matkyne
Mechanical
- Feb 24, 2012
- 1
I searched the forums for this information and came up empty handed. So if this has been asked and answered before I apologize.
I am working on a project to make a winch lighter. The original design required it to pull over 15,000 lbs, but that load requirement has now been reduced to 9,000 lbs max, working load is 7,500 lbs.
I am trying to evaluate if I can remake the drum out of a lighter material now that the load requirements have been reduced. The winch is designed as a direct pull drum, and in worst case conditions (but likely to never actually be used) the full 9,000 lb load is applied at the all-cable-in condition with 8 layers of cable on the drum.
I used Blodgett's "Design of Weldments" section on drum design to calculate the forces applied to the drum (compressive force normal to the axis) and the outward force applied to the rim from the tension in the cable. I did the math and the vector analysis and the numbers I calculated seemed to be too high.
The reason I think this is because I have read the original FEA report for the drum when the cable load was much higher, but the loads that were applied to the drum were much lower than my calculated values.
So I think there must be something wrong with understanding of the way the loads are applied. The example in the book only consisted of 3 layers of wraps. My drum has 8.
In the example used to calculate the compressive load on the drum, the book reads:
"Although each succeeding layer of the cable should add to the pressure against the drum, the outside layers will tend to force the proceeding layers into a smaller diameter, reducing their tension; in like manner, their pressure against the drum will be reduced. For this reason only the effect of the outer two layers will be considered."
I was unsure how to scale this for my application. As previously stated, his drum only has 3 layers. This can mean that only the two outermost layers on any drum contribute, or that the top 2/3 of the cable layers matter. Any one have any experience with this?
The next question has to do with the outward force that the cable applies to the rim or walls of the drum. The formula given to calculate the inward radial force is:
R_n = (tensile force in the cable in lbs)/(radial distance to application of the force)
Where R_n is the wrap number
You solve this for each wrap of cable. The units for R_n are lbs/in of circumference.
Once you have these values you use vector analysis to find the forces applied to the rim.
In the given example the force vectors line up and are accumulative. But again his drum only has 3 layers so he only considers a maximum of 3 vectors. My assumption is that I would need to consider all 8 layers of the cable for the analysis. Once again I am getting some crazy high numbers here.
I am at a loss here and any help would be appreciated. Sorry for the book, but I wanted to fully state my problem.
I am working on a project to make a winch lighter. The original design required it to pull over 15,000 lbs, but that load requirement has now been reduced to 9,000 lbs max, working load is 7,500 lbs.
I am trying to evaluate if I can remake the drum out of a lighter material now that the load requirements have been reduced. The winch is designed as a direct pull drum, and in worst case conditions (but likely to never actually be used) the full 9,000 lb load is applied at the all-cable-in condition with 8 layers of cable on the drum.
I used Blodgett's "Design of Weldments" section on drum design to calculate the forces applied to the drum (compressive force normal to the axis) and the outward force applied to the rim from the tension in the cable. I did the math and the vector analysis and the numbers I calculated seemed to be too high.
The reason I think this is because I have read the original FEA report for the drum when the cable load was much higher, but the loads that were applied to the drum were much lower than my calculated values.
So I think there must be something wrong with understanding of the way the loads are applied. The example in the book only consisted of 3 layers of wraps. My drum has 8.
In the example used to calculate the compressive load on the drum, the book reads:
"Although each succeeding layer of the cable should add to the pressure against the drum, the outside layers will tend to force the proceeding layers into a smaller diameter, reducing their tension; in like manner, their pressure against the drum will be reduced. For this reason only the effect of the outer two layers will be considered."
I was unsure how to scale this for my application. As previously stated, his drum only has 3 layers. This can mean that only the two outermost layers on any drum contribute, or that the top 2/3 of the cable layers matter. Any one have any experience with this?
The next question has to do with the outward force that the cable applies to the rim or walls of the drum. The formula given to calculate the inward radial force is:
R_n = (tensile force in the cable in lbs)/(radial distance to application of the force)
Where R_n is the wrap number
You solve this for each wrap of cable. The units for R_n are lbs/in of circumference.
Once you have these values you use vector analysis to find the forces applied to the rim.
In the given example the force vectors line up and are accumulative. But again his drum only has 3 layers so he only considers a maximum of 3 vectors. My assumption is that I would need to consider all 8 layers of the cable for the analysis. Once again I am getting some crazy high numbers here.
I am at a loss here and any help would be appreciated. Sorry for the book, but I wanted to fully state my problem.
