contact tooth forms. However, they have their limits when the tooth bodies invade the geometrically obtained tooth form. This is called interference of tooth profiles. While this limit can be overcome by several other methods, the geometrically obtained tooth forms are limited by the mesh and strength of the teeth. They can only be used when the meshing of the gear is adequate and the relative motion is sufficient.
During the tooth profile measurement, the relative position between the gear and the LTS will constantly change. The sensor mounting surface should be parallel to the rotational axis. The actual orientation of the sensor may differ from this ideal. This may be due to geometrical tolerances of the gear shaft support and the platform. However, this effect is minimal and is not a serious problem. So, it is possible to obtain the geometrically obtained tooth forms of spiral gear without undergoing expensive experimental procedures.
The measurement process of geometrically obtained tooth forms of a spiral gear is based on an ideal involute profile generated from the optical measurements of one end of the gear. This profile is assumed to be almost perfect based on the general orientation of the LTS and the rotation axis. There are small deviations in the pitch and yaw angles. Lower and upper bounds are determined as – 10 and 10 degrees respectively.
The tooth forms of a spiral gear are derived from replacement spur toothing. However, the tooth shape of a spiral gear is still subject to various limitations. In addition to the tooth shape, the pitch diameter also affects the angular backlash. The values of these two parameters vary for each gear in a mesh. They are related by the transmission ratio. Once this is understood, it is possible to create a gear with a corresponding tooth shape.
As the length and transverse base pitch of a spiral gear are the same, the helix angle of each profile is equal. This is crucial for engagement. An imperfect base pitch results in an uneven load sharing between the gear teeth, which leads to higher than nominal loads in some teeth. This leads to amplitude modulated vibrations and noise. In addition, the boundary point of the root fillet and involute could be reduced or eliminate contact before the tip diameter.
editor by czh 20221214