This is very helpful because there is so much misinformation about drawing involute gears on the internet, but I do have a question. To get the circular pitch, you divide the base circle circumference by the number of teeth as you state. But you then add that it can be found by multiplying the module by PI, which gives a different answer. Or am I wrong?
at 00:45 you talk bout base cirkel bu according to your part one, the drawing is showing that the circel you makred as base circle is the "pitch circle" wich one is the right circle name?
The tooth arc starts at the base circle. There are other ways to create the involute. For arc construction points you could just use equal unravelled sections of the base circle circumference. It’s explained better in the rack and pinion design video I made.
So is the pressure angle calculated or just chosen? The angle is needed before the diameter of the base circle is calculated, right? This is the part that is confusing to me.
I have a question: in the final drawing at 2:50 , it looks like only the first 2 circular pitch lengths are being used for the tooth profile, the others don't seem to be doing anything... Why do you have to draw 6 lengths?
You can use less than 6 lengths. For this video I'm primarily trying to show that the tooth profile is formed using an involute curve. You can shorten the process.
This doesn't seem to work for low teeth # gears. I have an 8 teeth gear with a modulus of .5 and an outside dia. of 5 mm. I calculate the pitch circle dia. as 4 mm , the base circle dia as 1.476066, and the Circular pitch as π/2 or 1.57079 mm. When I draw my involute, though, my curve seems to be no where near where the actual tooth would be. Thoughts?
Try video 3 in the series. This is a very small gear. When I modelled the CAD based on your requirements I dont think the combination is practical. The teeth look weak and may break easily. You need more teeth and a smaller module. Think how far you can take the design before it becomes impractical. Also consider if the module is too small will the gear slip?
@@PDWCreative This is a real gear called a 082A, not one I'm designing or printing, and pretty common in toys and small devices. I'm just trying to layout the gearing in SketchUp to build a case for my device and it's easier to design it when I can see everything first. And yes, it is a rather small gear, but I need to go from 6000 RPMs to 60 and I need the size as small as possible. Another commenter suggested an online calculator, which I used instead, and the results came out very close to the actual gear. Thanks for the video though, you did a good job on a lot of you explanations.
@@joshuakelly2665 There is an alternative method in Video 3 for forming the involute. Video 2 really is just an involute explanation. The third video gives a practical demonstration
Amazing! I've been trying to figure out how one would be able to potentially sketch out a spur gear by hand (simply because I love to learn the fundamentals of things, and doing things by hand really does it for me) for a while now, and apart from three descriptions of Unwin's approximation, each of which tells a slightly different story, I didn't manage to find anything about it, let alone how to do it with true involutes. The previous video and this one really helped a ton, connecting everything in my head. Since I'm doing this for a hobby and have little reference material but want to learn as in-depth as possible, could you maybe recommend resources on the web or even books (possibly even what's used in university) to learn mechanics and more engineering topics from?
I'm glad you like the videos. There is allot of literature out there on the web but books tend to have a more complete description. Most general mechanical engineering text books should have a section dedicated to gear design. Try shigleys mechanical engineering design to start. Its very useful
Your calculation is correct but the curve starts at the base circle. The base circle moves around significantly as the module and pitch circle change with differing gear designs. Some combinations lead to slightly impractical spur gears.
I see why there is some confusion. You don’t have to use the circular pitch to draw your lines to make the involute curve guide. You could just divide the base circle circumference into equal sections. It will still work
When pressure angle is 20 then maximum number of teeth is 41.above it the base circle falls below dededendum circle. can you tell me how gears with large number of teeths are made. Are they involute or any thing else.
Sir, these Videos are very useful to design a spur gear. I have a question, can we make helical gear by providing twist angle using these procedures shown in your video?
Divide 360 into the double the numbers of gears, draw inner circle for the depth of the gears, alternate would be the gears peaks and the middle would be valleys
This is perfection, thank you very much for the simple explanation!
Mesej yang jelas, struktur yang jelas, mudah difahami, terima kasih
This is very helpful because there is so much misinformation about drawing involute gears on the internet, but I do have a question. To get the circular pitch, you divide the base circle circumference by the number of teeth as you state. But you then add that it can be found by multiplying the module by PI, which gives a different answer. Or am I wrong?
at 00:45 you talk bout base cirkel bu according to your part one, the drawing is showing that the circel you makred as base circle is the "pitch circle" wich one is the right circle name?
The tooth arc starts at the base circle. There are other ways to create the involute. For arc construction points you could just use equal unravelled sections of the base circle circumference. It’s explained better in the rack and pinion design video I made.
So is the pressure angle calculated or just chosen? The angle is needed before the diameter of the base circle is calculated, right? This is the part that is confusing to me.
I have a question: in the final drawing at 2:50 , it looks like only the first 2 circular pitch lengths are being used for the tooth profile, the others don't seem to be doing anything... Why do you have to draw 6 lengths?
You can use less than 6 lengths. For this video I'm primarily trying to show that the tooth profile is formed using an involute curve. You can shorten the process.
If you're drawing the arc by eye then the increased lengths make it easier to curve the arc accurately
This doesn't seem to work for low teeth # gears. I have an 8 teeth gear with a modulus of .5 and an outside dia. of 5 mm. I calculate the pitch circle dia. as 4 mm , the base circle dia as 1.476066, and the Circular pitch as π/2 or 1.57079 mm. When I draw my involute, though, my curve seems to be no where near where the actual tooth would be. Thoughts?
Try video 3 in the series. This is a very small gear. When I modelled the CAD based on your requirements I dont think the combination is practical. The teeth look weak and may break easily. You need more teeth and a smaller module. Think how far you can take the design before it becomes impractical. Also consider if the module is too small will the gear slip?
@@PDWCreative This is a real gear called a 082A, not one I'm designing or printing, and pretty common in toys and small devices. I'm just trying to layout the gearing in SketchUp to build a case for my device and it's easier to design it when I can see everything first. And yes, it is a rather small gear, but I need to go from 6000 RPMs to 60 and I need the size as small as possible. Another commenter suggested an online calculator, which I used instead, and the results came out very close to the actual gear. Thanks for the video though, you did a good job on a lot of you explanations.
@@joshuakelly2665 There is an alternative method in Video 3 for forming the involute. Video 2 really is just an involute explanation. The third video gives a practical demonstration
How do u draw the blue involute curve smoothly? You need more circular pitch tangents to guide the drawing of involute otherwise it will look chunky
Add more guides or try the method in Spur Gear Design 3
Amazing! I've been trying to figure out how one would be able to potentially sketch out a spur gear by hand (simply because I love to learn the fundamentals of things, and doing things by hand really does it for me) for a while now, and apart from three descriptions of Unwin's approximation, each of which tells a slightly different story, I didn't manage to find anything about it, let alone how to do it with true involutes. The previous video and this one really helped a ton, connecting everything in my head.
Since I'm doing this for a hobby and have little reference material but want to learn as in-depth as possible, could you maybe recommend resources on the web or even books (possibly even what's used in university) to learn mechanics and more engineering topics from?
I'm glad you like the videos. There is allot of literature out there on the web but books tend to have a more complete description. Most general mechanical engineering text books should have a section dedicated to gear design. Try shigleys mechanical engineering design to start. Its very useful
Explained better than Wikipedia!
Thank you. It’s good to know the videos are helpful!
isn't the circular pitch the pitch circle divided by number of teeth? Why is it that in the diagram, it's labeled on the base circle?
Your calculation is correct but the curve starts at the base circle. The base circle moves around significantly as the module and pitch circle change with differing gear designs. Some combinations lead to slightly impractical spur gears.
@@PDWCreative thanks!
I see why there is some confusion. You don’t have to use the circular pitch to draw your lines to make the involute curve guide. You could just divide the base circle circumference into equal sections. It will still work
@@PDWCreative ahhhhhh ok that was what i was looking for.
just finished designing a mechanical arm and it was awesome! Thanks for the video
When pressure angle is 20 then maximum number of teeth is 41.above it the base circle falls below dededendum circle. can you tell me how gears with large number of teeths are made. Are they involute or any thing else.
Try a different pressure angle and module combination. There are lots of different tooth profile types. Involute is one of the more common
Sir, these Videos are very useful to design a spur gear.
I have a question, can we make helical gear by providing twist angle using these procedures shown in your video?
I think there is a little more to do than twisting the extrude. I'll need to do a video soon
Divide 360 into the double the numbers of gears, draw inner circle for the depth of the gears, alternate would be the gears peaks and the middle would be valleys
Remember the pitch circle is not the mid point between peak and valley
Thank you
Sir.where come from modul?
It controls the height of the gear tooth
how do you multiply the module by pie?
If your stuck at pi, try a Google search
@@PDWCreative actually I know Pi what’s module?
B.s. how does this give you ways to do it physicaly, you didn't address the involute tooth profile..
Check the third video and you will see how
0:30 According your first video ..Design 1 -> you have named as Pitch circle not base!
good please go go
anda perlu menjelaskan kandungan
can you dumb this down a bit for me ? I think its the British accent its just going right over my head LOL
Move on
I’m just taking a break from making videos at the moment. I will be back making new ones soon.